If `x^(p)` occurs in the expansion of `(x^(2)+1/x)^(2n)` then prove that its coefficient is `(2n!)/((((4n-p)!)/(3!))(((2n+p)!)/(3!)))`

If the fourth term in the expansion of (px+1/x)^n is 5/2 , then (n,p)=

Middle term in the expansion (x+(1)/(x))^(2n) is ........... .

If the expansion of (x-1/(x^(2)))^(2n) contains a term independent of x , then n is a multiple of 2 .

The sum of coefficients of the two middle terms in the expansion of (1+x)^(2n-1) is equal to (2n-1)C_(n)

Show that the coefficient of the middle term in the expansion of (1+x)^(2n) is equal to the sum of the coefficients of two middle terms in the expansion of (1 + x)^(2n-1)

Show that the middle term in the expansion of (x-1/x)^(2n) is (1xx3xx5xx....xx(2n-1))/(n!) xx(-2)^(n)

Prove that the coefficient of x^n in the expansion of (1+x)^(2n) is twice the coefficient of x^n in the expansion of (1+x)^(2n-1) .

Coefficient of x^3 in expansion (1+x)^n is 20 then n = 6 .

If A and B are coefficient of x^(n) in the expansions of (1+x)^(2n) and (1+x)^(2n-1) respectively , then A/B equals to