If `i=sqrt(-1)` and n is a positive integer, then `i^n+i^(n+1)+i^(n+2)+i^(n+3)` is

If n is a positive integer,then (1+i)^(n)+(1-1)^(n) is equal to

If n is a positive integer,then (sqrt(3)+i)^(n)+(sqrt(3)-i)^(n) is

If n is any positive integer,write the value of (i^(4n+1)-i^(4n-1))/(2)

For any positive integer n, find the value of i^(n)+i^(n+1)+i^(n+2)+i^(n+3)+i^(n+4)+i^(n+5)+i^(n+6)+i^(n+7) .

For a positive integer n, what is the value of i^(4n+1) ?

For any positive integer n, prove that: i^(n)+i^(n+1)+i^(n+2)+i^(n+3)+i^(n+4)+i^(n+5)+i^(n+6)+i^(n+7)=0 .

For a positive integer n, find the value of (1-i)^(n)(1-(1)/(i))^(n)

If n in N, then find the value of i^(n)+i^(n+1)+i^(n+2)+i^(n+3)

The least positive integer 'n' for which (1+i)^(n)=(1-i)^(n) holds is

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