Algorithms to generate examples.pdf - Google Drive
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24 x 21 = 42 x 12 Generating more examples Students often have difficulty generating more examples using a trial and improvement method. While it is relatively
FOUR 3-step ALGORITHMS to generate examples Gives all examples with ratio 2:1, 1:2
easy to find equations that involve doubling and halving, those that combine both doubling and halving and reversing digits are elusive. With some classes I have
(1) Halve, reverse, double Start with 42, halve 42 gives 21, reverse 21 to give 12 and double for 24.
developed one of the following algorithms with a pair of students who then explain it to the class. Alternatively, I have coconstructed an algorithm in whole-class discussion. The algorithms involve starting
42 x 12 = 21 x 24 (1)
halve
(2)
reverse
(3)
double
with a double-digit number on the lefthand side of the equation, changing it in
(2) Double, reverse, halve
some way to derive a number on the right,
42 x 48 = 84 x 24
coming back to the left for the third
(1)
double
number, and then back to the right for the
(2)
reverse
(3)
halve
fourth.
(3) Reverse, halve, reverse 42 x 12 = 24 x 21 (1)
reverse
(2)
halve
(3)
reverse
(4) Reverse, double, reverse 42 x 48 = 24 x 84 (1)
