If the complex numbers z1 , z2, z3 and z...

If the complex numbers `z_1 , z_2, z_3 and z_4` denote the vertices of a square taken in order. If `z_1 = 3+4i and z_3 = 5+ 6i`, then the other two vertices `z_2 and z_4` are respectively
a)`5+4i, 5+6i`b)`5+4i, 3+6i`c)`5+6i, 3+5i`d)`3+6i, 5+3i`

`5+4i, 5+6i`

`5+4i, 3+6i`

`5+6i, 3+5i`

`3+6i, 5+3i`

Text Solution

Verified by Experts

The correct Answer is:

Similar Questions

Explore conceptually related problems

Suppose z_1 = 1 - i and z_2 = -2 + 4i Find overlinez_1

Suppose z_1 = 1 - i and z_2 = -2 + 4i Find z_1z_2

Consider the complex number z_1 = 3+i and z_2 = 1+i .Find 1/z_2

Consider the complex number z_1 = 3+i and z_2 = 1+i .What is the conjugate of z_2 ?

Let the complex number z satisfy the equation |z+4i|=3 . Then the greatest and least values of |z+3| are

If the complex numbers z _(1) , z _(2) and z _(3) denote the vertices of an isosceles triangle, right angled at z _(1), then (z _(1) - z _(2)) ^(2) + (z _(1) - z _(3)) ^(2) is equal to A)0 B) (z _(2) + z _(3)) ^(2) C)2 D)3

Consider the complex number z=(1+3i)/(1-2i) . Write z in the form a+ib

Consider the complex number z_1 = 3+i and z_2 = 1+i .Using the value of 1/z_2 , find (z_1)/z_2

Consider the complex number z_1 = 2 - i and z_2 = 2 + i Find 1/(z_1z_2) . Hence, prove than I_m(1/(z_1z_2)) = 0

Let z _(1) = 1 + i sqrt3 and z _(2) = 1 + i, then arg ((z _(1))/( z _(2))) is

If the complex numbers `z_1 , z_2, z_3 and z_4` denote the vertices of a square taken in order. If `z_1 = 3+4i and z_3 = 5+ 6i`, then the other two vertices `z_2 and z_4` are respectively a)`5+4i, 5+6i`b)`5+4i, 3+6i`c)`5+6i, 3+5i`d)`3+6i, 5+3i`

Text Solution

Similar Questions

Recommended Questions

If the complex numbers `z_1 , z_2, z_3 and z_4` denote the vertices of a square taken in order. If `z_1 = 3+4i and z_3 = 5+ 6i`, then the other two vertices `z_2 and z_4` are respectively
a)`5+4i, 5+6i`b)`5+4i, 3+6i`c)`5+6i, 3+5i`d)`3+6i, 5+3i`