 Hello and welcome to the session. In this session we discuss the following question which says construct a parallelogram, one of whose size is 4.4 cm and whose diagonals are 5.6 cm and 7 cm. Before moving on to the solution, let's recall the fact which says that the diagonals of a parallelogram bisect each other. This is the key idea to be used in this question. Now let's proceed with the solution. Before constructing the parallelogram, first let's draw the rough sketch of the parallelogram. This is the parallelogram ABCD with one side say AB of measure 4.4 cm, diagonal AC of measure 5.6 cm, diagonal BD of measure 7 cm, so we have AB equal to 4.4 cm, diagonal AC equal to 5.6 cm. Now since we know that the diagonals of a parallelogram bisect each other, so we have AO is equal to OC is equal to half of AC that is 5.6 upon 2 which would be equal to 2.8 cm. Then we have the diagonal BD is equal to 7 cm. Now again BO would be equal to OD says the diagonals bisect each other. So this would be equal to 7 upon 2 which is equal to 3.5 cm. Now we shall construct this parallelogram step by step. First of all we draw AB equal to 4.4 cm. This is AB of measure 4.4 cm. Now next since we have AO is equal to 2.8 cm. So in the next step with AST center and radius 2.8 cm we draw an arc. So we have drawn this arc taking AST center and radius as 2.8 cm. Now next since we have BO is equal to 3.5 cm. So in the next step with BST center and radius 3.5 cm we draw another arc cutting the previous arc. This is the arc taking BST center and radius 3.5 cm. Let this point be point O then in the next step we join OA, OB then we produce 2C such that we have OC is equal to AO. So this is the point C where we have AO is equal to OC. Then next we produce BO to D such that we have OD is equal to OB. So we have produced BO to the point D such that we have BO is equal to OD. Then we join AD, BC and CD. So this AB, CD is the required. Now in joining AD, CD and BC we get AB, CD is the required parallelogram. So this completes the session. Hope you have understood the solutions for this question.