Answer:
Proved below
Explanation:
I have attached an image showing the diagram of a quadrilateral with its diagonals bisecting each other at right angles.
From the image attached, the quadrilateral is ABCD and the diagonals AC and BD are seen to bisect each other at right angles at the point O.
In the 2 triabgles ΔAOB and ΔAOD, we see that;
AO = CO (Common parts of a line)
Also; OB = OD
(since point O is the mid-point of BD)
Angles; ∠AOB = ∠AOD
(Since Each are both at right angles of 90°)
Thus;
ΔAOB ≈ ΔAOD
(from SAS criteria for triangle similarity)
This means that their corresponding parts will be equal and we have;
AB = AD
AB = BC
BC = CD
CD = AD
From the 4 equal corresponding parts deduced, we can say that;
AB = BC and CD = DA
Therefore, the quadrilateral ABCD is a rhombus since all the sides are equal.