 Hi and welcome to the session. I am Neha and today I am going to help you with the following question. The question says state whether true or false. For this statement all rhombuses are kites. So let's see its solution with the help of this figure. Here we have a kite and a rhombus. Let us recall what is a kite. A kite is a quadrilateral with exactly two pairs of equal consecutive sites. That is ab is equal to ad and vc is equal to dc. Also the diagonals are perpendicular to each other. That is all these angles are 90 degree each. And one of the diagonal bisect the other. Here ac bisects bd. That is be is equal to ed. Also one pair of opposite angles is equal. In this figure we have angle b is equal to angle d. Now let's see what is a rhombus. A rhombus is a parallelogram with sites of equal length. That is pq is equal to qr is equal to rs is equal to sp. Opposite angles are equal. That is angle p is equal to angle r and angle q is equal to angle s. Also the diagonals bisect each other. That is po is equal to or and qo is equal to os. Also they are perpendicular to each other. So that means all these angles are 90 degree each. Thus we got that a rhombus satisfies all the properties of a kite. And thus the statement all rhombuses are kites is true. So with this we finish this session. I hope you must have understood the concept. Goodbye and take care.