 Hi, and welcome to the session. I am Neha and today I will discuss the following question with you. The question says name the quadrilaterals whose diagonals bisect each other. So let's see its solution. Now let us name the quadrilaterals whose diagonals bisect each other. Let's find out the first one. Now here in this figure we have made a parallelogram. Let's recall the definition of a parallelogram. A parallelogram is a quadrilateral with each pair of opposite sides parallel and equal. They are parallel as well. Also opposite angles are equal and the diagonals bisect each other. So that means the first quadrilateral whose diagonals bisect each other is a parallelogram. We know that a rhombus, a square and a rectangle all these three are parallelograms. So that means they all satisfy the properties of parallelograms. Or we can say that their diagonals also bisect each other. Thus our second, third and fourth quadrilaterals whose diagonals bisect each other are a rhombus, a square and fourth one is a rectangle. Thus our final solution for this question is a parallelogram, a rhombus, a square and a rectangle. So this is our final solution for this question. And with this we finish this session. I hope you must have enjoyed it. Goodbye and take care.