Prove that the ratio of the coefficient of `x^10` in `(1 - x^2)^10` & the term independent of `x` in `(x-2/x)^10` is `1:32`

The ratio of the coefficient of x^10 in (1-x^2)^10 and the term of independent of x in (x-2//x)^10 is

Show that the ratio of the coefficient of x^(10) in (1-x^(2)) and the term independent of x in (x - 2/x)^(10) is 1:32

If the ratio of the coefficient of x^(10) in (1-x^(2))^(10) and term independent of x in (x-2/x)^(10) is p/q (where p and q are relative prime numbers) then q/8-p is

The ratio of the coefficient of x^(3) to the term independent of x in (2x+1/(x^(2)))^(12) is

The coefficient of x^(-10) in (x^2-1/x^3)^10 , is

Coefficient of x^5 in (1+x +x^2 +x^3)^10 is

Coefficient of x^5 in (1+x +x^2 +x^3)^10 is

The term independent of x in ((sqrtx)/(2)-(2)/(x^2))^10 is

Find the term independent of x in (6x^(2)-(1)/(7x^(3)))^(10)