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Question
Factorise:
a6 – 64b6
Sum
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Solution
We can factorise a6 – 64b6 as a difference of squares:
a6 – 64b6 = (a3)2 – (8b3)2
Now, apply the difference of squares formula.
x2 – y2 = (x – y)(x + y):
(a3)2 – (8b3)2 = (a3 – 8b3) (a3 + 8b3)
Next, we can factor each of these terms further.
Notice that both a3 – 8b3 and a3 + 8b3 are special forms of cubes:
a3 – 8b3 = (a – 2b) (a2 + 2ab + 4b2)
a3 + 8b3 = (a + 2b) (a2 – 2ab + 4b2)
So the fully factorised form of a6 – 64b6 is a6 − 64b6 = (a − 2b) (a2 + 2ab + 4b2) (a + 2b) (a2 − 2ab + 4b2)
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