In the expansion of (x+a)^n if the sum ...

In the expansion of `(x+a)^n` if the sum of odd terms is `P` and the sum of even terms is `Q ,` then (a)`P^2-Q^2=(x^2-a^2)^n` (b)`4P Q=(x+a)^(2n)-(x-a)^(2n)` (c)`2(P^2+Q^2)=(x+a)^(2n)+(x-a)^(2n)` (d)none of these

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In the expansion of (x+a)^n if the sum of odd terms is P and the sum of even terms is Q , then (a) P^2-Q^2=(x^2-a^2)^n (b) 4P Q=(x+a)^(2n)-(x-a)^(2n) (c) 2(P^2+Q^2)=(x+a)^(2n)+(x-a)^(2n) (d)all of these

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In the expansion of `(x+a)^n` if the sum of odd terms is `P` and the sum of even terms is `Q ,` then (a)`P^2-Q^2=(x^2-a^2)^n` (b)`4P Q=(x+a)^(2n)-(x-a)^(2n)` (c)`2(P^2+Q^2)=(x+a)^(2n)+(x-a)^(2n)` (d)none of these

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