Ratio of Consecutive Terms or Coefficients

Ratio of Consecutive Terms & coefficients.

The two consecutive terms whose coefficients in the expansion of (3 + 2x)^(94) are equal, are

Ratio Of Consecutive Terms In Binomial Expansion

The ratio of three consecutive terms in expansion of (1+x)^(n+5) is 5:10:14 , then greatest coefficient is

If in the expansion of (1+x)^(n) the coefficient of three consecutive terms are 56,70 and 56, then find n and the position of the terms of these coefficients.

The ratio of three consecutive binomial coefficients in the expansion of (1+x)^n is 2:5:12 . Find n.

if a,b,c and d are the coefficient of four consecutive terms in the expansion of (1+x)^(n) then (a)/(a+b)+(C) /(c+d)=?

Statement 1: Three consecutive binomial coefficients are always in A.P.Statement 2: Three consecutive binomial coefficients are not in H.P.or G.P.

If (2+(x)/(3))^(55) is expanded in the ascending powers of x and the coefficients of powers of x in two consecutive terms of the expansion are equal then these terms of the expansion are 27,28 (D) 28,29

Find the two consecutive terms in the expansion of (3+2x)^(74) so that the coefficients of powers of x are equal.