The amplitude of `e^(e^-(itheta))`, where `theta in R and i = sqrt(-1)`, is

The amplitude of e^(e^(-(i theta))), where theta in R and i=sqrt(-1), is

if cos (1-i) = a+ib, where a , b in R and i = sqrt(-1) , then

The value of tan^(-1)(e^(i theta)) is equal to

If amplitude of (2+i)/(i-1) is theta, then

If prod_(p=1)^(r) e^(iptheta)=1 , where prod denotes the continued product and i=sqrt(-1) , the most general value of theta is (where, n is an integer)

If A+B+C, = pi and e^(i theta) = cos theta+i sin theta and z = det [[e^(-iC), e^(2iB), e^(-iA) e^ (-iB), e^(-iA), e^(2iC)]], then

If z= 5e^(itheta), then |e^(iz)| is equal to

Read the following writeup carefully: In argand plane |z| represent the distance of a point z from the origin. In general |z_1-z_2| represent the distance between two points z_1 and z_2 . Also for a general moving point z in argand plane, if arg(z) =theta , then z=|z|e^(itheta) , where e^(itheta) = cos theta + i sintheta . Now answer the following question If |z-(3+2i)|=|z cos ((pi)/(4) - "arg" z)|, then locus of z is