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Question
Show that (a – b)2, (a2 + b2) and (a2 + b2) are in AP.
Sum
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Solution
The given numbers are (a – b)2, (a2 + b2) and (a2 + b2)
Now,
(a2 + b2) – (a – b)2
= a2 + b2 – (a2 – 2ab + b2)
= a2 + b2 – a2 + 2ab – b2
= 2ab
(a + b)2 – (a2 + b2)
= a2 + 2ab + b2 – a2 – b2
= 2ab
So, (a2 + b2) – (a – b)2
= (a + b)2 – (a2 + b2)
= 2ab ...(Constant)
Since each term differs from its preceding term by a constant, therefore, the given numbers are in AP.
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