Home
Class 11
MATHS
[" 11.Number of values of "x" (real or c...

[" 11.Number of values of "x" (real or complex) simultaneously satisfying the system of equations "],[1+z+z^(2)+z^(3)+.........+z^(17)=0" and "1+z+z^(2)+z^(3)+.........+z^(13)=0" is - "],[[" (A) "1," (R) "2," (C) "3]]

Promotional Banner

Similar Questions

Explore conceptually related problems

Number of values of z (real or complex) simultaneously satisfying the system of equations 1+z+z^(2)+z^(3)++z^(17)=0 and 1+z+z^(2)+z^(3)++z^(13)=0 is

The number of values of z (real or complex) e simultaneously satisfying the system of equations 1+z+z^2+z^3+...z^17=0 and 1+z+z^2+z^3+..+z^13=0 is

The number of values of z (real or complex) e simultaneously satisfying the system of equations 1+z+z^2+z^3+...z^17=0 and 1+z+z^2+z^3+..+z^13=0 is

The number of values of z (real or complex) e simultaneously satisfying the system of equations 1+z+z^2+z^3+...z^17=0 and 1+z+z^2+z^3+..+z^13=0 is

The number of values of z (real or complex) e simultaneously satisfying the system of equations 1+z+z^2+z^3+...z^17=0 and 1+z+z^2+z^3+..+z^13=0 is

If z and w are two complex numbers simultaneously satisfying te equations,z^(3)+w^(5)=0 and z^(2)+bar(w)^(4)=1, then

If z and w are two complex numbers simultaneously satisfying the equations, z^3+w^5=0 and z^2 . overlinew^4 = 1, then

Non-real complex number z satisfying the equation z^(3)+2z^(2)+3z+2=0 are

If z and w are two complex numbers simultaneously satisfying te equations, z^3+w^5=0 and z^2 +overlinew^4 = 1, then