If u and v are complex numbers such that `u=3-5i and v=-6+i`, which of the following is equivalent to `(u+v)^(2)`? (Note: `i^(2)=-1`)

Which of the following is equivalent to (4+6i)/(10-5i) ? (Note: i^(2)=-1 )

Which of the following complex numbers is equivalent to (3-5i)/(8+2i) ? (Note: i=sqrt(-1) )

Which of the following complex numbers is equivalent to (2+ I )/(3 + 5i) ?

For all real numbers s,t,u and v such that s+t +u = 29 and s < v, which of the following statement is true ?

For i=sqrt(-1) , which of the following complex number is equivalent to (10i+4i^2)-(7-3i) ?

Evaluate the following : int_(u)^(v) " mv dv"

The imaginary number "I" is such that i^(2)=-1 . Which of the following statements is true about the complex number equivalent to (4-i)xx(1+2i)+(1-i)xx(2-3i) ?

Which of the following complex numbers is equal to (5 + 12i) − ( 9i^2 − 6i), for i = sqrt(−1) ?

Let z=x+iy and w=u+iv be two complex numbers, such that |z|=|w|=1 and z^(2)+w^(2)=1. Then, the number of ordered pairs (z, w) is equal to (where, x, y, u, v in R and i^(2)=-1 )