The principal value of `arg (z)`, where `z=1+cos((8pi)/5)+i sin((8pi)/5)` (where, `i=sqrt-1) ` is given by

sqrt((-8-6i)) is equal to (where, i=sqrt(-1)

If z=cos((pi)/(3))-isin((pi)/(3)) then z^(2)-z+1=....

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

The principle value of cos^(-1){1/sqrt2("cos"(9pi)/10-"sin"(9pi)/10)} is _____

Find the principal values of the following : sin^(-1)["sin"(2pi)/3]

The value of sin^(-1)[cos((33pi)/5)] is _______

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

A particle move along the Z -axis accoding to the equation z = 5 + 12 cos(2pit + (pi)/(2)) , where z is in cm and t is in seconds. Select the correct alternative (s)-

cos (cos^-1 cos((8pi)/7) +tan^-1 tan((8pi)/7)) has the value equal to -

If abs(z-2-i)=abs(z)abs(sin(pi/4-arg"z")) , where i=sqrt(-1) , then locus of z, is