If a and b are real numbers and `(a+ib)^11 = 1+3i` then `(b+ia)^11` is equal to

If a and b are real and ( i^4 + 3i) a + (i -1) b + 5 i^3 = 0, find a and b

If a and b are real and ( i ^(4) + 3i ) a + ( i -1) b + 5i ^(3) = 0, find a and b.

If (1+isqrt3)^9 = a+ib , then value of b is equal to

int_(-1)^(1)sin^(11)xdx is equal to

Find a and b if: (a + ib) + (1 + i) = 2 + i

If alpha is a real number such that z-i(alpha) is real and z=frac{11-3i}{1+i} , then the value of alpha is

Fina a and b if (a + ib) (1 + i) = 2 + i

Find a and b if (a+ib)(1+i) = 2+i