Name the type of quadrilateral formed by the following points and give reasons for your answer :

(-1, -2), (1, 0), (-1, 2), (-3, 0).

Let coordinates be A(-1, -2), B(1, 0), C(-1, 2) and D(-3, 0).

$AB = \sqrt{[1 - (-1)]^2 + [0 - (-2)]^2} \\[1em] = \sqrt{[1 + 1]^2 + [0 + 2]^2}\\[1em] = \sqrt{2^2 + 2^2} \\[1em] = \sqrt{4 + 4} \\[1em] = \sqrt{8}. \\[1em] BC = \sqrt{(-1 - 1)^2 + (2 - 0)^2} \\[1em] = \sqrt{(-2)^2 + (2)^2} \\[1em] = \sqrt{4 + 4} \\[1em] = \sqrt{8}. \\[1em] CD = \sqrt{[-3 - (-1)]^2 + [0 - 2]^2} \\[1em] = \sqrt{[-3 + 1]^2 + [-2]^2} \\[1em] = \sqrt{[-2]^2 + [-2]^2} \\[1em] = \sqrt{4 + 4} \\[1em] = \sqrt{8}. \\[1em] AD = \sqrt{[-3 - (-1)]^2 + [0 - (-2)]^2} \\[1em] = \sqrt{[-3 + 1]^2 + [2]^2} \\[1em] =\sqrt{[-2]^2 + [2]^2} \\[1em] = \sqrt{4 + 4} \\[1em] = \sqrt{8}.$

Since, AB = BC = CD = AD.

So, ABCD can be square or rhombus.

Calculating diagonal,

$AC = \sqrt{[-1 - (-1)]^2 + [2 - (-2)]^2} \\[1em] = \sqrt{[-1 + 1]^2 + [2 + 2]^2} \\[1em] = \sqrt{0 + 4^2} \\[1em] = \sqrt{16} \\[1em] = 4. \\[1em] BD = \sqrt{(-3 - 1)^2 + (0 - 0)^2} \\[1em] = \sqrt{(-4)^2 + 0^2} \\[1em] = \sqrt{16} \\[1em] = 4.$

Since, diagonals are also equal.

Hence, (-1, -2), (1, 0), (-1, 2), (-3, 0) are the vertices of a square.