If z is a complex number, then

If z is a complex number, then the minimum value of `|z|+|z-1|` is -

If z is a complex number satisfying the relation `|z+ 1|=z+2(1+i)`, then z is

If z\nis a complex number, then find the minimum value of |z|+|z-1|+|2z-3|dot | CLASS 12 | COMPL...

If z is a complex number such that `|z|=4` and `arg(z) =(5pi)/6` then z is equal to

"If z is a complex number of unit modulus and argument q, then `a r g((1+z)/(1+ bar z))` equal

If z is a non-zero complex number, then ||z|/zz||is equal to|Complex Numbers|11|RD Sharma|CBSE|MCQ

If `z` is a non zero complex, number then `|(|barz |^2)/(z barz )|` is equal to a. `|(barz )/

Finding The Roots Of A Complex Number

If `z` is a complex number such that `|z| gt=2` then the minimum value of `|z+1/2|` is

If z=x+iy and ω=(1-iz)/(z-i), then |ω|=1, implies that in the complex plane,

If z is a complex number, then amp `((z-1)/(z+1))=pi/2` will be

Complex Number :If z is complex number such that (𝒛 −𝒊)/(𝒛 −𝟏) is purely imaginary [JEE Main Aug21]

If `z=x+iy` is a complex number with `x, y in Q and |z| = 1`, then show that `|z^(2n)-1|` is

z is a complex number then number of common roots of the equation z^1985 +z^100+1=0 &z3+2z2+2z+1=0

If `z` is a complex number and `z=bar(z)`, then prove that `z` is a purely real number.

If |z|=1 and ω=(z-1)/(z+1) then Re⁡(ω) is #complex numbers # modulus of complex numbers

If `z` is a complex number and `bar(z)=-z`, prove that `z` is purely imaginary number.

If z = x + iy and w = (1 - iz)(z - i) and |w | = 1 , then prove that z is purely real. 11th Maths

If z^2+z+1=0, where z is complex number, then the value of (z+1/z)^2+(z^2+1/z^2 )^2+(z^3+1/z^3 )^2+