The sum of the last eight coefficiennts in the expansion of `(1+x)^(15)` is
(1) `2^(16)`
(2) `2^(15)`
(3) `2^(14)`
(4) `2^(8)`

The sum of the last eight coefficients in the expansion of (1+x)^(15) is

The sum of the last eitht coefficients in the expansion of (1 + x)^(15) , is

The sum of the last eitht coefficients in the expansion of (1 + x)^(15) , is

The sum of the last eight coefficients in the expansion of (1+x)^(16) is equal to

Consider the expansion of (2x-1)^(15)

The sum of the coeficients in the expansion of (2x-3y)^(15) will be

Statement-1: The integeral part of (8+3sqrt(7))^(20) is even. Statement-2: The sum of the last eight coefficients in the expansion of (1+x)^(16) is 2^(15) . Statement-3: if R(5sqrt(5)+11)^(2n+1)=[R]+F , where [R] denotes the greatest integer in R, then RF=2^(2n+1) .

Statement-1: The integeral part of (8+3sqrt(7))^(20) is even. Statement-2: The sum of the last eight coefficients in the expansion of (1+x)^(16) is 2^(15) . Statement-3: if R(5sqrt(5)+11)^(2n+1)=[R]+F , where [R] denotes the greatest integer in R, then RF=2^(2n+1) .

Find the cofficient of x^(10) in the expansion of (1-2x+3x^(2))(1-x)^(15) .