The complex number `2^n/(1+i)^(2n)+(1+i)^(2n)/2^n , n epsilon I` is equal to

The complex number (2^(n))/((1+i)^(2n))+((1+i)^(2n))/(2^(n)),n varepsilon I is equal to

Find the value of 2^n/((1+i)^(2n))+(1+i)^(2n)/(2^n)

If n in Z , then (2^(n))/(1+i)^(2n)+(1+i)^(2n)/(2^(n)) is equal to

What is the modulus of the complex number i^(2n+1) (-i)^(2n-1) , where n in N and i=sqrt(-1) ?

The number ((1+i)^(n))/((1-i)^(n-2)) is equal to

If i=sqrt(-1) , then {i^(n)+i^(-n), n in Z} is equal to

If n is be a positive integer,then (1+i)^(n)+(1-i)^(n)=2^(k)cos((n pi)/(4)), where k is equal to

Prove that (1+i)^(2n)+(1-i)^(2n) = 0 if n is an odd integer and, equal to 2^(n+1)/((-1)^(n//2) if n is an even integer.