What can be said about the expansion of `2^(12n) - 6^(n)` where n is a positive integer ?

(-i)^(4n+3), where n Is a positive integer.

Solve (x-1)^(n)=x^(n), where n is a positive integer.

The number formed from the last two digits (ones and tens) of the expression 2^(12n)-6^(4n) where n is any positive integer is 10(b)00(c)30 (d) 02

Let the coefficients of powers of x in the 2^(nd), 3^(rd) and 4^(th) terms in the expansion of (1 + x)^(n) , where n is a positive integer, be in arithmetic progression. Then the sum of the coefficients of odd powers of x in the expansion is

Let the coefficients of powers of in the 2^(nd), 3^(rd) and 4^(th) terms in the expansion of (1+x)^(n) , where n is a positive integer, be in arithmetic progression. The sum of the coefficients of odd powers of x in the expansion is

What are the limits of (2^(n)(n+1)^(n))/(n^(n)) , where n is a positive integer ?