Let the sequencea1,a2....an form and AP....

Let the sequence`a_1,a_2....a_n` form and AP. Then `a_1^1-a_2^2+a_3^2-a_4^2...` is equal to

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Let the sequence a_1 , a_2 , a_3 ......... a_n form an A.P. then a_1^2 - a_2^2 + a_3^2 - a_4^2 +.....+ a_(2n-1)^2 - a_(2n)^2 is equal to:- (1) n/(2n-1)(a_1^2-a_(2n)^2) (2) (2n)/(n-1)(a_(2n)^2-a_1^2) (3) n/(n+1)(a_1^2+a_(2n)^2) (4)none of these

If the sequence a_1, a_2, a_3,....... a_n ,dot forms an A.P., then prove that a_1^2-a_2^2+a_3^2-a_4^2+.......+ a_(2n-1)^2 - a_(2n)^2=n/(2n-1)(a_1^2-a_(2n)^2)

Let the sequence a_1,a_2,a_3, ,a_n from an A.P. Then the value of a1 2-a2 2+a3 2-+a2n-1 2-a2n2 is (2n)/(n-1)(a2n2-a1 2) (b) n/(2n-1)(a1 2-a2n2) n/(n+1)(a1 2-a2n2) (d) n/(n-1)(a1 2+a2n2)

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