The amplitude of `e^(e^-(itheta))`, 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

if alpha and beta the roots of z+ (1)/(z) =2 (cos theta + i sin theta ) where 0 lt theta lt pi and i =sqrt(-1) show that |alpha - i |= | beta -i|

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)

The real part of (1-i)^(-i), where i=sqrt(-1) is

Let X be the soultion set of the equation A^(x)=-I, where A = [[0 , 1, -1],[4, -3, 4],[3, -3, 4]] and I is the corresponding unit matrix and x subseteq N, the minimum value of sum ( cos ^(x) theta + sin ^(x) theta ) theta in R - { (npi)/2 , n in I } is

Write the equation of the lines for which tan theta = (1)/(2), where theta is the (i) y -intercept is = -(3)/(2)

The angle to the given by x = e ^(theta) cos theta, y = e ^(theta) sin theta at theta = ( pi)/(4) makes an angle with X-axis is___

"statement-1" (cos theta+isin theta)^(3)=cos 3theta+isin 3theta, i=sqrt(-1) bb"statement-2" (cos""pi/4+isin""pi/4)^(2)=i

The equation z^(2)-i|z-1|^(2)=0, where i=sqrt(-1), has.

If the conjugate of a complex numbers is 1/(i-1) , where i=sqrt(-1) . Then, the complex number is