If the complex number 2 + `i` and 1 - 2i are equidistant from x + iy then show that x + 3y = 0

Write the complex number in a+ib form 2i(1+2i)

The complex number (2+3i)/(3+2i) in a+ib form

Show that the complex numbers 3 + 2i, 5i, -3 + 2i, and -i form a square.

If (cos theta + isin theta)^(2) = x + iy, then show that x^(2) + y^(2) = 1

Express the complex number (2-i)/((1-i)(1+2i)) in the form a+ib .

Find the modulus of the complex number 2i(3 - 4i)(4 - 3i)

Find equation of the line which is equidistant from parallel lines 9x + 6y - 7 = 0 " and " 3x + 2y + 6 = 0 .

Find the values of the real numbers x and y, if the complex numbers (3 - i) x - (2-i) y + 2i + 5 and 2x + (-1 + 2i)y + 3 + 2i are equal

The point on the line 3y - 4x + 11 = 0 equidistant from (3, 2) and (-2,3) is