In the expansion of `(7^(1//3)+11^(1//9))^(6561)` , there are exactly 730 rational term there are exactly 5831 irrational terms the term which involves greatest binomial coefficients is irrational the term which involves greatest binomial coefficients is rational

In the expansion of (7^(1/3)+11^(1/9))^(6561) (a)there are exactly 730 rational term (bthere are exactly 5831 irrational term (bthe term which involves greatest binomial coefficients is irrational (d)the term which involves greatest binomial coefficients is rational

In the expansion of (7^((1)/(3))+11^((1)/(9)))^(6561), the number of terms free from radicals is:

In the expansion of (7^((1)/(3))+11^((1)/(9)))^(6561), the number of terms free from radicals is:

In the expansion of (a^(1/3)+b^(1/9))^6561 , where 'a' and 'b' are distinct prime numbers, then the number of irrational terms are

Summation OF Series in which Equation and Terms ||Product OF two Binomial coefficients

Binomial expansion || Question based on binomial coefficient and terminologies || General term

In the expansion of (3^(-(x)/(4))+3^((5x)/(4)))^(n) the sum of the binomial coefficients is 256 and four xx the term with greatest binomial coefficient exceeds the square of the third coefficient then find 4x.

In the expansion of (3^(-(x)/(4))+3^((5x)/(4)))^(n), the sum of the binomial coefficients is 256and four xx the term withgreatest binomial coefficient exceeds the square of the third coefficient then find 4x.

In the expansion of (x+y)^(n) ,if the binomial coefficient of the third term is greater by 9 then that of the second term,then the sum of the binomial coefficients of the terms occupying to odd places is