The sum of ` sum _(n=1)^(16) (n^(4))/(4n^(2) -1) ` is

The sum of is sum_(1)^(16)((n^(4))/(4n^(2)-1)) is

sum_(n=1)^(oo)tan^(-1)((8)/(4n^(2)-4n+1)) is equal to

The sum sum_(n=1)^(60)tan^(-1)((2n)/(n^(4)-n^(2)+1)) equals tan^(-1)K, where K equal-

The value of sum_(n=1)^(oo)(4n-2)/(3^(n))

The sum sum_(n=1)^(10) ( n(2n-1)(2n+1))/( 5) is equal to ___.

The sum sum_(n=1)^(oo)((n)/(n^(4)+4)) is equal to

Let S_n = 1 (n - 1) + 2. (n -2) + 3. (n - 3) +…+ (n -1).1, n ge 4. The sum sum_(n = 4)^oo ((2S_n)/(n!) - 1/((n - 2)!)) is equal to :

Let S_n = 1 (n - 1) + 2. (n -2) + 3. (n - 3) +…+ (n -1).1, n ge 4. The sum sum_(n = 4)^oo ((2S_n)/(n!) - 1/((n - 2)!)) is equal to :

Let a_(n)=16,4,1, be a geometric sequence. Define P_(n) as the product of the first n terms. Then the value of (1)/(4)sum_(n=1)^(oo)P_(n)^((1)/(n)) is

If sum_(r=1)^(n)r^(4)=F(x), then prove that the value of sum_(n=1)^(n)r(n-r)^(3) is (1)/(4)[n^(3)(n+1)^(2)-4F(x)]