Find the consecutive terms in the binomial expansion oif `(3+2x)^7` whose coefficients are equal

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

Ratio Of Consecutive Terms In Binomial Expansion

The two consecutive terms in the expansion of (1+x)^(24) whose coefficients are in the ratio 1:4 are

Find the two consecutive cocfficients in the expansion of (3x-2)^(75) whose values are equal

Find the two consecutive cocfficients in the expansion of (3x-2)^75 whose values are equal

If the ratio of coefficients of the three consecutives terms in binomial expansion of (1+x)^(n) is 2:5:70. Then the average of these coeficients is

The sum of the coefficients in the binomial expansion of (1/x +2x)^6 is equal to :

If for some positive integer n, the coefficients of three consecutive terms in the binomial expansion (1+x)^(n+5) are in the ratio 5:10:14 , then the largest coefficient in this expansion is :

The sum of the coefficients in the binomial expansion of (1/x + 2x)^(6) is equal to