11. 1. Effect of horizontal wall ply angle on blade stability: first torsion and second flap modes (t_ = 0.30) . ...... trigonometric relations can be obtained from Fig.
I
NASA
Aeroelasticity of Composite Swept Tips K. A.
Yuan
and
P.
Contractor
Report
4665
and Structural Optimization Helicopter Rotor Blades With
P. Friedjnann
'qp
(NASA-CR-4665) STRUCTURAL COMPOSITE _TTH SWEPT _33 p
AEROELASTICITY OPTIMIZATION OF HELrCOPTER ROTOR TIPS (California
AN_
N95-20262
_LACES Univ.)
Unclas
Hi/05
0050098
Grant Prepared
for
Langley
NAG1-833
Research
May
Center
1995
NASA
Aeroelasticity of Composite Swept Tips K. A. Yuan University
Contractor
Report
4665
and Structural Optimization Helicopter Rotor Blades With
and P. P. Friedmann of California
• Los Angeles,
California
National Aeronautics and Space Administration Langley Research Center • Hampton, Virginia 23681-0001
Prepared
for Langley Research Center under Grant NAG1-833
May
1995
Primed
NASA
copies
Center
800 Elkridge Linthicum
available
for AeroSpace Landing
Heights,
(301) 621-0390
t¥om
the
following:
Information
Road MD 21090-2934
National 5285
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Springfield, (703)
Technical Royal
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Service
(NTIS)
PREFACE
This
report
onstrating
the
tailoring that
structure
The Aerospace
and
by
Grant
NASA
the grant monitor
The principal
sertation; prove
Finally, during
comments
this
the
certain
was
Dr.
hereby
It is shown in the
primary
in the vibration
carried
out
in the
at UCLA,
and
express
appreciation
essentially were
made
report.
authors
gratefully
acknowledge
Professor
orientation
from
it into this
from
aeroelastic
blades.
H. Adelman,
turning
research,
and
at dem-
levels
their
NASA
Mechanical, it was
funded
Langley,
as
to the grant
suggestions.
constitutes changes
rotor
reductions
for this sponsored
This
optimization
ply
Department
and
aimed
be achieved.
report
with
authors
investigator
however,
it, before
1-833
The
P. Friedmann.
can
Engineering
NAG
for his useful
Peretz
in this
Nuclear
monitor.
tip; remarkable hub,
research
helicopter
of composite
blade
described
analytical
for structural
composite
the swept
at the
research
tip
combination
and
flight,
innovative
potential
in swept
a judicious
in forward
in detail
remarkable
present
by
blade
describes
L.A.
iii
Schmit,
research the to the
activity first
was
author's
dissertation,
the
help
and
Jr.
and
Dr.
Professor Ph.D.
dis-
so as to im-
advice
received
C. Venkatesan.
CONTENTS
List of Figures
.........................................
List of Tables
..........................................
Nomenclature
..........................................
SUMMARY
..........................................
ix xvii xviii xxx
Chapter I.
pa_e Introduction and Literature Review Introduction .................................. Literature Review ..............................
...................
Structural Modeling of lsotropic Rotor Blades Structural Modeling of Composite Rotor Blades Structural Modeling of Swept-tip Blades ........... Structural Optimization for Vibration Reduction Objectives of the Research ....................... II.
_:'RECEDING
1 ! 3 ...... ..... ....
Model Description and Coordinate Systems ............. Basic Assumptions ............................. Ordering Scheme .............................. Coordinate Systems ............................ Nonrotating, Hub-fixed Coordinate System ........ Rotating, Hub-fixed Coordinate System ........... Preconed, Pitched, Blade-fixed Coordinate System Undeformed Element Coordinate System .......... Undeformed Curvilinear Coordinate System ........ Deformed Curvilinear Coordinate System .......... Preconed, Blade-fixed Coordinate System .......... Coordinate Transformations ......................
...
3 6 13 16 19 21 21 24 25 26 26 26 27 27 28 28 29
Rotating to Nonrotating Transformation .......... Blade-fixed to Hub-fixed Transformation .......... Element to Blade Transformation ................ Undeformed Curvilinear to Undeformed Element Transformation ......................... Deformed to Undeformed Curvilinear Transformation
31 32
Deformed Curvilinear Transformation
33
PAGE BLANK;NOT
FiLM_
to Undeformed .........................
29 30 30
Element
V
INTENT!O,%,\LLyBLt'_,r'_V
Preconed, Blade-fixed Transformation
111.
to Preconed, Pitched, .........................
Structural Modeling of the Composite Rotor Kinematics of Deformation .......................
Blade-fixed 33
Blade
........
34 35
Strain Components ............................. Strain Components in Curvilinear Coordinates ...... Strain Componcnts in Local Cartesian Coordinates ... Explicit Strain-Displacement Relations ............ Constitutive Relations ...........................
IV.
Formulation of the Finite Element Strain Energy Contributions Kinetic Energy Contributions External Work Contributions
Equations of Motion ...................... ..................... .....................
....
Summary of the Partial Differential Equations of Motion Finite Element Discretization of the Equations of Motion Element Matrices Associated with the Strain Energy Variation ............................ Element
Matrices Associated with the Variation ............................ Element Matrices Associated with the External Loads ........................ Summary of the Beam Finite Motion .............................. Local-to-global V°
VI.
Coordinate
Element
Kinetic
Energy
Virtual
Work
39 39 40 45 51 55 56 74 97 101 105 109 1 !0
of 1 !0
Equations
Transformation
of ! 11 .......
112
Incorporation of Aerodynamics in the Equations of Motion Aerodynamic Lift and Pitching Moment ............ Blade Velocity Relative to Air .................... Blade Pitch Angle with respect to Free Stream ........ Aerodynamic Forces and Moments in the Undeformed Element Coordinate System ................. Treatment of Reverse Flow ......................
118 118 121 124
Method
..............................
128
Treatment of the Axial Degree of Freedom .......... Free Vibration Analysis ........................ Modal Coordinate Transformation and Assembly Procedure ..............................
128 132
Hover Analysis ............................... Forward Flight Analysis ........................ Trim Analysis ............................. Distributed Loads on the blade ................
135 139 140 145
of Solution
Inertial
Loads
Aerodynamic Rotor Hub Loads
125 126
133
..........................
145
Loads ...................... ..........................
146 147
vi
Coupled
Trim Harmonic
Vibratory Stability VII.
and Aeroelastic Response Balance .....................
Hub shears and in Forward Flight
Function
153
Moments ............. ...................
156 158
.........................
Formulation of Approximate Detailed Description of the
Problem Optimization
Model Verification ............................... Validation for the Case of Hover lsotropic
Blade
Blade Response Blade Stability Vibratory Hub Free
Vibration
and
.............. Process
......
171 174 177 181
...........
............................ ............................. Loads ....................... Behavior
in Hover
182 ! 83 185 ........
Free
Vibration Analysis ........................ Influence of Ply Orientation ................... Single-cell Composite Blade ................ Two-cell Composite Blade .................. Effects of Tip Sweep and Anhedral ............. Aeroelastic Stability in Hover .................... Effects of Swept Tip ........................ Single-cell Composite Blade ................... Two-cell Composite Blade .................... X,
Aeroelastic Behavior Blade Response Trim Variables Vibratory
Hub
in Forward Flight .............................. ............................... Loads
Blade Stability Combined Effect XI.
Structural
XIl.
Concluding
References
Remarks
200 203 205
..........................
Results
.....................
.............................
.............................................
187 187 187 188 189 191 192 193 196 197
................
............................... of Sweep and Ply Orientation
Optimization
166 167 170 171
..................
............................
Aeroelastic
161 161 162 163 165
Single-cell Composite Blade ................... Validation for the Case of Forward Flight Trim Results ..............................
IX.
Using
Structural Optimization for Vibration Reduction ......... Statement of the Optimization Problem ............. Design Variables ........................... Constraints ............................... Objective
VIII.
Solution
206 .......
207 210 212 223
228
vii
Figures
...............................................
238
oa_e
Appendix A.
Comparison
of the Transformation
Deformed B°
Finite
and
Element
Element Variation
Finite
Element
for the
Local-To-Global
Matrices
Between
Coordinate
Systems
Composite
Beam
...... Model
Matrices Associated ...............................
with
the
Strain
Matrices
with
the
Kinetic
......................... Associated with
the
Virtual
Energy Variation Element Matrices of the
C°
Matrices
Finite
Finite
Undeformed
External
Associated
Loads
Transformation
...
370
Energy 370 381 Work
...................... Matrices
Transformation
for Rotational
Transformation Freedom
for the Vector of Nodal ...............................
viii
365
Degrees
394 .............
396
of Freedom Degrees
....
396
of 398
LIST
OF
FIGURES
oa_e
_ure
1. I
Rotor
2.
Nonrotating, coordinate
1
blade
with
tip sweep
hub-fixed system
2.2
Preconed,
2.3
Undeformed
element
2.4
Undeformed
curvilinear sequence
pitched,
3.
1
Deformation
4.
1
Motion
4.2 5.
Finite 1
blade-fixed
nodal
and
degrees
Components
of aerodynamic
5.3
Reverse
6.2 7.
Forces 1
7.2 8.
8.2
flow region
Finite
element
Organization 1
helicopter model
240 ...........
241
..................
system angles
242
................
243
.................. elastic
244
axis
during
the 245
of freedom
velocity
relative force
.................. to the
acting
air
246 ............
on the
blade
247 .......
.................................
of a four-bladed on the
hub-fixed
..............................
5.2
Schematic
Euler
239
rotating,
system
on the deformed
of blade
1
and
system
coordinate
Components
6.
.................
coordinate
coordinate
displacement
element
anhedral
coordinate system ................................
of an element
virtual
and
helicopter in steady,
for two-cell
of the optimization
level
249 ...................
250
flight
251
composite process
.............. cross
section
.....
.................
Nonlinear function
equilibrium position of blade collective
of isotropic blade pitch ......................
Imaginary function
part of hover eigenvalues of isotropic of blade collective pitch ......................
ix
248
252 253
in hover,
as a 254
blade,
as a 255
8.3
8.4
Real part of hover eigenvalues of isotropic blade collective pitch .............................. Effect
of axial
isotropic 8.5
Effect
of axial
of isotropic 8.6
Effect
isotropic
mode
mode
blade. composite
on the nonlinear
in hover.
blade.
of axial
Single-cell
mode
blade
on the
Analysis
on the
equilibrium
Analysis
part
with
rectangular
position
substitution
part
8.10
8.11
Trim variables pitch setting Trim variables inflow and Trim
variables
of hover
pitch 8.12
setting
Trim variables inflow and
257
eigenvalues 258
eigenvalues
of
substitution
..............
259
box beam
...............
260
for soft-in-plane isotropic .....................................
blade
isotropic
blade
in forward
as a 261
flight; 262
for soft-in-plane isotropic blade rotor angle of attack ...................... for stiff-in-plane
of
............
Real part of hover eigenvalues for single-cell composite function of (thrust coefficient[solidity) .................. 8.9
of
.......
of hover
with substitution
real
as a function
256
with
imaginary
Analysis
blade,
in forward
flight; 263
blade
in forward
flight;
......................................
264
for stiff-in-plane isotropic blade rotor angle of attack ......................
in
forward
flight; 265
8.13
Blade
tip response
for soft-in-plane
isotropic
blade
(/a = 0.30)...
266
8.14
Blade
tip response
for stiff-in-plane
isotropic
blade
(/t =0.30)...
267
8.15
Blade damping for soft-in-plane isotropic blade first and second lag modes ..........................
in forward
Blade damping for soft-in-plane first flap and torsion modes
isotropic blade .........................
in forward
isotropic blade .........................
in forward
Blade damping for stiff-in-plane isotropic blade first and second lag modes ..........................
in forward
Blade
in forward
8.16
8.17
8.18
8.19
Blade damping second and
first
damping flap
for soft-in-plane third flap modes
for stiff-in-plane
isotropic
mode ...................................
X
blade
flight; 268 flight; 269 flight; 270 flight; 271 flight; 272
8.20
8.21
Blade damping first torsion, The
4/rev
hub
flight; 8.22
8.23
The
The
8.24
8.26
9.
9.2
9.3
9.4
9.5
9.6
The
1
9.8
and
rolling
isotropic
blade
moment
.............
273
in forward 274 in fi)rward
4/rev hub loads for soft-in-plane flight; vertical shear and yawing
isotropic blade moment ...............
in forward
4/'rev
hub
loads
for stiff-in-plane
isotropic
blade
shear
moment
.............
logitudinal
and
rolling
275
276 in forward 277
4/rev hub loads for stiff-in-plane flight; lateral shear and pitching
isotropic blade moment ...............
in forward
4/rev hub loads for stiff-in-plane flight; vertical shear and yawing
isotropic blade moment ...............
in forward
278
279
Natural frequencies as a function of ply angle single-cell composite blade ..........................
in vertical
Natural frequencies as a function for single-cell composite blade
in horizontal
Natural frequencies two-cell composite
Natural frequencies composite blade Natural
frequencies
of ply angle ........................
blade
in vertical
zero
of tip anhedral
Effect
of tip sweep
isotropic
blade,
the
on the modified
284 for two-cell
ply angle ...................
285
real
on
wall
for two-cell
angle
Effect
baseline
for
283
imaginary part of hover configuration ..................
blade,
wall
in horizontal
Effect of tip sweep on the isotropic blade, baseline of tip sweep
wall
282
as a function of tip sweep angle with zero ply angle ...................
with
for
281
as a function of ply angle blade ............................
as a function
wall
280
Natural frequencies as a function of ply angle for two-cell composite blade .........................
isotropic 9.9
shear
flight;
isotropic blade moment ...............
composite 9.7
for soft-in-plane
logitudinal
flight; The
loads
isotropic blade in forward flap modes ...............
4/rev hub loads for soft-in-plane flight; lateral shear and pitching
The
8.25
for stiff-in-planc second and third
part
of hover
configuration imaginary torsional
xi
eigenvalues
of 286
eigenvalues
of
.................. part
of hover
frequency
287 eigenvalues
.............
of 288
9.10
Effect
of tip sweep
isotropic 9.11
9.12
9.13
9.14
9.15
9.16
9.17
9.18
9.19
9.20
9.21
9.22
9.23
9.24
9.25
on the
blade,
modified
Effect of tip anhedral of isotropic blade,
real
part
of hover
torsional
of
.............
on the imaginary part of hover baseline configuration ................
Effect of tip anhedral on the real part isotropic blade, baseline configuration Effect of tip anhedral of isotropic blade,
eigenvalues
frequcncy
289 eigenvalues 290
of hover eigenvalues ..................
on the imaginary modified torsional
of 291
part of hover eigcnvalues frequency ...........
Effect of tip anhedral on the real part of hover isotropic blade, modified torsional frequency
cigenvalues .............
292
of 293
Root locus of first lag mode cigcnvalues as a function of ply angle in vertical wall for single-cell composite blade in hover .....
294
Root locus of first flap mode eigenvalues in vertical wall for single-cell composite
295
Root locus of first angle in vertical
as a function of ply angle blade in hover .....
torsion mode eigenvalues as a function of ply wall for single-cell composite blade in hover.
296
Root locus of first lag mode eigenvalues as a function of ply angle in horizontal wall for single-cell composite blade in hover. ..
297
Root locus of first flap mode eigenvalues as a function of ply angle in horizontal wall for single-cell composite blade in hover. ..
298
Root locus of first torsion mode eigenvalues as a function angle in horizontal wall for single-cell composite blade
299
Effect of tip sweep on the imaginary two-cell composite blade, baseline
part of hover configuration
of ply in hover.
eigenvalues ..........
Effect of tip sweep on the real part of hover eigenvalues composite blade, baseline configuration .................
of 300
of two-cell 301
Root locus of first lag mode eigen calues in vertical wall for two-cell composite
as a function of ply angle blade in hover .......
302
Root locus of first flap mode eigenvalues in vertical wall for two-cell composite
as a function of ply angle blade in hover .......
303
Root locus of first angle in vertical
torsion mode eigenvalues as a function of ply wall for two-cell composite blade in hover.
xll
304
9.26
9.27
9.28
9.29
10.
1
10.2
10.
3
10.5
10.6
10.
Root locus of first flap mode eigenvalues as a function of ply angle in horizontal wall for two-cell composite blade in hover .....
306
Root locus of first torsion mode eigenvalues as a function of ply angle in horizontal wall for two-cell composite blade in hover.
307
Root locus of second angle in horizontal
308
Effect of horizontal wall ply angle (#=0.30) .......................................
10.12
on blade
7
8
tip response;
on blade
tip response;
on blade
Effect of vertical wall ply angle (p =0.30) .......................................
on blade
tip response;
lag mode
tip response;
flap
mode 313
tip response;
Effect of tip sweep angle on blade (#=0.30) .......................................
tip response;
Effect of tip sweep angle on blade (#=0.30) .......................................
tip response;
torsion 314
lag mode 315 flap
mode 316
on blade
torsion
mode 317
tip response;
lag mode
.......................................
318
Effect of tip anhedral angle on blade (#=0.30) .......................................
tip response;
Effect
tip response;
of tip anhedral
(#=0.30)
torsion
312
tip response;
angle
mode
311
tip response;
Effect of tip sweep angle on blade (#=0.30) .......................................
of tip anhedral
flap
310
Effect of vertical wall ply angle (#=0.30) .......................................
Effect
lag mode 309
Effect of horizontal wall ply angle on blade mode (# = 0.30) ..................................
(#=0.30) 10.11
flap mode eigenvalues as a function of ply wall for two-cell composite blade in hover.
Effect of vertical wall ply angle on blade mode (# = 0.30) ..................................
10. 9
10.10
305
Effect of horizontal wall ply angle (U =0.30) .......................................
10. 4
10.
Root locus of first lag mode eigenvalues as a function of ply angle in horizontal wall for two-cell composite blade in hover .....
angle
on blade
.......................................
flap mode 319 torsion
mode 320
xiii
10.13
Effect
of horizontal
(U =0.30) 10.14
Effect
10.16
angle
10.19
10.20
wall
of attack
ply angle
on trim
pitch
setting
on trim
of vertical
wall
of attack
variables:
inflow
and
(/_ = 0.30) .......................
Effect
Effect
variables;
321
on trim
322
variables;
pitch
setting 323
ply angle
variables;
inflow
and
rotor
(p = 0.30) ...........................
of tip sweep
(g =0.30) 10.18
on trim
Effect of vertical wall ply angle (g = 0.30) .......................................
angle 10.17
ply angle
.......................................
of horizontal
rotor 10.15
wall
angle
on trim
324
variables;
pitch
setting
.......................................
325
Effect of tip sweep angle on trim of attack (/_ = 0.30) ...........
variables; inflow .....................
Effect of tip anhedral angle on trim (/_ =0.30) .......................................
variables;
and
rotor
326
pitch
setting 327
Effect of tip anhedral angle on trim variables; angle of attack (/_ = 0.30) ...........................
inflow
and
Effect
ply angle
on 4/rev
hub
shears
10.22
Effect of horizontal wall ply angle (_ =0.30) .......................................
on 4/rev
hub
moments
wall
rotor 328
10.21
of horizontal
angle
(/a = 0.30).
329
330
10.23
Effect
of vertical
wall
ply angle
on 4/rev
hub
shears
! 0.24
Effcct
of vertical
wall
ply angle
on 4/rev
hub
moments
(g =0.30).
332
10.25
Effect
of tip sweep
angle
on 4/rev
hub
shears
(/_ =0.30)
.......
333
10.26
Effect
of tip sweep
angle
on 4/rev
hub
moments
10.27
Effect
of tip anhedral
angle
on 4/rev
hub
shears
10.28
Effect
of tip anhedral
angle
on 4/rev
hub
moments
10.29
Effect
of horizontal
(_ =0.30) 10.30
wall
ply angle
on blade
6u =0.30).
(kt = 0.30) .....
334
(# =0.30)
.....
335
(# =0.30)...
336
stability;
first
lag mode
.......................................
Effect of horizontal mode (/_ =0.30)
331
337
wall ply angle on blade ..................................
xiv
stability;
first
flap 338
I0.31
Effect
of horizontal
and 10.32
Effect
second
10.33
Effect
Effect
10.35
Effect
10.36
Effect
stability:
The
10.39
ply angle
modes
of tip anhedral
on blade
stability:
first
340 on blade
on blade
angle
of horizontal flap
wall
modes,
longitudinal
combined
effect
4/rev
The
lateral
stability;
first,
4/rev
The
vertical
4/rev
effect hub
combined 10.42
The
stability
on
blade
ply angle
4/rev
hub
The
4/rev
hub
10.44
Real
The
with hub
for the
first
six modes
for the
first
six 343
on stability
of first
frequency
with
ply orientation
with
part
of characteristic of tip sweep
345
of tip sweep
angle, 346
angle,
of tip sweep
as a function
347 angle,
of tip sweep
(/_ =0.30)
as a function
ply orientation
as a function
348 angle,
...........
of tip sweep
(# =0.30)
ply orientation exponent
six modes,
(/_ = 0.30) ...........
ply orientation
angle,
first
349 angle,
...........
of tip sweep
350 angle,
(_t = 0.30) ........... of blade
combined
first
effect
lag mode
with
(soft-in-plane)
shears and
to first
first
function
XV
as a 352
corresponding objective
351
ply
(g. = 0.30) .............................. hub
344
(p = 0.30) ...........
ply orientation
moment
with
and
(t_ =0.30).
of tip sweep
as a function
moment
torsion
(# = 0.30) ...........
as a function
moment
with
as a function
ply orientation
shear
function
4/rev
flap 341
stability
torsional
shear
shear
yawing effect
orientation 1
with
pitching effect
combined
hub
rolling
effect
combined 10.43
second
342
modified
hub
effect
combined 10.41
lag mode
(it = 0.30) ..................................
combined 10.40
torsion
(/x = 0.30) .....................
angle
4/rev
The
first
339
Effect of tip sweep angle on blade stability for the modified torsional frequency (_ =0.30) .................
10.38
11.
blade
.......................................
second 10.37
on
(t_ = 0.30) .....................
wall ply angle
torsion
of tip sweep
modes
angle
.......................................
first
(/1=0.30)
ply
modes wall
of vertical
and 10.34
flap
of vertical
(l_ =0.30)
wall
blade
configuration
(/x = 0.30) .......
353
11.2
The
4/rev
hub
(soft-in-plane) 11.3
The
4/rev
hub
(soft-in-plane) 11.4
The
4/rev
hub
(soft-in-plane) 11.5
The
4/rev
hub
(soft-in-plane) 11.6
The
4/rev
hub
configuration
moments and shears and moments and shears and moments
corresponding first
objective
corresponding second
to first function
blade
function
corresponding second
corresponding
to second
first
function
objective
corresponding
(soft-in-plane)
and
blade
function
.....
blade
The
4/rcv
hub
(soft-in-plane) 11.8
The
4/rev
hub
shears and moments
corresponding second
objective
corresponding
configuration (soft-in-plane) 0_ =0.30) ....................................... 11.9
11.10
The
The
4/rev hub (stiff-in-plane) 4/rev
hub
(stiff-in-plane) 11.11
The
4/rev
hub
(stiff-in-plane) 11.12
The
4/rev
hub
(stiff-in-plane)
and
(/_ = 0.30) .......
and shears and moments and
corresponding first
objective
corresponding second
objective
corresponding second
357
blade
objective
function
358 to second
blade
function to second second
configuration
(p = 0.30) .....
359
blade
objective
function 360
shears corresponding and first objective moments
356
configuration
0.30)....................................... 11.7
355
configuration
(p = 0.30) .....
to second first
354
configuration (/1 =0.30)
to first
objective
configuration
(/1 = 0.30) .......
to first
objective
blade
objective
xvi
to third function to third function to third function to third function
blade configuration (_ =0.30) ....... blade
configuration
(_ =0.30) blade
.......
362
configuration
(/_ = 0.30) ..... blade
361
363
configuration
(/u = 0.30) .....
364
LIST OF TABLES
Table
ap_9_g_e_
8. I
Baseline
configuration
for isotropic
8.2
Baseline
configuration
for single-cell
8.3
Baseline
configuration
forward
8.4
Basclinc forward
8.5
9.
11.1
composite
for soft-in-plane
in hover rotor
isotropic
1
1
......
blade
rotor
blade
172 ....
175
in
...................................
configuration flight
blade
179
for stiff-in-plane
isotropic
rotor
blade
in
...................................
180
Frequency comparison for isotropic rotor blade used in forward flight analysis .......................
9.2 10.
flight
rotor
configurations 181
Baseline
configuration
for the two-cell
composite
Baseline
configuration
for the isotropic
Baseline rotor
configuration for the two-cell blade .....................................
soft-in-plane
Baseline rotor
configuration for the two-cell blade .....................................
stiff-in-plane
rotor
blade
blade
..
..........
191 193
composite 203 composite 213
11.2
Summary
of optimization
results
for the
11.3
Summary
of optimization
results
for the second
11.4
Summary
of optimization
results
for the
xvii
rotor
first configuration
third
....
configuration configuration
218 ..
...
220 221
NOMENCLATURE a
lift curve
A
cross-sectional
b
blade
b(U),
b(T),
b(We)
slope area
of beam
semichord
boundary terms in the variations kinetic energy and external work
B
number
C
blade
chord,
c = 2b
Cdo
blade
profile
drag
Cmo
blade
moment
c_j(i, j = l, ..., 6)
coefficients
CT
thrust
coefficient
Cw
weight
coefficient
[c]
system
damping
[c]
damping
[Cbb'],
[-Cbs'],
[c j,
[c_,] damping
D
profile
Df
parasite
D
vector
Ct
blade
A
A
A
ex, Cy, e z
unit
energy,
of blades
coefficient
matrix
vectors
material
per unit
space,
Eq. (6.12)
system stiffness
of i-th element,
of blade
matrix
Eq. (4.87) span
of the fuselage
of design root
in modal
of linearized
matrix
drag
matrix
of helicopter
of the
drag
stiffness
of rotor
matrix
coordinate
coefficient
of material
sub-matrices
[c,]
of strain of beam
variables
offset
from
associated system
xviii
center with
of rotation the undefromed
element
unit
vectors
associated
curvilincar unit
with
coordinate
vectors
with
base vectors associated elastic axis of the blade
E;
with
longitudinal
ET
transverse
EA
modulus weighted Eq. (4.13a)
EAB0EABIs, EAB3' , EAB s'
anisotropic material coupling cross section, Eqs. (4. ! 5a-r)
EAC o - EAC 3
modulus weighted Eqs. (4.13g-j)
EA D O - EA DT,
modulus section,
weighted warping Eqs. (4.14a-o)
modulus section,
weighted first Eqs. (4.13b-c)
-EADT'
EAr/_,
EA(_
EI_,
f
EI_c,
EI_
Young's
a virtual
EL
EAD0'
Young's
strain
defined tensor
a point
on the
deformed
modulus modulus
cross
area
of the
constants
section
constants
moments
moments (4.13d-f)
beam,
of the
integrals
of the
of inertia
beam
of the
beam,
beam
of the beam
of the
cross
beam
in Eq. (6.1) in the curvilinear
drag
area
coordinate
fCdf
parasite
f
vector
of blade
equations,
Eq. (6.25)
vector
of blade
equations,
Eq.
vector
of trim
distributed
curvilinear
motion,
cross-sectional
modulus weighted cross-section, Eqs. symbol
the deformed
system
the triad (?_'_,^' ^' after %, e_) Eqs. (4.68a-c) E x, E_,
undeformed
system
associated
coordinate
the
of fuselage
equations,
aerodynamic
xix
system
Eq. force
(6.35) (6.37) vector,
Eq.
(6.61)
cross
fl
distributed
incrtial
F
symbol
defined
F
system
load
Fi
load
Fll
vector
of total
hub
FRk
vector
of root
force
{Fc''}
clement
centrifugal
clement
applied
vector
gq
q-th constraint
G x, G,.
G;
deformed
Eq. (6.14)
(4.87)
force
for k-th
blade
vector,
vector,
Eq.
Eq.
(4.85)
(4.86)
function base vectors,
base vectors,
G J, G_A, G_A, G¢¢A, G_A, GCrA, G,tAr/b, _¢A_b, _3_Ar/c, G_A_c, G_J, G_J
modulus weighted Eqs. (4.13k-v)
shear
airfoil
plunging
h_
offset
of beam
h x, hy, h z
components
HR
total
Eq. (3.2a-c) Eq. (3.12a-c)
modulus cross
section
integrals
of the beam,
velocity element
in-board
node
from
blade
root
of he in the (ex, ey, ez) system
longitudinal
hub
force
A
ib, Jb, kb
unit vectors blade-fixed
unit
vectors
coordinate A
space,
Eq. (4.4)
longitudinal
A
shear
force
GET
A
Eq. (6.57)
Eq.
force
det[g i- gj],
undeformed
in modal
of i-th clement,
=
g_
vector,
in Eq. (6.5)
vector
g
gx, g,,
force
A
associated coordinate
associated
with the system
preconed,
pitched,
with
the
preconed,
blade-fixed
with
the
nonrotating,
system
A
inr, Jnr, knr
unit
vectors
associated
XX
hub-fixed
coordinate A
lr,
A
A
.Jr,
kr
unit vectors associated coordinate system blade
|b
I m_n,
lm_,
system
lm_¢
flapping
with
moment
mass weighted moments section, Eq. (4.56d-f) function,
Eq. (7.3)
J1
objective
function,
Eq. (7.8)
J2
objective
function,
Eq. (7.9)
objective
function
hub-fixed
about
of inertia
objective
km
rotating,
of inertia
J
kA
the
blade
of the beam
of approximate of blade
cross-section,
mass
of blade
cross-section,
of gyration
cross-
problem
polar radius of gyration k2A = (Eln0 + EI¢_)/EA radius
root
k_m= k_ml+ k_2 kml,
kin2
principal
mass
radii
of gyration
[K]
system
fK]
stiffness
matrix
of linearized
[K3
stiffness
matrix
of i-th element,
[K_F]
element
centrifugal
[K']
element
applied
[KL]
element
linear
[K _]
element
nonlinear
I
length
of the elastic
length
of-beam
stiffness
L
aerodynamic
m
mass
per unit
matrix
of blade
in modal
stiffness
Eq. (4.87) matrix,
stiffening matrix,
stiffness
Eq.
matrix,
portion
of the
element lift per unit length
xxi
span
of the
Eq. (6.11)
system
stiffening moment
space,
cross-section
blade
Eq. (4.85) matrix,
Eq. (4.86)
(4.83) Eq. (4.83) blade
reDo-
mass weighted warping section, Eq. (4.56g-j)
mD3
mr/_,
constants
mass weighted first moments section, Eq. (4.56b-c)
m_m
m A
distributed
aerodynamic
m!
distributed
inertial
M
aerodynamic
of the
moment
moment
unit
moment resultants Eqs. (4.12a-j)
of the
beam
MIt
vector
of total
hub
moment
MRk
vector
of root
moment
[M]
element system
[M c]
element
[Mi]
mass
n
number
M z, M',,
g,, __p,,T,, S,,
M_,
moment
beam
beam
vector,
vector,
per
My,
of the
cross-
cross-
Eq.
(6.62)
Eq. (6.59)
span cross-section,
S'_
nx',
n_',
n( !
Nm
for k-th
blade
mass matrix, Eq. (4.85); also mass matrix in modal space, Eq. (6.13) Coriolis matrix
damping
of i-th
element,
of elements
components
matrix,
in the
Eq. (4.85)
Eq. (4.87) finite
element
model
of 8_) in the (_,, %, ^' ^' e_) system
number
of modes
used
number
of harmonics
in modal retained
transformation in Fourier
series
expansion Px, Py, Pz I
components
of P in the
(ex, ^ ^ey, Cz) system
P,7 , PC'
components of aerodynamic forces _ and _ directions, respectively
P
distributed
q_, q_',
qy, q_',
q_
q,/
force
vector
of the beam,
components
of Q in the (i x, _y, ez)
components
of Q in the
xxii
per unit span
Eq. (4.60)
system
(_,, _,_, _) system
in the
q
vector
of finite
clement
nodal
qi
vector
of nodal
degrees
of freedom
Q
number
Q
distributed
[Q]
reduced
EQi]
modal
Qij
coefficients
r
radial position of a point on the to center of rotation, Eq. (5.38)
degrccs
of freedom for i-th
clement
of constraints moment beam
vector
material
transformation
of the
stiffness matrix
beam,
Eq. (4.79)
matrix, for i-th
Eq. clement
of [Q] blade
with
respect
position vector of a point on the undeformed with respect to fixed point in inertial reference I'o
position vector of a point undeformed beam
R
rotor
R
position
vector
Ro
position
vector
RB
position rotation,
vector of blade Eq. (4.21)
R C
position respect
Rex, Roy, Rcz
components
t
time
T
kinetic
TR
total
[T j,
[Tb,],
[Tj,
[Tj,
[Tec],
[Tpb ]
['Tde ]
(3.50)
axis
beam frame
on the
elastic
of the
of a point
on the
deformed
beam
of a point
on the
deformed
elastic
respect
to axis
deformed
beam
radius
root
with
vector of a point on the to blade root, Eq. (4.22) of Rc in the
axis of
with
(_,,, _y, ez) system
energy thrust
generated
by the
rotor
transformation matrices between coordinate Eqs. (2.2), (2.4), (2.7), (2.9), (2.13), (2.17) transformation
matrix
xxiii
defined
in Eqs.
(2.15),
systems,
(4.40)
[T c]
transformation
matrix
defined
in Eq. (4.105)
[TK]
transformation
matrix
defined
in Eq. (4.104)
[T ,_t]
transformation
matrix
defined
in Eq. (4.106)
U,
V,
components
W
of u in the ($_, Sy, cz) system
U
displacement vector of a point the blade, Eq. (3.25)
OR
resultant Eq. (5.3)
U
strain
U
velocity vector of a point on the elastic blade relative to air, Eq. (5.12)
airfoil
velocity
on the elastic
relative
to air,
energy
A{,
components
I%.#
Ap
velocity
of airfoil
V
velocity vector of a point on the the inertial reference frame
{vi,{wi,14,i,{u},
vectors
of clement
nodal
values
st, p,_ and p_¢, respectively, V A
velocity inflow
vector
of air due
V B
velocity
vector
of the blade
Vby,
Vbz
axis of the
of U in the (ex, %, e¢) system
free-stream
Vbx,
axis of
components
beam
with
respect
for v, w, _b, u,
Eq. (4.79) to forward
root,
flight
and
Eq. (4.24)
of Vs in the (_x, _y, ez) system
Vc
velocity relative
vector of a point on the deformed beam to the velocity of blade root, Eq. (4.28)
VEA
velocity
vector
VF
flight
VF
magnitude
velocity
components
of a point vector
on the blade
elastic
of helicopter
of V_ of V A in the (ex, ey, ez) system
xxtv
axis
to
components
of
stress resultants Eq. (4.11 a-c)
_T X
in the (ex, ey, ez) system
VEA
of the
beam
cross-section,
total axial inertial force due to the portion blade outboard of the element, Eq. (6.3) weight
of
of helicopter
work of external nonconservative curvilinear
loads loads
including
the
effects
of the
coordinates
aerodynamic center offset from elastic axis, positive for aerodynamic center ahead of elastic axis XI,
X2,
X3
indicial offset
XFA
notations
for x, n and
of fuselage
center
of drag
(, respectively from
hub
center
A
XFC
in the
inr direction
offset
of helicopter
center
of gravity
from
hub
A
center Yl,
Y2, Y3
local
in the
-
cartesian
in_ direction coordinates
Y
vector
Y0
blade
Yb
vector
of generalized
Yt
vector
of trim
Yu, Y_,
Y,,, Yw, Y_,, Y_, Y¢
of generalized static
equilibrium
coordinates position blade
in hover
degrees
of freedom
variables
notation used for writing the beam strain expressions in concise form, Eqs. (4.17a-g)
energy
zo,z,, _, , Z_,_, Z;, Z., -_ Zw, __Z_, __Z_, Z_, Z¢,
notation used for writing the beam kinetic expressions in concise form, Eqs. (4.51a-i) Eqs. (4.55a-i)
energy and
ZFA
offset
center
Z_,
Z_,
of fuselage
XXV
center
of drag
from
hub
A
ZFC
in the
-
knr direction
offset
of helicopter
center
of gravity
from
hub
A
center
in the
-
Greek amplitude
effective
Gt R
angle
fl(x)
pretwist blade
PJ
Symbols
of warping
multiplication the amount O{A
k., direction
factor of critical damping, of structural damping added
local
angle
of attack angle precone
of attack
of the
rotor
at spanwise
for the
Lock
7
blade
disc coordinate
x
angle
blade pretwist angle at junction portion and swept tip pretwist measured
indicating to a mode
between
angle of swept tip portion relative to flj
straight
of the
blade
of the
blade
number
7n;,
,Vx¢, )'x_
engineering
_x_,
_x¢
transverse
shear shears
strain
components
at the
elastic
axis
c_u
virtual
displacement
(_We),,
virtual
work
due
to distributed
forces,
(awo)Q
virtual
work
due
to distributed
moments,
virtual
rotation
vector
vector,
of engineering
xxvl
(4.64) Eq.
(4.66)
Eq. (4.63)
non-dimensional parameter magnitude of typical elastic sub-arrays
Eq.
representing the order blade bending slope strain
components
of
_ij
strain
_'XX
axial
strain
blade
pitch
0
tensor
in the
local
cartesian
at the elastic angle
with
coordinate
axis respect
to free stream
OG
total
Op
blade pitch angle due to pitch control 0p = 00 + 0,c cos 4' + 01_ sin 4'
geometric
rotation Euler
due
pitch
angle,
to bending
angles
used
Eqs.
(5.24),
(5.27) setting,
in Timoshenko
to describe
the
beam
transformation
the undeformed curvilinear coordinate system deformed curvilinear coordinate system 00, 01o
Kn,
K_
E,,]
Ols
collective
and
cyclic
deformed
curvature
system
pitch
control
of the
beam
from to the
inputs
transformation matrix between and its derivatives, Eq. (3.34)
the triad
(f:;,, %,^'e¢"')
['Ko]
transformation matrix between and its derivatives, Eq. (3.33)
the
(ix, _, _z¢)
2
inflow
A_
blade
Ah
ply angle
A_
blade
A_
ply angle
[A]
local-to-global
transformation
matrix,
Eq. (4.92)
[AC]
local-to-global
transformation
matrix,
Eq. (4.111)
[A K]
local-to-global
transformation
matrix,
Eq. (4.1 I0)
[A"]
local-to-global
transformation
matrix,
Eq. (4.110)
[Av ]
local-to-global
transformation
matrix,
Eq.' (4.1 ! 2)
ratio,/l
=
VF sin _R + v _R
tip anhedral
angle,
in horizontal
tip sweep
triad
angle,
in vertical
xxvii
positive
walls positive walls
upward
of box beams for sweep
of box
back
beams
V F COS 0t R
advance
ratio,/_
v
rotor induced
VLT
longitudinal
=
velocity Poisson's
non-dimensional p
mass density
p^
density
O"
rotor solidity
O'xx ,
O'qC, O'x__ O'x_
{oJ
ratio
coordinate
of beam
element
( -- x__) le
of the beam
of air
components engineering
0"_._/, O'CC,
glR
of stress tensor; stress components
sub-arrays
of engineering
T
twist of the deformed
Tc °
notation
To
initial
defined
also
stress components
beam
in Eq. (4.41)
twist of the beam ( = _-_--Px )
torsional
elastic deformation
second order elastic Eq. (3.41)
of the blade
twist effect of the beam,
u
{_l_c},
{_c'
{(De"
¢,
},
{¢_q'
{_q"
Eq. (4.109)
arrays of Hermite cubic and quadratic interpolation polynomials, respectively, for the beam element
{(_q}
},
fl + _,
first derivatives of {q_¢} and {_q} with respect to x
}
}
second derivatives with respect to x blade azimuth; non-dimensional out-of-plane
, respectively,
of {Oc} and {_q}
, respectively,
also time (_ = fZt) warping
xxviii
function
for the cross-section
rotating
flap,
lead-lag
fundamental frequencies,
_5
angular system
and
torsional
rotating flap, respectively
lead-lag
velocity of the undeformed (_,, _y, cz), Eq. (4.29)
speed
of rotation
components
of the
of _ in the
Special
quantity associated specifically defined
( )o, ( )o
quantity in the global specifically defined
( )l., ( )L
quantity in the local specifically defined
).,.(
),_
derivative
of (
d( )
differential
a( )
variation
of(
a( )
a_( )
(),()
at
'
{ }
vector
[]
matrix
[ ]i-
transpose
with
) with
)
of ( )
at 2
of [
and
torsional
clement
coordinate
rotor (ex, ey, ez) system,
Eq. (4.32)
Symbols
( ),
( ).,.(
frequencies
]
xxvix
the
tip element,
coordinate
coordinate
respect
system,
system,
unless
unless
unless
to x, r/, _, respectively
SUMMARY This report describes the development of an aeroelastic analysis capability for composite helicopter rotor blades with straight and swept tips, and its application to the simulation of helicopter vibration reduction through structural optimization. A new aeroelastic model is developed in this study which is suitable for composite rotor blades with swept tips in hover and in forward flight. The hingeless blade is modeled by beam type finite elements. A single finitc element is used to model the swept tip. Arbitrary cross-sectional shape, generally anisotropic material behavior, transverse shears and out-of-plane warping are included in the blade model. The nonlinear equations of motion, derived using Hamilton's principle, are based on a moderate deflection theory. Composite blade cross-sectional properties are calculated by a separate linear, two-dimensional cross section analysis. The aerodynamic loads are obtained from quasi-steady, incompressible aerodynamics, based on an implicit formulation. The trim and steady state blade aeroelastic response are solved in a fully coupled manner. In forward flight, where the blade equations of motion are periodic, the coupled trim-aeroelastic response solution is obtained from the harmonic balance method. Subsequently, the periodic system is linearized about the steady state response, and its stability is determined from Floquet theory. Numerical results illustrating the influence of composite ply orientation, tip sweep and anhedral on trim, vibratory hub loads, blade response and stability, are presented, it is found that composite ply orientation has a significant influence on blade stability. The flap-torsion coupling associated with tip sweep can induce aeroelastic instability due to frequency coalescence. This instability can be removed by appropriate ply orientation in the composite construction. The structural optimization study is conducted by combining the aeroelastic analysis developed in this study with an optimization package (DOT) to minimize thc vibratory hub loads in forward flight; subject to frequency and aeroelastic stability constraints. The design variables, during optimization, consist of the composite ply orientations, of the primary blade structure, and tip swecp and anhedral. A parametric study showing the effects of tip sweep, anhcdral and composite ply orientation on blade aeroelastic behavior is used as a valuable precursor in selecting the initial design for the optimization studics. However, the most appropriate combination of the design variables, for vibration reduction, can only be selected by the optimizer. Optimization results show that remarkable reductions in vibration levels, at the hub, can be achieved the most
by a judicious combination dominant design variable
of design variables; and for the cases considered.
m
that
tip sweep
is
Chapter INTRODUCTION
1.1
AND
I
LITERATURE
REVIEW
INTRODUCTION Structural
optimization
flight
has
been
as an
important
and
their
sign
process.
typical ingly
recognized area
reduction
bration
interact
at reducing
each
vibration
into the fuselage.
amount
of
research
in
rotor
other. flight
levels
as the
The
area
design,
i.e.,
been
the
become
because main
de-
levels
at
increasinter-
numerous
optimization
the
rotor
helicopter
where
it is not surprising has
by
by the highly
effective
source,
Therefore this
have
use of structural
at the
academia
for vibration
complicated
is particularly
and
in the
seat,
blade
in forward
generated
criteria pilot
is further
helicopter
organizations
of concern
design
such
reduction
vibrations area
decade
problem
in forward
the
propagates
of
research
because
fuselage,
with
reduction
last
The
nature
for vibration
a principal
the
in the
stringent.
disciplinary disciplines
of endeavor
During
blades
by industry,
represent
locations more
of rotor
for vi-
it is aimed
rotor,
before
it
that a considerable
performed
during
the
last
decade[28]. The
majority
to straight
of the structural
isotropic
of composite
blades.
materials
tolerance
than
comparable
processes
for composite
optimization Modern
because
such
metal blades
studies[28]
helicopter blades
blades.
facilitate
have
have
been
restricted
rotor
blades
have
better
fatigue
life and
Furthermore, the incorporation
current
been
built
damage
manufacturing
of refined
planforms
and airfoil geometriesin the blade design process. Blade manufacturing costs are alsolower becausethere are fewer machining operations. Composite rotor blades also offer the potential for aeroelastic tailoring using structural optimization, which can produce remarkable payoffs in the multidisciplinary design of rotorcraft. Rotor blades with swept tips, shown schematically in Fig. 1.1, experience bending-torsion and bending-axial coupling effects due to sweepand anhedral. Swept tips influence blade dynamics becausethey are located at the regions of high dynamic pressureand relatively large elastic displacements. Thus, tip sweep and tip anhedral provide an alternative for the aeroelastictailoring of rotor blades. Swept tips are also effective for reducing aerodynamic noise and blade vibrations. The general objectives of this research are to develop a new aeroelastic analysis capability for composite helicopter rotor blades with swept tips and to conduct a structural optimization study combining this new analysis capability with a structural optimization package. In the next section, a review of the state of the art is given in the areas pertinent to theseobjectives. The specific objectivesof this dissertation are then described in the last section of the chapter.
2
1.2
LITERATURE
!.2.1
Structural
During stability
jority
Modeling
the
twenty
of helicopter
rotor
blade
of studies
use
a beam
strains
and
with
dealing
finite
limit
of the blade
rotor on
first blades
a linear
neglected.
established
is an inherently
the structural
or large)
rotations,
between
axial, forces.
strain
bending,
due
The
overwhelming
ma-
made.
be designed
This
are being
stating
is due to the
life considerations.
of the
rotor
blade
properties.
models
Several
to account
well
that below
available
typical
for asso-
are small
requirement levels
small
strain-displacement
strains
to fatigue
number
blades
deformations
of the
at strain
due
used
torsional
that
rotor
incorporating
to operate
material
material
of helicopter
In the derivation
assumption
aeroelastic
phenomenon
kinematics,
and
that
nonlinear
modeling
(moderate
to isotropic
are discussed
been
beam
must
A substantial
The
with
is usually
blades
it has
Nonlinear
a small
rotor
stricted
blades
the centrifugal
to unity
years,
Blades
model.
effects
relationships, pared
five
Rotor
deflections[23,24,25,26,32,70,71-].
type
coupling
ciated
of lsotropic
last
to moderate
the
REVIEW
as comhelicopter
the elastic
have
isotropic
been
blade
re-
models
below.
analytical was
developed
theory As
model
and
a result,
for the flap-lag-torsion by H_)ubolt
nonlinear the
and
displacement
bending-torsion
of pretwisted
Brooks[-51]. terms coupling
This in the effects
nonuniform model
is based
derivation due
to the
were ge-
ometrical
nonlinearities,
absent
in this
In order of small
to incorporate
and
and
the
formation configuration
were
plane
derived
nonlinear
validated
by
flection
and
and
isolated
the
triad
blade.
blade
analysis,
were
to the
operators,
developed
in
Refs.
and
elastic
these
were and
used
in the
A moderate 40
and
76,
with
beam
the vec-
theories
in the
aeroelastic
de-
which
pro-
stability beam
was
derived
were
moderate
appropriate
deflection
and
in the derivation
beam
the
that
plane
theories[40,76]
also
theories
of unit
remain
used
These
with
the
assumption
performed
combined
trans-
undeformed
triad
axis
were
beam
the
de-
Friedmann[76],
Euler-Bernoulli
tests
the
the
associated
undeformed
deformation,
Subsequently
blades[41,81].
the
the
to static
with
deflection
relationships.
them
operators
derive
and
vectors
undeformed
axis after
blade,
Rosen
and
assumption
between
moderate
and
to the
distinguish
of unit
with
due
associated
In the
deformed
together
elastic
rotor
of the
Dowell[40], the
comparing
structural
should
vectors
strain-displacement
aerodynamic
those
of the
regime[21,77]. the
and
which,
to the
nonlinearities
one
of unit
perpendicular
perpendicular
vided
triad
between
sections
of the
for the rotor
configurations
blade
Hodges
transformations tors
the
configuration by
rotations,
undeformed
of the
developed
important
the geometrical
finite
between
deformed
are
model.
strains
formed
which
theory, by
inertial analyses
of
similar
to
Kaza
and
a large
num-
Kvaternik[54]. During ber
the derivations
of nonlinear
to the
assumption
terms
of a moderate are generated.
of small
strains
and
deflection Many moderate
beam
of them
are
rotations.
theory, relatively
Therefore,
small
due
ordering
schemes
can
terms
be useful
in a consistent
on assigning
orders
governing
the
are assumed of order
allows
rium
blade.
for the
approximation i.
perience
where
with
Hodges[43]
the
of moderate magnitudes
was
small
of the
(and
were
less than
used
instead nonlinear
beam,
which
element served terms
used
was in
equations
removed.
used
such
are
terms an ap-
of equiliba third
compared
schemes
which
that
equations
therefore
kinematics
The
only
order
to terms based
a certain
of
on
ex-
degree
of
larger This
of motion
than
for examining
of motion.
5
on
the
extensional
strain
and
that
the
orientation
angles
theory
was
used
parameters in the
pretwisted
effects
basis This
of higher
were
development
rotating
theoretical
GRASP[44-1. the
assump-
introduced
90 °, Rodrigues
as the
program
assumptions
the
that
of a straight
employed
in which
were
to unity,
angles.
computer tool
and
parameters
rotations
subsequently the
neglected
slopes,
using
also
based
parameters
implies
dynamic
beam
compared
equations
as a valuable in the
was
kinematical
For
bending
1; and
ordering
are
implementation.
of orientation
of the
such
configurations,
negligible) 90 °.
of order
e a were
a nonlinear
rotation
blade
studies[15,16,78,79]
that
nonlinear
physical
approximation
conveniently,
blade
developed
order
to derive,
to note
in their
of the
to terms
of order
order
schemes[40,41,76,81]
compared
terms
actual
is used
e. A second
higher
non-dimensional
in terms
A few latter
It is important
flexibility
tion
one
neglecting
ordering
to the
problem
neglected
and
Most
of magnitude
to be of order
e 2 are
identifying
manner.
aeroelastic
proximation
order
for
isotropic
for the beam
order
beam
element nonlinear
1.2.2
Structural
Modern
helicopter
therefore have
Modeling
during
been
aimed and
attributes
of such
shear
tion
by
assumed used
earlier,
in the cross
section
for
the
nonuniform can,
which cross are
beam. therefore,
lead
into
one-dimensional
functions, theory.
and
from
it needs
The
Anisotropic account beam
the
nonlinear
two
materials
kinematics
once
stiffness and
category. suitable
coupling,
an
the
transin addi-
A review rotor
out
were
Hodges[32]. In a beam
of the
plane,
approach
analysis
of the
blades
and
in and
is to determine
and
cross
sectional
analysis
one-dimensional
global
for rotor
each
cross
blade (l)
properties composite
(2) Structural for composite
are
commonly
two-dimensional
categories:
of the
in this
linear
important
to represent
location,
of composite
into
The
as beams.
blade
center
to be done
discussion
determination
rotor
The
blades.
modeled
Therefore,
shear
suitable
Friedmann
both
for composite
for the
composite
typically
cross-section,
be divided
to the
sections. taken
models
is decoupled beam
are
are
nonlinearities.
and
or neglected.
on a linear
cross-section
ysis
of the
warping
based
blades
studies
and elastic
for modeling
materials;
of analytical
the capability
warping
Hodges[45]
small
structural
require
which rotor
of geometric
suitable
rotor
to be either
of models
model
of composite
number
of composite
representation models
built
a substantial
cross-sectional
deformations
properties
ing
a structural
Blades
are frequently
analysis
Friedmann[26],
As mentioned the
blades
Rotor
development
aeroelastic
structural
theory,
the
deformation,
presented
the
at
to an adequate
existing
the
rotor
the past few years,
structural
verse
of Composite
models rotor
of a model-
approaches
of arbitrary nature
anal-
section
structural
Modeling
for
blade
of the which blade
blade use
analysis.
an
A typical structural model of this category should include geometric nonlinearities, pretwist, transverse shear deformation and cross section warping. Many of the existing composite rotor blade models in category (r) were discussedin detail by Hodges[45]. Mansfield and Sobey[63] made the first attemp to the study of this subject by developing the stiffness properties of a fiber composite tube subjected to coupled bending, torsion and extension. Transverseshearand warping of the crossscetion were not included in the model. This model wastoo primitive for composite rotor blade aeroelasticanalysis. Rehfield[75] used a similar approach but included out-of-plane warping and transverseshear deformation. This was a static theory for a single cell, thin-walled, closed cross-section composite, with arbitrary layup, undergoing small displacements. This relatively simple theory was subsequently correlated by Nixonl'69] with experimental data. Hodges, Nixon and Rehfield[47] also conducted a comparison study of this model[75] with a NASTRAN finite elementanalysisfor a beam having a single closedcell. W6rndle[101] developeda linear, two-dimensional finite elementmodel to calculate the cross sectional warping functions of a composite beam under transverseand torsional shear. With thesewarping functions, the shearcenter locations and the stiffness properties of the cross section could be calculated. In this theory arbitrary crosssectional shapescould be modeledbut the material properties were restricted to'monoclinic. A more general model for calculating the shear center and the stiffness properties of an arbitrarily shaped composite cross section was developedby
Kosmatka[56]. He useda two-dimensional finite element model to obtain St.
Venent
solution
composite
of the
cantilever
sumed
beam
to be prismatic
consistcd
of generally
analysis
was combined
structural
stiffness
et a1.[37]
equations
central
solutions
had
end
by
stiffness
Borri
associated
Bauchau[3] that
plane.
out-of-plane
so-called cellcd was
the
extended
orthotropic
with by material
Bauchau,
and
theory
section
This
theory
the
location
that
the
The
to applied
this
work
geometric
re-
loads to the was
ex-
section
formulations.
beam
material and
materials
does
for
8
center
anal-
correspond
so-called
is valid
properties.
for the
solutions.
due
Subsequently,
was
Coffenberry
sectional
element
was
solutions
warping
isotropic
shear
central
for anisotropic
of the
blade
suitable
finite
displacements
the extremity
cross
transversely
theory
as-
blades[56,57].
solutions
effects.
was
The
of this formulation
displacement
section
beam
loaded
beam
this cross
functions,
to include
a beam
cross
eigenwarpings. beams
to end
large
dcveioped
aspect
while
Merlinil-10]
assumption The
effects,
with
warping
to the warping
due
and
Subsequently,
a two-dimensional
extremity
correspond
The
tip
nonhomogcneous.
propeller
sectional
of a
section.
deflection
formulated
both
displacements
tcnded
materials.
A special
functions
cross and
of advanced
the cross
considering
warping
uniform)
a moderate
also
properties.
sulting
without
with
warping
an arbitrary
(axially
analysis
ysis for determining and
with
anisotropic
dynamic
Giavotto,
cross-section
the
not
based
deform
on the
in its own
expressed
in terms
of the
thin-walled,
closed,
multi-
properties.
Rehfield[5]
Subsequently to allow
for general
it
The
studies
based
on
on composite
a separate
warping
once
for
each
Kim[58] can
and
taper
and
This
such
cross
section.
of the cross and
warping
extension.
and
linear
Stemple
and
Lee[88]
flections
of beams
beams.
This analysis
it was
never
The
is coupled
and
as well
as the
is much
is decoupled used
structural
in the
from
aeroelastic
models
for
modeling
approach
associated
termining
the
center,
shear
posite
cross
section.
is the
one-dimensional
rotor
blades,
two
For
types
in the free
the
more the
with
analysis
category
of theories
of rotor
blade
category
(I),
are
available
9
bending,
by
slatic
de-
composite
whose
cross
and
sec-
therefore
blades.
where
so far the
cross-sectional
suitable
treatment
extended
of large
analysis,
section
out-of-plane
of rotating
discussed
(2) structural
kinematics
beam
the
the
those
which
cross
partially
study
and
warping.
of the beam
analysis
Lee
section the
only
than
by
out
spanwise
Thus
treatment
preliminary
nonlinear
and
element.
fi)r
general
over
it was
expensive
earlier
fl)rmulation
cross
considers
vibration
composite
warping
beam
with
were
to be carried
sections,
nodes
finite
Subsequently
used
has
arbitrary
formulation
problems.
approach
type
mentioned
developed
cross
allows
above,
the cross-sectional
element
warping
beam
This
a finite
arbitrary
and
as
approach,
uses
with
of regular
warping
tional
Lee[87],
by distributing
node
and analysis
alternate
distributions
section
properties,
An
described
to determine
a two-dimensional
beams
accomplished
modeling,
analysis
stiffness
and
thin-walled
at the
torsion
the
beams,
planform
was
situated
and
Stemple
represent
structural
two-dimensional
functions
non-uniform
blade
modeling, for the depending
emphasize
emphasis
properties where analysis on the
the
is on deof the com-
the emphasis of composite level of ge-
ometric The
nonlinearity
first
type
is capable use
is based
thus
between blade
the
displacement
the
axial
an
ordering
terms
For is that
For
quantities
While
scheme
to
magnitude
such
theories
the
models
based
are
rotor
blade
on large
consistent
than
ration
of such
models
could
be complicated. deflection
theories
large
deflection
theories.
sented
first
aeroelastic
those
blade
was
trary
lay-up
deflections
treated
taken
theories
using
are
of
respect
to
do not utilize and
to neglect
aeroelastic
also
model
be more
by Hong
higher
plies.
The
Hodges
10
scheme
scheme;
roorder
more
the
involving
those
blade
Chopral-48]. box
beam
Dowell[40-1,
with
associated
in hover
was
In this model, composed relations
which
and
incorpo-
forward
modest
rotor
Blade
elegant
however,
than
theories
is used.
associated
strain-displacement and
deflection
requirements
and
laminated
ordering
analyses
for a composite
study
moderate
mathematically
an ordering
computational
may
from
ro-
in terms
displacements
used
analysis,
a consistent
as a single-cell,
of composite were
that
into general
in a comprehensive
assumption
aeroelastic
deflection
The
erate
only
and
with
theories
blade
usually
transformation
derivatives
deflection of
the
typc
small.
provided
more
The
the
strains
adequate
the
theories
bc exprcssed
their
large
second
displacements and
coordinates
kinematics.
the
deflection
of blade
(u, v, w, Oh, and
limit
while
relations
x) explicitly.
helicopter
usually
magnitude
undeformed
beam
theory
Moderate
strain-displacement and
coordinate,
tations.
are
deformed
the
one-dimensional
deflection
deflections.
to limit
the
in the
a moderate
large
scheme enable
rctaincd
on
of modeling
an ordering
tations,
being
flight modwith
prethe
of an arbifor moderate
do not
include
the
effect of transversesheardeformations. Each lamina sumed
to have
orthotropic
obtained
using
discretize
the
lag-torsional fects
Ref.
aeroelastic
structural
model
the
forward single-cell,
suitable was
a strong
rotor also
flight.
models
propeller
geometry
was
location
were
blades,
general
Panda
that
Smith
in Ref.
48 to include
a more
refined
stability
cross
and
loads
in Refs.
48,
modeling model
pre-
study
the
to
blades
in for-
modified
shear
analysis[-85],
and
the
of transverse
of composite 72
84
ef-
to the
Chopra[84]
section
flap-
stability
rotor
the effect
to
on blade
Chopra[72]
and
used
coupling
structural
hingeless
aswere
coupled
the
extended The
_;as
the
influence
and
of composite study,
for the structural which,
modeling
with
of curved,
Kosmatka['56,57].
general.
which
showed
in hover[-49]. by
used
for
was
of motion
model
results
was
to inves-
rotor were
blades
in
restricted
to
box beams. analysis
by
used
response,
rectangular
for the
blades
recent
with
The
this analysis
response
presented
aeroelastic
developed
model[56],
have
and
A comprehensive composite
construction
laminate
equations
element
blades
was
together
finite
rotor
In a more
deformation, tigate
48
A
Numerical
Subsequently
stability
flight.
principle.
The
of hingeless
bearingless
in
properties.
of motion.
in hover.
of composite
ward
equations
to composite
boundaries
sented
Hamilton's
behavior
due
material
of the
The
obtained has
been
some
a
discussed
model
stiffness
linear briefly
11
modeling
of advanced
modifications,
pretwisted
In this
cross'sectional from
dynamic
composite the
blade
properties
two-dimensional earlier
could
be
rotor cross
and
in this section.
blades, sectional
shear
finite
also
center element
Bauchau and Hong[4,6,7] developeda seriesof beam
models
acroclastic noted was
which
analysis.
by
Hong
suitable
large
such
as small
warpings.
were
made
on
the
fore,
the
were
retained
small
strain
ial and
neglected
when
relative
magnitude
this
assumption,
in beam
having
for
free
models and
large
results
are
of the with
obtained
strains,
deformations were with
both
in the
axial
same
isotropic
of anisotropy,
by
comparing
as well
12
as studies
strain
and
shear was
strains.
Thereexpression
was
be
on
the
often
axused
materials.
inadequate
analytical
beam.
used
that
anisotropic
it might
studies[50],
small
strain
of magnitude,
kevlar
that
A frequently
that
a thin-walled
out-of-plane
restriction
assumption
or slightly
effects
no assumption
assumption.
order
The
of the com-
axial
shear
an additional
theory[7]
strains.
a revised
showed
for
the
and
terms
were
undergoing
and
the
axial
and
to incorporate
however
strain
includes
Hong[7]
amounts
vibration
small
small
to unity,
coupling
revised
of their
on an extension
assumption,
between
dynamic
beams
only
combined
strain
composite
models[4,6]
twisted
kinematics
plane
two
version
and
shear
compared
strain
final
Green
in the
small
which
strains
Bauchau
perimental
shear
under
shearing
However, beams
revised
order
of
transverse
in its own
first
based
deflection
structural
undergoing
were
definition
this
second
successfully
in the
while
assumptions
blade
curved
theory
curvature,
is rigid In
this
the
basic
cross-section
rotations,
with
initial
The
strains
rotor
The
naturally
and
using
assumption.
for
shortcomings
modeling
associated
approach,
used
Some
displacements
mon
intended
in his dissertation[-50].
for
kinematics
the
were
large
This beams
for
and model
exwas
undergoing
large static deflections. However, an aeroelasticanalysisof rotor bladesbased on this model is not available to date. Minguet and Dugundji[66,67] also developeda large deflection composite blade model for static[66] and free vibration[67] analyses. Large deflections were accounted for by using the Euler angles to describe the transformation between a global and local coordinate system after deformation.
However,
transversesheardeformation and crosssection warping were not incorporated in this model. Thus this model is more suitable for the study of flat composite strips than actual rotor blades. Hodges[46] presenteda general beamtheory basedon a nonlinear intrinsic formulation for the dynamics of initially curved and twisted beamsin a moving frame. This beam model is valid for both isotropic and compositebeams. The nonlinear beam kinematics was basedon a theory developedby Danielson and Hodges[17,18]. The final set of equations of motion were derived using a mixed variational principle, which provided the basis for finite element formulation.
Subsequently Fulton and Hodges[22] developed a finite element
basedstability analysis for a hingelesscomposite isolated rotor in hover.
1.2.3
Structural
Only
a limited
modeling by
Tarzanin
hub
loads
of rotor and
Modeling number blades
of Swept-tip
Blades
of analytical
studies
with
swept
Vlaminck[90]
of an articulated
tips.
An
to investigate rotor
system.
13
have
addressed
analytical the
In this
effect model,
study of tip
the
aeroelastic
was
conducted
sweep
tip sweep
was
on
the
simu-
latcd approximately by manipulating the relative positions of the shear center, aerodynamic center and masscenter of the cross sectionsof a straight blade. The mathematical model consistedof coupled flap-torsion and uncoupled lag equations of motion. The numericalresultsobtained led them to conclude that tip sweep influencesboth bladevibrations and stability. Celi and Friedmann[12] developeda comprehensiveand consistent model which was capable of simulating the aeroelasticbehavior of a hingelessrotor blade
with
a swept
presented tural,
tip.
in Ref.
inertia
presenting
[81].
and
while
of Galerkin
and
systematic
and
forward
briefly
next.
of hingeless
of
design
not
axially
coalescence
its comprehensive
limitations
because rigid
important
element,
blade
However,
addition does
it approximated it also
of small not the
occur, model the
employed
14
was
instabilities
used
swept
detailed
in both in Ref. the on
a
hover 12 are
dynamic a number of blade
by tip sweep and
are can-
damping.
is usually
stabilizing.
in Ref.
linear
using
first
on
re-
of structural
sweep
tip a
the
are strong,
amounts tip
modeled
combination
induced
struc-
element
depends
the
instabilities Such
was
influence
and
the
stability
its effect
as precone
of motion
finite
obtained
a powerful
aeroelastic
nature,
and
of the
beam
conclusions
has
coalescence.
the
a special
on blade
such
by
for
equations
by developing
of tip sweep
parameters,
frequency
modeled
portion
sweep
The
the
This
blades.
frequency
Despite
Tip
on
elements[27,89].
rotor
be eliminated
When
most
based
tip was
operators
finite
frequencies. with
was
the straight
The
behavior
associated
swept
of the effect
flight.
fundamental
The
type
study
described
blade
analysis
aerodynamic
the tip,
number
The
12 had
portion
of
a number the
transformation
of
blade
as
at
the
junction where the swept-tip element was combined with the straight portion of the blade. It was latter shown that such a transformation could be inaccurate for large sweep angles[73].
Furthermore, it should be noted that the
studies presentedin Refs.90 and 12 wererestricted in the sensethat they could only representtip sweep,but not anhedral (seeFig. 2.3). Bcnquet and Chopra response finite
and element
however tip
loads
still
the
Chopra1-55]
each the
using
All isotropic
model
on
a linear
was
of the
given
into
finite
in the on
swept
Ref.
8 to
tip and
constraint
and
anhedral,
the swept
include
oriented
portion
developed
and
elastic
Fuselage
dynamic
mentioned
above
and
nonlinear
formulation pretwist
using
Kim
relations
the
anhedral,
the straight
an aeroelastic
of arbitrarily
elements.
sweep
Subsequently,
in
sweep,
flight
for combining
the swept and
to calculate
in forward tip
blade.
developed
as a series
included studies
the
between
variable
both
transformation
formulation
with
analysis
blade
included
of
Chopra[9]
modeled divided
hingeless
transformation
blades
was
segment blades
the
Bir and
geometry
blade
This
in the assembly
Panda[73].
The
the
an aeroelastic
tip
portion
extended
blade,
vanced
based
straight
transformation of the
of an advanced
method.
it was
with
I-8] developed
by
for adplanform.
segments interaction
with with
formulation. tip
blades
blades.
15
were
restricted
to
1.2.4
Structural
A fairly using
Optimization
recent
survey
structural
straints,
was
grated
optimization, by
multidisciplinary
tional
by careful hardware
mentioned
in this
section.
on helicopter
rotor
blades.
Friedmann
and
methods
helicopter
rotor
the
oscillatory
ratio/_ blade and
and
The
used
hingeless levels, Lim
as rotor
duction contribution
masses,
been
the
indicated
weight
reduction
carried
rotor
blades
in Refs.
61
out
Cross
16
addi-
a few studies
will
optimization isotropic
for
pro-
reduction
of
consisted
of
at an advance placements
sectional
outboard
be
systems.
function
frequency
of the
dimensions
portion
of the
typical
soft-in-plane
reduction
blade,
in vibration
obtained.
aeroelastic
62
can
requiring
moments
a comprehensive
with and
rolling
a 15%-40%
were
for
mathematical
objective
results
that
potential
to vibration
in hover.
Numerical
inte-
to straight
applied
in the
the
which
structural
restricted
included
located
variables.
Chopra[61,62]
made
of
hub
constraints
levels,
or isolation
The
or the
the
without
concepts[80]
constraints
configurations
in helicopter
majority
con-
that
in Ref. 28, only
flight.
shears
stability
design
analysis
Shanthakumaran[29]
hub
tuning
and
have
in forward
as well as a 20% and
The
blades[-28]
behavior
aeroelastic
vibration
reduction
multidisciplinary
offers
in
presented
vibration
shown[28]
rotorcraft
absorbers
approximation
blades
nonstructural
were
and
vertical
= 0.3.
design
the review
studies
gramming
of
vibration
and
It was
particularly
as rotor
duplicating
be
l=riedmann['28].
preliminary
To avoid
on helicopter
aeroelastic
optimization
such
Reduction
research
with
improvements,
achieved
Vibration
describing
presented
substantial
for
consisted
study
constraints. of using
of vibration An
important
a direct
analytical
re-
approach
for the calculation
stability[60], were
with
obtained
finite
approach
able,
respect
of the
difference
only
such
cost as that
explicit
variables,
hub
loads[59]
These
computational
when
of the design
of the
variables.
method,
is applicable
as a function
derivatives
to the design
at a fraction
conventional this
of the
sensitixitv
associated
used
in Ref.
analvtical
in the
and
derivatives with
the more
29.
However
expressions
calculation
blade
are
of the
avail-
sensitivity
derivatives.
Davis
and
analysis
which
natural modal sis
was
frequency
capable
indices.
of
can
Frequency
Icvcl.
shears
lead
bration
indices
bration
reduction.
wind-tunnel
correlation mentioned
This
However
was
was
those
being
measured
aeroelastic
and stability
vibratory the
these
for
hub
most
effective
results
tests the
the
constraints
rotor rotor,
was
indices with
criteria
verified
baseline
optimum
experiments
17
were
obtained.
were
vibration
to achieve
loads,
analy-
levels. minimum
and
vibration
modal
vi-
for
rotor
vi-
extensive levels
reasonably It should
not considered
modal
the
by fairly
and
of
optimization
lower
vibration
of
tailoring
modal-based
of modal
lower
minimization
through
significantly
as blade
an automated
to bc inadequate
minimization
In these
theory
with
the
optimization such
and
characteristics that
shown
Subsequently,
between that
analysis
to substantiallv
tests[99,20]. with
modal-based modal
blade
problems, shears
design
minimization
dynamics of hub
concluded
blade alone
rotor
rotor
minimization
blade They
produce
a modal-based
to various
optimizing
placement
vibration
compared
applied
properties.
analysis
developed
placement,
vibration
structural
hub
Wcller[19]
were good
be also
in Ref.
19.
Young
and the
Tarzaninl-102]
study
on
study
two diffcrent
identical
rotor
bration
rotor
procedure, loads.
and
and
using
objective
tested
in the
procedure
consisted
moment
for the
Ref.
102
for the design
while
The the
ref-
low
vi-
optimization fixed
reductions low vibration
provides
having
tunnel.
of the
substantial
In this
rotor;
structural
showed
Thus,
wind
approach;
analytical
function
results
ratios.
an
design.
a low vibration
a conventional
overturning
advance
were
and
to rotor
system
hub
in the
4/rev
rotor
at both
a validation
of low vibration
of
rotors
the
in for-
flight.
state
and
Mantayl-l'l
of integrated intelligent
various
proach
plan
is one offers
The
studies
of the
areas
and
on straight
objective
was
the the
from
towards
the
this document
an integrated
capability
for
produced
composite
rotor
bladesl35,36].
36 was
of the an
4/rev
extension
18
current included
integration
helicopter
of
vibration design
ap-
gains.
analysis
minimization
the
which
complete that
available
laminated
on
multidisciplinary
for performance
of the
report
of rotorcraft,
stability
ply angles
Reference
optimization
where
potential
modeling
response
were
a comprehensive
development
It is evident
excellent
variables
moments.
for future
improved
aeroelastic
edited
multidisciplinary
disciplines.
reduction
tion
using
test
optimization
Adelman
an
the
rotor
airfoil,
designed
tunnel
shear
high
structural ward
was
wind
hub
and
analytical-experimental
optimization
a reference
designed
in which The
vertical
twist
was
a combined
of structural
rotors:
planform,
erence
low
application
conducted
of the
rotor
a few structural In Ref.
walls hub
composite
of the
box
blade
optimiza-
35, the beam,
loads;
both
hub
study
performed
design and
shears in Ref.
the and 35
by allowing the ply anglesto vary from element to element in the spanwise direction, and performing a multi-objective optimization to minimize the hub
loads Only
on
and
a limited
swept-tip
and
be used
blade
both
with
optimization
has
studies
constraints[14,34].
to isotropic
OF THE study
simultaneously.
aeroelastic
as an important
OBJECTIVES present
moment
of structural
restricted
effectively
The
root
number
blades;
34 are
1.3
the
4/rev
blades, design
they
were
While indicated
variable
that
for vibration
conducted
References
14
tip sweep
can
reduction.
RESEARCH
a number
of important
objectives
which
are
listed
below: 1.
Development ior
of an analysis
of composite
forward
flight.
computational
of
2.
to be critical blades
multi-cell
blade
Conduct
detailed with
rotor
analysis
with
swept
swept
is suitable
since
modeling
of the
(c) ability
tips
behav-
in hover
and
include:
(a)
for the repetitive (b)
capability,
and
aeroelastic
analysis
optimization;
accurate tips;
the
of this
the analysis
structural
for the
with
features
so that for
of modeling blades
important
response
rotor
blades
The
required
trim/aeroelastic found
helicopter
efficiency
calculations
capable
fully
this
coupled
feature
dynamic
to represent
was
behavior arbitrary
cross-sections.
straight
studies and
on
the aeroelastic
swept
tips
19
behavior
to determine
the
of composite combined
rotor effect
of
sweep,anhedral and composite ply orientation acroelastic 3.
4.
Conduct
studies
entation
on
forward
flight.
Combine
the
blades 5.
stability
Conduct posite ply
with
ducing
hub
new
shears
basic
vibration
effects
and
moments
analysis
structural
sweep
levels
of sweep,
optimization
and
tip
in forward
20
the
anhedral flight.
anhedral
of composite
package,
to illustrate
blade
response
and
flight.
capability
optimization
configurations tip
in forward
the
acroclastic
a structural
orientation,
and
illustrating
the
a few blade
in hover
on
rotor
for swept such
and
ply oriblades
in
tip composite
as DOT[106].
studies potential as design
on
two-cell,
benefits variables
com-
of using for
re-
Chapter il MODEL
In this analysis The
chapter,
the
scheme
is described
next.
2.1
used
The
ASSUM hingeless
the axis 2.
used
in the blade
various
in the
development
with
formulation
SYSTEMS
of the
a swept
tip are summarized.
of the moderate
coordinate
derivation
aeroelastic
systems
deflection
theory
related
coordi-
and
of the equations
of motion
of the
The
the
PTIONS blade
of rotation
blade
pretwist
has
is cantilevered (see
distribution
at the hub,
with
a root
offset
e_ from
Fig. 2.2).
a precone
angle
r 0 about
tip (see the
elastic
Fig.
2.2)
axis
(line
and
it has
of shear
a built-in centers)
of
blade.
3.
The
blade
has
4.
The
blade
consists
tation
5.
the
COORDINATE
rotor
in the
Finally,
AND
are defined.
BASIC 1.
helicopter used
transformations,
blade,
assumptions
of a composite
ordering
nate
DESCRIPTION
relative
and
an anhedral
The
blade
no sweep,
droop
or torque
of a straight
to the angle
is modeled
straight
portion
(A_) (see by beam
portion
offset. and
a swept
is described
tip
whose
by a sweep
orien-
angle
(A_)
the elastic
axis
Fig. 2.3). type
of the blade.
21
finite
elements
along
6.
A single
7.
The
blade
center, 8.
The
cross
stiffness are
The
blade
Note
to vary
BO-1051861,
in stiffness
mately
75°/.
relatively in the
with
this
ior of the
blade
which
and
the
blade
length)
The
elastic
portion;
built
and
its chord
of the
blade.
the
line of shear
of a stiff,
blade
the
line
extent
and
centers
pre-
of the
in which
outboard the
blade
large
vari-
(approxi-
properties
blade
of shear
such inboard
portion
of the
line.
helicopter,
nonuniform
length)
deformations
shear
by a straight
for a typical
where
is to a large
of
blade,
a flexible
axis of the whole
is
of mass.
is approximated
thus
distinct
center
consists
occur,
with
and
distribution
usually
segment
elastic
with
25*/0 of the
outboard blade
the span
can
uniform.
rily
The
of
of the
tip.
shape
center
coincides
stiffness
the swept
arbitrary
tension
blade,
(approximately
ations
have
along
axis
blade
to model
properties
of the
the
MBB
portion
mass
feathering
that
can
center,
and
portion
as the
is used
section
allowed
straight
10.
element
aerodynamic
twist, 9.
finite
occur
centers
representative
are prima-
associated
of the behav-
generally
blade. orthotropic
materials,
and
it
is
anisotropic. I I. The
blade
has
completely
coupled
flap,
lead-lag,
torsional
and
axial
dy-
namics. 12. The are 13. The and
effects
of transverse
shear
deformations
moderate
deflections,
and
out-of-plane
which
imply
warping
included. blade moderate
undergoes rotations.
22
small
strains
14. Two-dimensional quasi-steady aerodynamics, based on Greenberg's thcory, is used to obtain the distributed aerodynamic loads; this simple unsteadytheory is justifiable becausethe principal objectivesemphasize the structural modeling of the blade and its optimization for vibration reduction. 15. The induced inflow is assumedto be uniform and steady. 16. Stall and compressibility effectsare neglected. 17. Reverseflow effects are included by setting the lift and moment equal to zero and by changing the sign of the drag force inside the reverseflow region (seeFig. 5.3). 18. The rotor shaft is assumedto be rigid and the speed of rotation (ff_)of the rotor is constant. 19. The helicopter is in trimmed, steady and straight flight. The assumptionslisted above are used in various stagesof the formulation of the aeroelasticmodel. Additional assumptions needed for the structural modeling of the blade, such as the kinematical assumptionsand the assumtions used in the developmentof the constitutive relations, are discussedin Chapter 3.
23
2.2
ORDERING
SCHEME
An ordering nonlinear
scheme
terms,
a beam
generated
element
ordering
blade
nitude
0.10
is based
are
non-dimensional
).
on
of _.
In the
terms
of order
neglected
that
of magnitude
the
are
governing
with
respect
higher
slopes
manner. of the
assigned
the
aeroelastic
to terms
This
a mag-
to the various problem
it is assumed
of order
for
deformed
to have
then
equations,
order
of motion
_ is assumed
governing
of the
delete
in a consistent
e (where
parameters
derivation
_2 are
assumption
and
of the equations
deflections,
of order
Orders
to identify
the derivation
the
and
physical
terms
used
moderate
moderate,
_< _ _< 0.20
and
during
undergoing
scheme
elastic
is defined
in that
1, i.e.,
O(l)+o(_2)_ _ o(1) The
orders
study
are
O( 1 )-
of magnitude listed
for various
non-dimensional
used
below:
x l'
R 1 '
he l '
As,
A_,
O(_,/2) •
Op, fl
O(_)"
'7 !'
_
1'
!___._ _b, _= c3x' c3_b
1 a n 0t'
sinAi,
cos A,,
sinAi,
cos A,
v
v,,w
4_,_1,"
!'
1, l'
w
1'
,x,
0 x, 0_, 0_
O(_2)"
parameters
U 7-'
u x, _:xx, Y_,
W Yxr,, -12,
24
mf_212 EA
W,, t 1
sin
W_ '
1
¢,
e_ '
1'
COS
¢,
tip,
in this
In general, it is assumedthat rotation terms such as v.×,w,×and order
_, while
amplitude
strain
u is assumed
scheme
material
of magnitude. are
tions.
on
matrices,
common
coordinatc
deformation
of the
to note and
A.
ordering
experience
the
are
used
the
systems blade.
are
required
Each
coordinate
unit
vectors.
system
preconed,
to position
motions,
ey, ez) and
uration
as
_
, is used
unique
configura-
both
care
and
describc
system
is symbolically
represented
three
namely,
first
the geometry
systems,
and
,
blade,
to represent
relative
, the
rotating,
the
in Figs.
respectively,
as shown the
blade-fixed
orient
to the
hub-fixed
A
system
blade
relative
the
A
system
A
(ib, Jb, kb),
respcc-
to the
hub
through
next
two
systems,
2.1
and
2.2.
The
are
used
to
position
and
orient
each
A
(ib, Jb, kb) system
in Figs.
orientation
and
^
pitched,
shown
(e^x, _, _)
element
of the
order
to fully
The
(i_,l_,k_)
A
finite
not
blade
requires
of the
same
are
A
, and
and
of thc
actual
scheme
strains
coefficients
schemes
with
This
SYSTEMS
hub-fixed
rigid-body
beam
that
warping
as _._.
(small
^
(it, it, kr) tively,
theory
I, 5, 6), are
of the ordering
^
A
that,
The
of magnitude
deflection
Q,i (i, j =
sense
of orthonormal
nonrotating,
order
d.
of
of flexibility.
COORDINATE
a triad
same
_:x¢ are of order
it is assumed
the application
degree
and
a moderate
stiffness
Therefore,
the
Furthermore,
Several
by
as u,x, _
It is important
based
a certain
2.3
with
rotations).
reduced
such to have
is consistent
moderate
and
terms
q5 are
2.3 and of the
25
in the
2.4.
local
undeformed
A final
blade
system,
geometry
configAj,
¢x¢
(fz',, co, e¢) after
defor-
A
mation. used
An
additional
as explained
2.3.1
A
A
the
in Subsection
Nonrotating,
The
system,
preconed,
blade-fixed
system
A
A
, is
(ip, jp, kp)
2.3.7.
Hub-fluted
Coordinate
System
A
(inr, Jar, knr) system,
shown
in Fig. 2.1,
is an inertial
reference
frame
and
A
has
its origin
at the hub
center.
A
The
vector
i,r points
toward
the
helicopter
tail;
A
in, points A
to starboard;
and
kn, coincides
with
the
rotation
vector
of the
rotor.
A
in, and
j_, are
in the
in this coordinate
2.3.2
^
A
of rotation.
Hub
shears
Coordinate
System
and
moments
Hub-luted
rotates
defined
A
(i,, Jr, k,) system,
shown
in Fig. 2.1,
also
has
its origin
at the hub
A
but
are
system.
Rotating,
The
plane
with
a constant
angular
velocity
center
A
tqk r . The
vector
ir coincides
with
A
the
azimuth
position
of the blade,
while
A
k r is coincident
with
the
the
blade
vector
A
knr ; ir
A
and
j, are
2.3.3
also
in the
Preconed, A
The
A
plane
Pitched,
of rotation
of the
Blade-fixed
rotor.
Coordinate
System
A
(ib, Jb, kb) system,
shown
in Fig.
2.2,
rotates
with
and
has
A
origin
at the blade
incides
with
the
root,
offset
pitch
axis,
of the
blade.
from
which
the
is also A
straight A
A
portion A
The
hub
A
the
center
A
by e_i r . The
undeformed
its
elastic
vector axis
ib coof
the
A
(ib, Jb, kb) system
is oriented
by
rotating
the
A
(i,, jr,kr)system about - jraxis by the preconc angle _p, and subsequently in-
26
A
troducing
a second
angle
In the finite
0p.
global
coordinate
2.3.4
Undeformed
The of the axis;
finite
the
model
rotated
ir axis
of the
Element
element. the
geometric
pitch
the ('ib, lb, kb) system
is the
A
blade,
2.3,
has
its origin
_x, is aligned
_z arc
of the
defined
blade,
with
in the
, and
about
the
-
For A
the swept-tip
components
A
2.3.5
modulus
weighted
respectively, Effects ment
at
of blade
beam.
the same
orien-
the
A
A
A
anhedral for the
applied
Curvilinear
(Cx, e_, e¢) system,
is defined
of the
about
-
k b by the sweep
angle blade
loads
A a .
finite of the
The
model.
finite
As
A
(ex, ey, ez) system
element beam
,'_.
angle
The
element
is also
displace-
are defined
system.
Undeformed
In the
fl(x)
system
elastic
the (e x, ey, ez) system
A
and
in this coordinate
has
element,
node
element
section
the (ex, ey, ez) system
the (ib, Jb, kb) system
Jb by the
coordinate
inboard
beam
cross
A
mcnt
at the
A
A
by rotating
local
A
A
is oricnted
the
the
System
in Fig.
vector
_y and
portion A
shown
The
vectors
A
Coordinate
as the (ib, Jb, kb) system.
then
by
systcm.
the straight
tation
about
clement
(cx, _y, Cz) system,
while
For
rotation
Coordinate the
principal
vectors
axes
System _
of the
and
cross
as the
change
in the
orientation
any
location
aldng
the
pretwist
strain-displacement
are
properly
relations
beam
27
defined
parallel
section;
and
pretwist
of _,
_ with
element,
accounted in the (_,
_¢ are
the
respect
as shown
for by deriving _,
_¢) system,
which
the
to the angle
to _y, _ in Fig.
2.4.
beam
ele-
rotates
with
,
the beam pretwist. The strain components, the material properties, and the cross sectionwarping function are all derived in this coordinate system.
2.3.6
DeJb_wted A t
The
A t
Curl,ilinear
A I
three
rotated
of the
Ap
Euler
angles
to be tangent
2.3.7
Preconed, A
A
A
was
sequences
local
Blade-fixed
in chapter
deformation.
are
deformed
Coordinate
also
elastic
The
A
the (e x, %, e¢) system
0_ about
chosen
A
is identical
_:_, rotated
following
the
possible.
The
i n and
work
of pre,,, ex is
vector
axis.
System
to the
preconed,
pitched,
A
blade-fixed A
the
pitch
angle A
by rotating
the
A
0p is equal
to zero.
A
The
A
canceling
the
A
A
(ib, Jb, ku) system
pitch
system.
Expressing
the blade
system
is convenient
when
similar
results
available
rotation
inherent
response
and
comparing
in the
sys-
(ip, jp, kp) system
about
-
ib by the
pitch
angle A
thereby
3,
A
(ib, Jb, kb) when
is oriented
after
by rotating
of 0_, 0n and
sequence
other
to the
(ip, jp, kp) system A
geometry
is obtained
in the order
but
chosen
blade
detail
A
This
authors[40,76]
The
local
in more
A t
_:_, respectively.
vious
will be discussed
of the (e x, %, e¢) system
through
tern
which
the orientation
orientation
System
A I
(c x, %, e¢) system,
represents
Coordinate
the
literature.
28
in the blade results,
definition
root for
loads these
of the
Op, A
A
(i b, Jb, kb)
in this coordinate quantities,
with
2.4
COORDINATE
The
coordinate
transformations
described
in the
equations
of motion,
2.4. I The the
Rotating
previous
between
section,
are defined
to Nonrotating
transformation
nonrotating,
TRANSFORMATIONS
are
various
needed
for the
coordinate
systems
fl_rmulation
of the
in this section.
Transformation
between
hub-fixed
which
the
the
rotating,
coordinate
system
A
hub-fixed
coordinate
is defined
as:
system
and
A
(2.1)
and
the
transformation
matrix
[Tm
where,
_, is the
blade
azimuth,
] =
[ Tf. ]
[
-
is given
sin 0
_ = f_t.
29
by
cos _, 0
o] 1
(2.2)
2.4.2
Blade-fixed
The
to Hub-fixed
transfi)rmation
system
and the
Transformation
between
rotating,
the
hub-fixed
preconed,
pitched,
coordinate
system
A
blade-fixed is defined
coordinate as:
A
(2.3)
kb and
the
transformation
[ Tbr ]
matrix
pitch
_p is the control
0
cos 0p
blade
setting,
-sin0p
precone
cyclic
0 o is the
sine
2.4.3 The and the
pitch,
Element
=
collective
0
I
0
cOS0p
-sin#p
0
cOSpp
and
0p is the
blade
pitch
angle
(2.4)
due
to
by:
00 +
01c
pitch,
cos0
0_c and
+
0is
0_s are
sin0
the
(2.5)
cyclic
cosine
pitch
and
respectively.
to Blade
transformation preconed,
by
sin 0p
angle,
expressed
0p
in which
is given
I o o?[os, o,,1
=
0
where,
[ Tbr ]
Transformation between
pitched,
the
blade-fixed
undeformed
element
coordinate
A
system
is defined
system as:
A
f'l f't _y
coordinate
= I" T eb "]
^Jb
A
A
ez
kb
30
(2.6)
For
the straight
portion
of the blade
[Tcb]
For the swept-tip
=
0I 0
(2.7a)
1 0 00] 0 !
element
[co, As ,hAs 0][cosAa 0,'nAa]
[ Teb ] =
sin A s 0
cos A s 0
0 !
0 sin A a
-
I 0
0 cos A a
(2.7b) =
where, thc
blade
2.4.4
blade
tip anhedral
Undeformed
The and
A s is the
I
transformation
the undeformed
sin A s cos A a cosA s cosA a - sin A a
tip sweep angle,
cos A s -sinA s 0
angle,
positive
Curvilinear
positive
element
the
and
the
transformation
[Tce
A,
is
coordinate
system
as:
A
= [ Tce ]
ey A
e_
ez
] =
and
Transformation
is defined
A
matrix
sweep,
curvilinear
system
A
en
Element
undeformed
coordinate
,
for backward
1
upward.
to Undeformed
between
sin A s sin A a cos A s sinA aq cos A a
[ T,_ ]
0 1 0
is given
cos # 0 -sinfl
31
(2.8)
by
sin fl 0 ] cos ,8
(2.9)
where, fl axis.
is the
blade
Differentiating
local
pretwist
Eq. (2.8)
angle
with
which
respect
varies
along
the
blade
elastic
to x gives
A
{-ti °t ^
eq,
(2.10)
TOe(
x
=
^
^
_
e_ ,x
Toe q
where
_o =
2.4.5 The and the
Deformed
to Undeformed
transformation undeformed
P,x
(2.11)
Curvilinear
between curvilinear
the
Transformation
deformed
coordinate
system
Ap
[T_]
tra'nsformation
matrix
is defined
system
as:
= [ Tdc ]
[ T_
]
is given
(2.12)
e_
by
=
s [1
coordinate
A
e_
and the
curvilinear
cos00x O0 -sinO,
sin0 1Fc°0 x
007
0
-s
1
cosOxJLSino, I o
-
_OPII[
cosO,lJ
cos0_
sin0_
sin 0_
cos 0_
o
o
(2.13) !]
A
where,
0_,
0.,
and
0x
are
Euler
angles
respectively.
32
about
_,
rotated
%, and
A
rotated
ex,
2.4.6
Deformed
The and
Curvilinear
transformation
the
to Undeformed
between
undeformcd
clement
the
Element
deformed
coordinate
,
where
the transformation
e_
transformation
is defined
= [ Tde ]
e_
ez
is discussed
system
as:
[ Tde ]
(2.14)
ey A
matrix
coordinate
A
Ap
[Tde]
This
curvilinear
system
At
Transformation
is given
by
(2.15)
=[Tdc][Tce2
in greater
detail
in Chapter
4 and
Appendix
m.
2.4.7
Preconed,
The and
transformation
the
section
Blade-fixed
preconed, 2.3.7,
to Preconed,
between pitched,
is defined
the
Pitched,
preconed,
blade-fixed
Blade-fixed blade-fixed
coordinate
system,
Transformation coordinate
system
described
in Sub-
as:
A
jAp
A
= [ TP b ]
(2.16)
^Jb kb
where
the
transformation
matrix
[Tpb]
=
[ Tpb ]
0 I 0
is given
cOS0p 0 sin
33
0p
by
(2.17)
-sin0p 0 cos
1 0p
Chapter STRUCTURAL
The
derivation
model such
MODELING
of
is presented
nonlinear
rods
(Ref.
shear
97 and
Ref.
(Ref.
curvilinear
coordinate for.
cartesian
coordinate
listed
The
warping,
of elasticity
stress-strain
are
of curved in curvilinear derived
in a
are
properly
ac-
transformed
relations
are
included.
first
of pretwist then
beam,
arc
mechanics
components
are
blade
for a composite
on the
effects
rotor
to
assumed
a
local
to be de-
system. in the
derivation
of the
structural
oper-
below:
deformations
2.
The
strain
components
and
shear
strain
components
ever,
the
relative
magnitude
due
order
of the cross
with
warping
section
are small
to material
not be neglected Higher
the
used
The
3.
strain
coordinate
assumptions
features
the theory
BLADE
composite
out-of-plane
components The
ROTOR
the
is based
so that
1.
assumed
and
8), and
4).
strain
cartesian
kinematical
are
100, Chap.
system.
in this local
The ator
These
for
Important
of deformation
system
COMPOSITE
operator
deformations
98, Chap.
counted
fined
structural
kinematics
coordinates
OF THE
in this chapter.
as transverse
The
the
!I I
to unity
neglected
with
between anisotropy,
terms
to axial are
plane
compared
are
respect
in its own
the e.g.,
strains
neglected.
34
axial
are neglected.
such
respect and
squares under
that
axial
to unity.
How-
strains
is not
shear of shear this
both
strains
assumption[7].
can-
The derivation of the strain componentsbasedon theseassumptionsis valid fi_r small strains and large deflections. However, quantities such as displacement components( u, v, w) and elastictwist angle (_b)do not appear explicitly in the resulting expressionsof the strain components. Subsequently,explicit expressionsfor the strain-displacementrelationship are obtained by considering the deformation procedureduring the finite rotation from the undeformed to the deformed configuration and using an ordering schemeto systematically identify and neglect higher order nonlinear terms which are generatedduring the derivation[40,76]. Thus, the final strain-displacement relations are valid for small strains and moderatedeflections.
3.1
KINEMATICS The
the
hub
position center
OF
vector
DEFORMATION
of a point
P on the undeformed
A
e I is the blade
in-board
node
interpretation
of the
=
root
offset
the
represent
the
undeformed
respect
to
vector
from
2.2-2.4.
vector
both
tip portion.
35
_Ten +
center,
is facilitated
Figs.
swept
A
xe x +
the hub
element
position on the
A
h ei b +
from
combinationof
as well as a point
+
finite
of this position by
A
e lir
beam
described
tion
with
is:
_x, 17,_)
where
beam
the
and blade
(3.1)
r_
he is the root.
The
by considering Equation for a point For
(3.1)
of the
physical
the geometry can
on the
a point
offset
be used straight
on the
swept
to
portip
clement, heequals the length of the straight portion sponding
undcformed
based
vectors
at point
r,x =
A
Cx-
The
blade.
corre-
P are
A
gx =
of the
A
_"T0e)1 + r/T0e _
(3.2a)
A
g,1 =
r, rt = e)t
g(
r_
(3.2b)
A
=
=
e_
(3.2c)
A
where
the
derivatives
initial
twist,
ro,
of the
of the
orthonormal
undeformed
triad
beam
A
=
0
^e_,x
elastic
axis,
a unit
vector
evident
from
be obtained and
the
0
from
initial
Eq.
twist
-
0
r0
er/
TO
0
_
(2.10).
Note
TO is nonzero,
that
then
(3.3)
if point
the base
P is not vector
Since position
the
orthogonal
to the
cross-sectional
plane
on the
gx is neither
A
nor
to the
A
%,x
can
related
by:
A
which
A
( e x, e,), e_ ) are
A
of %
and
e_,
as is
Eq. (3.2a). in-plane
vector
of the
deformations point
of the
beam
P in the deformed
cross-section configuration
are neglected, can
be written
A B
R(x,r/,()
=
Ro(x)
+
r/Erl
+
_Etj
+
0c(x)W(r/,_)e
x
the as:
(3.4)
whcre
R0(x ) = R(x, 0, 0)
36
(3.5)
is the correspondingposition vector of a point on the deformed elastic axis; and Ei(x) = R,i(x,0, 0), are
the
first
base
three
the
last
known the
vectors
terms term
of a point
represent
is the
amplitude
out-of-plane
to the The
A I
q'(q,
definitions
orthonormal A
e¢ ).
the
direction
the
orientations
triad
of
be viewed of
E,, the
Eqs.
In Eq.
(3.4),
of the cross-section, cross-section;
out-of-plane
the
while
c_(x) is the
un-
function
of
warping
_l-', _. (0, 0) = 0
(3.5)
and
deformed
Without
(3.7)
(3.6),
respectively.
curvilinear
coordinate
of %
of
and
rotated
curvilinear
loss of generality,
system,
the
unit
to the deformed
of the
coordinate
system,
P_t
vector elastic
version
e X is assumed axis
of the
to be in
beam;
while
A t,
and
e r are
strains[100].
in terms
translated
undeformed
of E X, i.e., tangent
of the
expressed
as a rigidly the
I', t
p.356]
_, tt (0, 0) =
of R 0 and
triad
A
( e x, %,
count
of the
axis.
Af
( e X, e¢, e_ ), can
A
(3.6)
elastic
rotations
r) is the
£
with
orthonormal
A I
and
warping
• (0, 0) =
due
the deformed
translations
of warping;
cross-section,
on
i = x, r/,
The /_'t
Ap
e x,%
nearly
that
deformed and
A I
e_
of E_ and
E_
vectors
of the
base
by
the
following
but
differ
elastic
definition
on
ac-
axis
are
[Ref.
I00,
:
Ex =
A
--
A
t
(1 + _xx) ex
t
(3.8a)
Ap
E_t =
2 _xn ex + (I + _rtn)eq
E_ =
2_x_e
At
A#
x + _(e
37
A
+
t
_n_ e_
_
A
n + (! + _,_()e(
(3.8b)
t
(3.8c)
With the assumption that are
neglected,
in-plane
base
vectors
of the deformed
_£_ =
it will
transverse ply
shear
that
cross
( e.g.,
_-_
( e.g.,
E_-E_
E,7 =
2_x_
E¢ =
2gge
be shown
latter
strains, sections
plane
beam
cross-section
plane
is not
The
deformed
base
Gx =
R x =
Ex +
17E_, x +
_
A t
(1 + gr,x)ex
(3.10a)
e_ =
yxnex
A t
At
--
e¢ =
y_e
x +
At
_xx,
Y_
at the
normal
to E x ) due
vectors
A s
and elastic
to the
(3.lOb)
%
At
x +
(3. l 0c)
e¢
yg
are
axis.
the
axial
Equations
and
the
(3.10)
im-
axis before
deformation
axis after
deformation
to the elastic
at point
presence
of transverse
shear
P are:
A
djE¢, x +
As
+
to the elastic
be normal
normal
(3.9)
become:
At
are
strains.
axis
0
ex +
that
) will no longer
=
A t
respectively, which
_£
elastic
Ex =
where
of the
Le.,
_n_ =
the
deformations
ct,x_e
t
x +
A t
0t_,x As
= [(I + _,=)+ _(2g_, x - K,_)+ ((2g_, x - x¢)+ e,x't'] ex (3.1 la)
+ [2_%_
+ _(2%g_
+ [_(2K¢_ + T) + 2(K_ A
G,_ =
R,_
=
En +
_tW,,le
r) + e_K,t] ^' + _1'_:_] _
t
x (3.1 lb)
A t
=
(2gxn + _tW n) e x +
A t
e.
38
A
G_ =
R,_
=
E_ +
I
cz_'_e× (3.1 lc)
= (2_x_ + c_,
_)e x +
A !
where
the
derivatives
curvatures,
of the
K_ , K_, and
orthonormal
twist,
r,
triad
(ex,
of the deformed
Ap
A t
%,
e¢ ) are related
beam
A_.
to the
by:
At
Kff
A,
--
O
Ap
- K(
Kr
A
t
(3.12)
3.2
STRAIN The
set
vector the
nor
beam
tation
since
the
base
orthogonal with
(x, r/, _') arc, vector
to the
nonzero
initial
(x_, x 2, x3) will be used
3.2.1
Strain
The fined
COMPONENTS
of coordinates
coordinates
Components
components
by (Ref.
Combining
0
Eqs.
Ref.
gx,
base
expressed
vectors
twist
non-orthogonal in Eq.
g_ and g¢ for
z 0 . In the
in place
derivation
of (x, t/, _') whenever
in Curvilinear
of the strain
97 and
in general,
is neither
an arbitrary that
follows,
a unit point
on
the
no-
convenient.
Coordinates
tensor
in the curvilinear
coordinates
are de-
98, p. 113):
! fij = "_-( Gi" Gj ) -
(gi-
(3.2)
Eq. (3.13)gives:
and
(3.2a)
curvilinear
(3.11)
with
39
gj ),
i,j = x,r/,_
(3.13)
(3.14a)
+T
I (_i2+ {2)(2_
_2)
%)]
(3.14b)
+ _-[_',¢: + n(_- %)]
(3.14c)
f_ = f_x = _,_ + _-[_',_-{(r-
f_ = rex = _
(3.14d)
f_-----0
f¢¢ _ 0
(3.14e)
fu¢ = f{n _ 0
(3.140
In the derivation neglected relative
with
vectors
Components
parallel
no assumption
of local cartesian
relations
coordinate
coordinates
system.
(xl, x2,x3)
(Y_, Y2, Y3), consider
40
components
was made order
presented
triad
regarding terms
the
contain-
in this section.
(Yl, Y2, Y3) at point
P with its
(_x, _,_,_¢) of the cross
section,
of the beam
are assumed
To find the transformation and
were
Coordinates
coordinates
to the orthonormal
strain
Higher
in the derivation
in Local Cartesian
The stress-strain
in the local cartesian curvilinear
but
axial and shear
of axial and shear strains[7].
a system
respectively.
the
to unity,
were also neglected
Strain
Define unit
respect
magnitude
ing warping
3.2.2
of Eqs. (3.14), both
the
local
cartesian
to be given between coordinates
^
_r
_r
Oxi
Oyj
Ox i Oyj
(3.15)
ej --
^
Oxi
gk" ei =
(3.16)
( gk" gi ) cyj
Thcrefore,
the
transformation
relation,
, can
be expressed
in matrix
form
as:
Oxi ]
OY i
=
[ gk" gi
=
[l
[ gk"
]-l
_'r 0
l+(2T
-'-o
=
I
^ej ]
2
oll
--r/t_rO 2
0!
-_'rO 1
-,7¢¢o _ 1+,Ag . o
(3.17)
o
1
_o o,o
1 -- q_O
0
0 1
where
[ gk" gi ] =
- _z 0 1 1 + (,12+ _2)_o2 _ _o r/ZO
The from
strain (Ref.
tensor
97 and
defined Ref.
in the
local
98, p. 118):
41
cartesian
0
0 '7_o1
(3.18)
1
coordinates,
e,j,
is obtained
( tIR _ O.vi #R Oy i
zii =
3
3
='zx( '" 2
k=l
3 =
Substituting components ponents
30x
Z
Z
k=l
I=1
Eq. (3.17) in the in the
.... Ox k
I=1
k
Oyj
Eq.
_ 0Xk
°Xl
Ox 1
Ox k
Ox I
)
Oy i
-Oy i
(3.19)
fkl
the
transformation
coordinate
coordinate
system,
system,
f,j , can
between
e,j , and be written
2r/r0fx_
the
strain
the strain
com-
as:
e_x
=
f_x +
2_r0f_
e_l
=
%x
=
fxn
(3.20b)
e,Tx =
fx_
(3.20c)
ex_ =
-
Or
(3.19),
local cartesian
curvilinear
r)r
Ox 1
Oy i
into
OR
(3.20a)
erln _ 0
(3.20d)
e¢¢ m 0
(3.20e)
Combining cartesian
Exx
=
Eqs.
(3.14)
coordinates
_xx -
r/K,1 -
with
Eqs.
(3.20),
the
strain
components
in the
local
become:
C.x( +
_,x •
+
_ro((_,n-
r/_,_)
I
+ T (n2 + _2)(T-- Z0)2 + rl(Yx_,x-- rOYn_ + (2x)(hy + v)- (f_x 2 + f22)fn_+ w)- nyVbx + f_xVby+ Vb_ + [(_'_
f2zVby
q- _22) (hx
-- _yVbz
+ x)-
-- _/bx]
(_'_x_'_y -
_:2z)hy
-
W,x } -- (q2 + _2)(_
(_"_x_'_z + _a_y)h z +
+ _x)
+ (f_2 _ f_z) [(r/2 - _2) sin fl cos fl + r/( ( cos2fl - sin2fl)] - _-Qz
[(r/2-
{(f_2 _ f_)
¢.2)( cos2fl _ sin2fl)_
4q( sin fl cos fl] -
[(1/2 _ (2)( cos2fl _ sin2fl) _ 4r/( sin/? cos fl] -
4f_yf_z[(r/2 _ (2) sin fl cos fl + r/C"( cos2fl - sin2_)]}
87
4'
Z_
_'{(r/sinfl+ ( cos fl)[- nxf'/z- ny + (;¢,x-2nz4, + (-Qx-Qy-
nz)_
- (f2_+ _2)w x] + (,/cosfl- ( sin fl)[ - _xt)y + _z + V,x
-
2f2y_
- (f_x_qz + _')y)q, -
(f2_ + f12) V,x] (4.51g)
- i_- _i - n_;._- _< + 2flz;, - 2_y_V +(f_
Z_ 1
+flz)(hx+X+U+_Ot+r/?x,
-- (nxf_y-
Oz)(hy
+ v) -
+ _'2zVby
-- f_yVbz
-- _rbx
7+_¢)
([2x[l z + Oy)(h
}
,1{(q sin p + _ cos p)[ - flxf_ z -
-
(f_
+ f_z) _ ,x] + (r/cos
-
2ny4
-
ii - Wii - r/_xn - _.K
- (flxnz
+ fly)'/'
z + w)
fl -
-
hy +/i,',x-
2f_z4, + (f_x_y
( sin fl) [ - f_xfly
(hi
+ 2f2z9
+ flz:) V,x]
-
(4.51h)
2.Qy,.'v
+ (n_ + nz:)(h x + x + u + V_ + rtTx. + ¢_,Z) -- (f_x_y
-- _z)(hy
+ v) -
+ f_zVby
-
-
_yVbz
Vbx
(f_x.Qz
+ l'_z + V,x
+ _y)(h
}
88
z + w)
z¢ = 4"{(17sin fl + _ cos b')[ - f_z
- _,, + 'a',x - 2f_z_ + (_xf_y
") , ,x] + (_ cos fi - (fl_ + _)_)_ _"sin ,6')[ - f_,_f_y+ fl, + _,x
(4.51i) + (_
+ _1;)(h x + x + u + q'_ + rlYxn + _'_ fi+Dy(h z+w)-f_z(hy+ v)+ Vbx ] W+_"Ix(hy+V)-i')y(h x+x+u)+ VbzJ
121
(5.14)
The
velocity
vector
of air due
to forward
flight
anti
A
inflow,
A
V a, is:
A
V A = _2R(pcoS0ir-pSin_jr-2k
r)
(5.i5) A^ Vx ex +
=
A^ Vy ey
A^ V z ez
+
where
p cos
_V/).x_
=
_)RETcb]
[Tbr]
-psin
lv )
-a (5.16) p COS @ -- tip), COS _b sin f
_R[Tcb]
In Eqs.
(5.14)
-
and
(5.16),
(Vbx, Vby, Voz ) and
[T_b]
respectively, (4.27)
and
The (5.12),
for
the
(2.7b),
velocity (5.13)
the explicit can
portion
respectively,
and
(5.15)
of the
for the U,'
and
U_')
coordinate
transformation system
A !
(4.33),
blade,
swept-tip U;'
can
(4.38), and
(h_, hy, hz) ,
(4.26)
in Eqs.
and
(4.34),
(2.7a), (4.39),
element. be obtained
by combining
Eqs.
as:
U_/_,
the
Op -
for (_x, _y, flz),
in Eqs.
fV EA
Ux'
where
4, cos
sin
expressions
be found
straight
component
Op -/.t
2 sin 0p} cos _, cos Op + p sin ¢, sin Op - _. COS 0p
pflp pflp
matrix, Ap
E dol
tvz
[Ta_]
, between
(5.17)
}
Vz
the
deformed
curvilinear
Ap
(e,, %, e_) and
the
undeformed
122
element
coordinate
system
(_x.Cy,_)'_"
, has
[Td_ ] is givcn Thc (5.17)
bccn
defined
(2.15)
and
the
second
order
expression
for
by Eq. (4.40).
accclcration with
in Eq.
component
respect
U¢'
can
be
obtained
by
differentiating
Eq.
to time:
{'VxEA _
"A
o¢')
Vya {Vy vx } EA
+
(5.18)
tVz - Vz _
I.-v_l:_a Vz j
whcrc
f
iJ + _yW
-- _z _"+ _y (h z + w) -
_z (hy + v) + _/bx
"_
= ,}_,+c,,u -C_x,V' + az(hx + _ + u)- ax(hz + w)+ %y_, (5.19)
v_AO
Lx_,' + _x _' -- f2yU + _x(hy
+ v) -
-
(rA_,
=
QR[Teb
]
_y(h
x + x + u) + '_/bz J
f_# sin
{f_l_ (fit, sin ff sin 0p - cos ff cos 0o) - 0t_ (btflp cos _, cos 0p - _ sin ff sin 0p + _. cos 0p)}
(5.20)
{f_# (tip sin ff cos 0p + cos _, sin 0o) + 0o (#tip cos _, sin 0p + _ sin ff cos 0p + R sin 0p)}
The
matrix
and
(_,
(5.19)
[Td_ ] is given
_y, f_) and
spectively,
(5.20) with
are are respect
in Eq. (4.43);
given
in Eqs.
obtained
by
(4.52)
while and
differentiating
to time.
123
the
expressions
(4.53),
of (_/b_, Vby, Vbz)
respectively.
Eqs.
(5.14)
Equations and
(5.16),
re-
5.3
BLADE
The
wherc
blade
PITCH pitch
0c3 is the
For the straight
ANGLE
angle
total
with
geomctric
portion
WITH
RESPECT
TO FREE
respect
to the
0 =
0G +
4'
angle.
The
O =
/_G +
_
(5.22)
0 =
0G +
_
(5.23)
pitch
free stream
STREAM
is:
(5.21)
time
derivatives
of 0 are:
of the blade
(5.24)
0G = 0p(¢,) + fl(x)
For the swept-tip
is the
tion of the blade tip with
respect
0p
(5.25)
0G =
0p
(5.26)
element
0G =
where/_j
0G =
[Op(_b) + flj] cos A s cos A a +
(5.27)
_T(X)
0G =
0p cos A s cos A a
(5.28)
0G =
0p cos A s cos A a
(5.29)
blade
pretwist
angle
and
the swept
tip,
at the and
junction
between
PT (X) is the pretwist
to the junction.
124
the angle
straight
por-
of the swept
5.4 AERODYNAMIC
FORCES
UNDEFORMED
ELEMENT
The
components
AND
MOMENTS
IN THE
COORDINATE
of the aerodynamic
forces
SYSTEM
and
moments
deformed
dynamic
where
lift and
the
in terms
curvilinear
blade
coordinate
pitching
local
of Uo' and
system
moment
unit
(_z'×,%, e¢) are relatcd
per unit span
span
by (see
Fig.
to the aero-
5.2):
P_t' =
L sin czA -
D cos _A
(5.30)
p_'
LcOS_A
+
Dsincz
(5.31)
qx'
M
angle
=
=
of attack,
U¢' (see
A
(5.32)
_A, and
its sine and
cosine
can
be written
Fig. 5.1) as:
O_A=
_tan-'(U_',
']
(5.33)
\u. j U¢' sin _A
-
--
=
The
aerodynamic
ment
coordinate
(5.32);
and can
forces system be written
and
U¢'
--
(5.34)
UR
COS (xA
in
'_1
At
the
per
N/Ur/,2
U_/'
Ur/
-
UR
\//Ur/2
moments
per
(ex, ey, _z_) are
+ U¢ '2
unit
obtained
as:
125
(5.35)
+ U(_'2
span
in thc
from
Eqs.
undeformcd (5.30),
(5.31)
eleand
{px} Py
(5.36)
Pz
(5.37)
5.5
TREATMENT Reverse
terized
by
flow the
existence
_k < 360°),
section
is from
reverse
flow
flow
known
a-priori.
the
the
to zero.
reverse
FLOW
It should region
flow
the
trailing the
to forward
be noted
air
to the
tangential
A commonly
flow
relative edge
requires
region
due
of a reverse
where
region,
reverse
REVERSE
is a phenomenon
180°
0 (7.12)
Gi =
The
approximate
optimization feasible
7.3
problem
package
directions.
vided
f 1 D0i] Di
lag
1-50-
flap
o.oo O.
I
-0.50
!
I
|
I
I
I
I
6-
torsion 4-
2-
0
.ooo
Figure
8.5:
I
_o
I
._oo
I
l
I
._ .2o0 .25o rrrcx _..c _)
Effect of axial mode on the of isotropic blade. Analysis
258
I
.350
.400
imaginary part of hover with substitution.
eigenvalues
0.20---. exial oxlol mode used not used I
0.10-
x
O_X]
0
Z 0
z_z-_0.10_ VI
....°**o
°°"
•°•*.***
j
O |
...
i-********_
flap
i
I
I
I
|
I
I
I
I
E
0.00 -0.10-0.20-0.10-
torsion ..............
-0.40
,
.ooo
Figure
8.6:
Effect tropic
_o
,
.loo
J
,
. ........
.1so ._o aso rrr_ _=.E (_)
of axial mode on the blade. Analysis with
259
.T_,...°.*.•*****
i
,
_
real part of hover substitution.
,
i
__o
.Loo
eigenvalues
of iso-
Figure
8.7:
Single-cell
composite
rectangular
260
box beam
0.050 -
0.000
eeOo. aa*°ee°°*ol.
_ -0.050
._
_
•
ill...........
•
ver. ply
r_
ver_ ply ....
-0.100.
g
ver. ply == -30
................
deg
•
Fulton & Hodges
•
Hong k
•
E
-0.150 .000
Figure
8.8:
, .020
Chpre ,
a . , • w . .040 .080 THRUST COEFF./SOHDITY
,
.
i , •080
Real part of hover eigenvalues for single-cell a function of (thrust coefficient/solidity).
261
.
.
, .1 O0
composite
blade
as
ISOTROPIC
0.300•_'0.250
-0.10Z
>< . ,.z,-o.2o-
0
10
20
30
40
SWEEPAN(3LE (DE(3)
Figure
9.8:
Effect of tip sweep on the real part of hover tropic blade, baseline configuration.
287
eigenvalues
of iso-
TORSIONAL FREQUENCY=3.263/REV
V
_-,,. ...................
0
'
0
2FI.2LI... 3FI
_ ....................
I
10
'
]K....................
I
'
20
X ....................
I
30
'
X
I
40
SWEEP ANGLE(DEG)
Figure
9.9:
Effect of tip sweep on the imaginary of isotropic blade, modified torsional
288
part of hover eigenvalues frequency.
TORSIONAL FREQUENCY=3.263/REV
0.10L_
unstable _.
0.00
........................... ..............
z_ -0.10-
_.
.
_::_ -0.20 -
/ 0
z
0
,3
-0.30
ta,.I
"
0
-0.40-
I-e_
o.. -0.50-
p
p
r
-..,J
-0.70
'
0
I
10
'
I
20
'
I
30
'
I
40
SWEEPANGLE(DE(;)
Figure
9.10:
Effect tropic
of tip sweep on the real blade, modified torsional
289
part of hover frequency.
eigenvalues
of iso-
I....1Ll-1_i*2Fi_2 _1-1 TB÷3F i _
y
v
v
_6I..==1 __1 ,¢=E >-5Z I.=.i t_9
Illil_liiNiiliililjillll_lll$
m
w 4 • I.=_ 0 I.-tx: 3 .
rt_ 4=:2" Z
0
-20
'
I
-10
'
I
'
0
I
10
'
I
20
ANHEDR/_/. ANGLE(DEG)
Figure
9.1 l:
Effect of tip anhedral on the imaginary part of hover lues of isotropic blade, baseline configuration.
290
eigenva-
I....1,1-1_1-_1 -_-' _l--__t÷_FI 0.10-
unstable _,
0.00
Z 0 Z
Pm.eeoo*oeoe'D°'°*m°*_°JeJ°°*e°_fDm.n
_
: ......................................
.
-':_:'.-.l:
.........................
...........
**
":'"" .....
_
mJeoaoe,eo_oleee.o,6
staDle )c
U') I.,=J
:_ -0.10 ....._1 ,,,¢E Z LIJ
'" -0.20 I.t,. 0
k ...a -0.30
-0.411 -20
!
-10
'
I
'
0
I
'
10
I
20
ANHEDRAL ANGLE(DEG)
Figure
9.12:
Effect of tip anhedral on the real part of hover isotropic blade, baseline configuration.
291
eigenvalues
of
TORSIONALFREQUENCY=4.340/REV
_
0
_-
0
,C,
_"7. w n,,-
i....1.1-1FI-2 I-.,TI'"2LI÷ FI
0,)6" I,.iJ :=J ,.,,.,J
>,.5" Z LIJ
• .....
•
a_m°°le_°°X °°oo°o,,°°°°°°,_.°o
....
°°°°
....
oo°oo_(o°°
°o.°
o.o°o,,°
°°°°°°X
°°°°°°°°*°
w 4• t,a0 I--
,,v 3 . 13_ >,--
r,,,' 2. Z m
:el m
0
'
-20
I
-10
'
I
'
'"1
0
10
'
I
20
ANHI:'DRALANGLE(DEG)
Figure
9.13:
Effect of tip anhedral on the imaginary part of hover eigenvalues of isotropic blade, modified torsional frequency.
292
TORSIONAL FREQUENCY=4.340/REV
0.10-
A
_,
unstable
0.00
.,..........),,z I.z,J
"" 1.0450-
0
z,,
1.0400-
4S
o..
._ 1.03511z
-45
-- 1.03011-
1.0250-
1.0200
-.3340
Figure
9.24:
,
,
-.3300
,
I
,
,
,
I
-.3260 -3220 -3180 REALPART(DAMPING)
,
I
-.3140
,
,
-.31 O0
Root locus of first flap mode eigenvalues as a function of ply angle in vertical wall for two-cell composite blade in hover.
303
3.3703.3603.350Z
30
3.340-
wo3.330N 3.320-
90
20
_ 3.31o¢J
< 3.3003.290-
0
3.2803.270 -.2250
Figure
9.25:
, -.2200
, , -.2150 -.2100 REALPART(DAMPING)
, -.2050
Root locus of first torsion mode eigenvalues as a function of ply angle in vertical wall for two-cell composite blade in hover.
304
I""
As =0 deg. I---
As =20 deg. I
0.770-
0.760-
0
0
_'0.750-15
I.m.t I.m.#
=07_V
"
0.730-
< 0.720(1)
90
0.710-
0.700 -.0300
,
,
-.0250
-.0200
--
90
, -.0150
, -.0100
, -.0050
.0000
REAL PART (DAUPm)
Figure
9.26:
Root angle
locus of first in horizontal
lag mode eigenvalues as a function wall for two-cell composite blade
3O5
of ply in hover.
J--- As=0deg. J--.- As=20deg.J 1.15020 20
tll
1.100k
A
>-
-
z I..=J
,..., 1.050-
_0 •
0
I.i-
"I,
I,'--" n.," O.
,',- 1.000-
"_"_-20
z
0
0.950-
0.900
-.3_o
-20
,
l
-.32o
,
,
,
-.31o
,
-._
,
,
-.29o
REALPART (DAMPING)
Figure
9.27:
Root locus of first flap mode eigenvalues as a function of ply angle in horizontal wall for two-cell composite blade in hover.
306
I'"
As =0 deg.l-.-.
As =20 deg. I
3.803.70-30
r_
.._..3.60-
-30 T-t
z L,mJ
3.50-
s'-
-15
45;........
_
....... -....
n.,.
'- 3.40-
o
_.i
""'-.....15
....
.
..10 J
0
< 3.30z
'' 90 _E
-- 3.203.10-
e-.
3.00
I
I
I
I
I
I
-.25o -.2oo -.15o -.loo -.o5o .ooo .oso RE_pART (OAMF'iNO)
Figure
9.28:
Root locus of first torsion mode eigenvalues as a function of ply angle in horizontal wall for two-cell composite blade in hover.
307
I'"
As =0 deg.l.°-
As =20 deg. J
3.40-
3.30-
...... 0
Z I.tJ 0 I,i.I
lS 90
''3.10ILL
"'".......,,-.1..5
IleQm
Ill |
::..:"
-
D_
_ 3.00Z
-10
___2.90-
90 -30
2.80-
2.70 -350
Figure
9.29:
, -.500
, -.450
, , , , -.400 -350 -300 -.250 REALPART(DAMPING)
, -.200
, -.150
Root locus of second flap mode eigenvalues as a function of ply angle in horizontal wall for two-cell composite blade in hover.
308
TWO-CELL COMPOSITE BLADE TIP RESPONSE, LAG MODE (MU=0.3) 0.00
o_-0.50-
z_ - 1.000
z
z
D ¢1.
-2.00
I
0
Figure
10.1"
60
Effect mode
'
'
I
120
of horizontal (/_ = 0.30).
'
'
I
'
'
I
'
180 240 AZIMUTH (DEG)
wall
ply angle
309
'
I
i
.300
.360
on blade
tip response;
lag
TWO-CELL COMPOSITE BLADE TIP RESPONSE, FLAP MODE (MU=0.3)
o_65-
-_..-..- .......
!" ::E
za3 0 Z
J b°n !
%.J
Z
--o2(.1 Ld
hor. ply 15 deg
'"1
hor. ply -15 deg I
13I--
0
'
0
Figure
10.2:
I
60
Effect mode
'
'
!
120
of horizontal Cu = 0.30).
'
'
I
'
'
I
'
180 240 AZIMUTH (DEG)
wall
ply angle
310
'
I
'
300
on blade
'
I
360
tip response;
flap
TWO-CELL TIP RESPONSE,
COMPOSITE BLADE TORSION MODE (MU=0.3)
°_' 2hor. ply 15 deg i
hot. ply -15
deg
,°a J°eleleelole
J!
.J
baseline
oo oQ o*
to%el'*lela**le.o.o
n***
"aeiI_.eeela
eaooeooe*Q°
_oOOe°
o Z 0 i I.-(J Lid .--I
I_-2
_
_'_D
_
'_',_
a Q.
In
-3
•
0
Figure
10.3:
I
60
Effect mode
'
'
I
120
of horizontal (# = 0.30).
'
'
I
'
'
I
'
'
180 240 AZIMUTH (DEG)
wall
ply angle
311
on blade
I
'
300
'
I
360
tip response;
torsion
TWO-CELL COMPOSITE BLADE TIP RESPONSE, LAG MODE (MU=0.3)
ver. ply 15 deg
I
ver. ply - 15 deg I
60
Figure
10.4:
120
Effect of vertical (/_ = 0.30).
180 240 AZIMUTH (DEG)
300
wall
tip response;
ply angle
312
on blade
360
lag mode
TWO-CELL COMPOSITE BLADE TIP RESPONSE, FLAP MODE (MU=0.3)
65.
7°3. 0 Z Z
o2. I-t.I Ld .J
vet. ply 15 deg
v-'_,_ -_g
I
O.
0
I
0
so
I
120
I
180
I
24o
I
300
'
'
I
3so
AZIMUTH (DEG)
Figure
10.5:
Effect of vertical (U -- 0.30).
wall ply angle
313
on blade
tip response;
flap
mode
TWO-CELL TIP RESPONSE,
COMPOSITE BLADE TORSION MODE (MU=0.3)
1
.L
1
_
boseline
--
ver. ply 15 deg
.... ver. ply -15
deg
0
o
•
I
60
Figure
10.6:
Effect mode
'
'
I
120
of vertical (/a = 0.30).
'
"
I
'
'
I
'
'
I
'
'
I
1BO 240 AZIMUTH(DEG)
300
wall ply angle
tip response;
314
on blade
360
torsion
TWO-CELL COMPOSITE BLADE TIP RESPONSE, LAG MODE (MU=0.3) 0.00 Im
Qi
bJ
%
z_-0.50-
_'_
0
i
:
•
.
.
_
.
.-".............
.
". %
***
I-- " 10 deg tip sweep
"".... ".
I_
"
.-
.
."
I-'" 20 deg tip sweep
"
.." /
/
,'7
,,
_
,e_
Iml
_
•
P
i
-.":;'Z ...-. _
% "-. % "-. % "*°.
_ - 1.00-
_
baseline "
I *%
.."
/
..
, .......
/
..."
/
-y
N -1.5o-
-t i.J o
D.
P--
-2.00
0
Figure
10.7:
•
I
60
'
'
I
120
Effect of tip sweep (/x =0.30).
'
'
I
'
'
I
'
180 240 AZIMUTH (DEG)
angle
315
on blade
'
I
300
tip response;
'
'
I
360
lag mode
TWO-CELL COMPOSITE BLADE TIP RESPONSE, FLAP MODE (MU=0.3)
0o,5.
Z
o2. t(.P w .J
10 deg tip sweep I._... boseline 20 deg tip sweep
Lb1 e_ O.
0
I
0
Figure
10.8:
'
60
Effect
'
I
'
120
of tip sweep
'
I
180
"
'
AZtMUTH (D(C)
angle
(# =0.30).
316
I
I
240
300
on blade
tip response;
'
'
I
360
flap
mode
TWO-CELL TIP RESPONSE,
_
? =.1
COMPOSITE BLADE TORSION MODE (MU=0.3)
boseline
--- 10 deg tip sweep .... 20 deg tip sweep
0
o v--
1 S S
."
"....
%
.-
Ililli11111111111tii111t11111
_
i
_
%
e-. illllilttiilltiilitlllltlilllilllltllitl
el
-3 0
Figure
10.9:
I
I
60
120
Effect
of tip sweep
I
'
"
I
'
1BO 240 AZIMUTH (DEG)
angle
(V= 0.30).
317
on blade
'
I
300
tip response;
'
'
I
360
torsion
mode
TWO-CELL COMPOSITE BLADE TIP RESPONSE, LAG MODE (MU=0.3) 0.00 • %
_% ,_ -0.50-
_,
- \',
i
;
I I_
, ,. DOSellne
i--"
I0
I.....
S _" '"
deg tip anhedral
/
10 deg tip onhedrol
I'
_",
,_/_.. .................
F'
_ -1.00-
p--
"" "
S
"'"'-.
%
-"
.."7
i=.eo
ojao
I°
_
.
_ -1.50% a
# %
-2.00 0
s
I
I
I
60
120
180
I
240
I
'
300
'
I
360
AZIMUTH (DE(;)
Figure
10.10:
Effect of tip anhedral (/x =0.30).
angle
318
on blade
tip response;
lag mode
TWO-CELL COMPOSITE BLADE TIP RESPONSE, FLAP MODE (MU=0.3)
,6-
............. i-.........
o=
Z
i_bos,,,n,
_02w _J
10 deg tip onhedrol
w 1
-10
o.
o
'
0
Figure
....... '_
10.11"
I
60
'
'
I
120
I
'
'
I
180 240 AZIMUTH (DEG)
Effect of tip anhedral (/_ =0.30).
angle
319
on blade
deg tip onhedrol
'
'
I
'
300
tip response;
'
I
360
flap
mode
TWO-CELL TIP RESPONSE,
COMPOSITE BLADE TORSION MODE (MU:O.3)
---- baseline - - 10 deg tip anhedral .....
10 deg tip anhedral
o o i-r_ Ld
b-2 a (1. i--
-3
I
0
Figure
10.12:
60
Effect mode
'
'
I
120
'
'
I
'
'
I
180 240 AZIMUTH(DEG)
of tip anhedral (/z = 0.30).
angle
320
on blade
I
'
300
tip response;
'
I
360
torsion
TWO-CELL COMPOSITE BLADE TRIM VARIABLES (MU=O.3) 0.200 -
Collective
z
_o.loo. eL
- cyclic sine
z Z U
Vel
'" 0.050Q
cyclic cosine
m
0.000
I
-go
Figure
10.I 3:
-60
Effect setting
I
'
'
I
'
'
I
'
'
I
I
-30 0 30 60 HORIZlNTALWALL PLY ORIENTATION(DEG)
of horizontal _ =0.30).
wall
321
ply angle
on trim
variables;
90
pitch
TWO-CELL COMPOSITE BLADE TRIM VARIABLES (MU=0.3) 0.100-
rotor angle (rad) < 0.080I,,.. 0 I.,,I ._1 Z
< 0.060Q Z 0
._0.040-
inflow ratio
0 .--I
la.
z 0.020o¢ 0 I-0
0.000
I
-go
Figure
10.14:
-60
'
'
I
I
I
'
'
I
-30 0 30 60 HORIZONTALWALL PLY ORIENTATION(DEG)
Effect of horizontal wall ply angle on trim variables; and rotor angle of attack (/a = 0.30).
322
I
90
inflow
TWO-CELL COMPOSITE BLADE TRIM VARIABLES (MU=O.3) 0.200-
collective
_ 0.100"
- cyclic sine
o,.
z__
I_nmmm_mmmm
-l¢Ji
i.a..
'" 0 0.050.
cyclic cosine
m
0.000
' -90
Figure
10.15:
'
w -60
, ' ' i ' ' , I -30 0 30 60 VERTICALWALL PLY ORIENTATION(DEG)
Effect of vertical (,a = 0.30).
'
wall ply angle on trim variables;
323
'
= 90
pitch setting
TWO-CELL COMPOSITE BLADE TRIM VARIABLES (MU=0.3)
0.100-
rotor angle (rad) 0.080.
i
0.080
0
inflow ratio
__ 0.040 0 .J
z 0.020 0 I-0
0.000
I
-9O
Figure
10.16:
-60
"
'
I
'
'
I
'
"
I
"
'
I
'
-30 0 30 60 VERTICALWALL PLY ORIENTATION(DEG)
Effect of vertical wall ply angle rotor angle of attack (/_ = 0.30).
324
on trim
variables;
'
I
90
inflow
and
TWO-CELL COMPOSITE BLADE TRIM VARIABLES (MU=0.3)
col|ective _0.150-
o - cyclic sine
Figure
10.17:
Effect of tip sweep (/z =0.30).
angle
325
on trim
variables;
pitch
setting
TWO-CELL COMPOSITE BLADE TRIM VARIABLES (MU:O.3) 0.100-
o_
rotor angle (rad)
_
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