let `pi_1,pi_2,pi_3` and `z_4` be the roots of the equation `z^4 + z^3 +2=0` , then the value of `prod_(r=1)^(4) (2pi_r+1)` is equal to :

let z_1,z_2,z_3 and z_4 be the roots of the equation z^4 + z^3 +2=0 , then the value of prod_(r=1)^(4) (2z_r+1) is equal to :

The value of prod_(r=1)^(7)cos\ (pi r)/(15) is

If z_1,z_2,z_3,z_4 are imaginary 5th roots of unity, then the value of sum_(r=1)^(16)(z1r+z2r+z3r+z4r),i s 0 (b) -1 (c) 20 (d) 19

For a complex number Z, if arg Z=(pi)/(4) and |Z+(1)/(Z)|=4 , then the value of ||Z|-(1)/(|Z|)| is equal to

If z=re^(itheta) ( r gt 0 & 0 le theta lt 2pi ) is a root of the equation z^8-z^7+z^6-z^5+z^4-z^3+z^2 -z + 1=0 then number of value of 'theta' is :

Let z_(1),z_(2),z_(3),z_(4) are distinct complex numbers satisfying |z|=1 and 4z_(3) = 3(z_(1) + z_(2)) , then |z_(1) - z_(2)| is equal to

If arg(z)=-pi/4 then the value of arg((z^5+(bar(z))^5)/(1+z(bar(z))))^n is

Let Z be a complex number satisfying the relation Z^(3)+(4(barZ)^(2))/(|Z|)=0 . If the least possible argument of Z is -kpi , then k is equal to (here, argZ in (-pi, pi] )

Find the locus of z if arg ((z-1)/(z+1))= pi/4

If z lies on the curve a r g(z+1)=pi/4 , then the minimum value of |z-omega|+|z+omega|,w h e romega=e^(i(2pi)/3) , is