Let `A_n` be the area bounded by the curve `y = x^n(n>=1)` and the line `x=0, y = 0 and x =1/2`.If `sum_(n=1)^n (2^n A_n)/n=1/3` then find the value of n.

If A_n be the area bounded by the curve y=(tanx^n) ands the lines x=0,\ y=0,\ x=pi//4 Prove that for n > 2. , A_n+A_(n+2)=1/(n+1) and deduce 1/(2n+2)< A_(n) <1/(2n-2)

If A_(n) is the area bounded by y=(1-x^(2))^(n) and coordinate axes,n in N, then

If the area bounded by the curve y=cos^-1(cosx) and y=|x-pi| is pi^2/n , then n is equal to…

If A(n) represents the area bounded by the curve y=n*ln x, where n in N and n>1 the x-axis and the lines x=1 and x=e , then the value of A(n)+nA(n-1) is equal to a.(n^(2))/(e+1) b.(n^(2))/(e-1) c.n^(2) d.en ^(2)

Let a_1,a_2,a_3,.... are in GP. If a_n>a_m when n>m and a_1+a_n=66 while a_2*a_(n-1)=128 and sum_(i=1)^n a_i=126 , find the value of n .

Let a_n is a positive term of a GP and sum_(n=1)^100 a_(2n + 1)= 200, sum_(n=1)^100 a_(2n) = 200 , find sum_(n=1)^200 a_(2n) = ?