Home
Class 9
MATHS
A (3,6), B(3,2) and C(8,2) are the verti...

A (3,6), B(3,2) and C(8,2) are the vertices of a rectangle. Plot these points on a graph paper and then use it to find the co- ordinates of the vertex D.

Text Solution

Verified by Experts

The correct Answer is:
D=(8,6)
Promotional Banner

Topper's Solved these Questions

Similar Questions

Explore conceptually related problems

A(3,6),B(3,2) and C(8,2) are the vertices of a rectangle. Plot these points on a graph paper and then use it to find the co-ordinates of vertex D.

Points A(5,3), B(-2,3) and D(5,-4) are three vertices of a square ABCD . Plot these points on a graph paper and hence , find the coordinate of the vertex C.

A(-2,2),B(8,2) and C(4,-4) are the vertice of a parallelogram ABCD. By plotting the given points on a graph paper, find the co-ordinates of the fourth vertex D.

A (-2,2),B(8,2) and C(4,-4) are the vertices of a parallelogram ABCD. By plotting the given points on a graph paper, find the co-ordinates of the fourth vertex D. Also from the same graph, state the co-ordinates of the mid points of the sides AB and CD.

Three vertices of a parallelogram ABCD are A = (-2, 2), B = (6, 2) and C = (4.-3). Plot these points on a graph paper and hence use it to find the co ordinates of the fourth vertex D. Also, find the co-ordinates of the mid point of the side CD.

A(4,3),B(6,5)and C(5,-2) are the vertices of a DeltaABC, if P is a point on BC such that BP:PC =2:3. Find the co-ordinates of P and then prove then ar (DeltaABP):ar(DeltaACP)=2:3.

A(-2,4),C(4,10) and D(-2,10) are the vertices of a square ABCD. Use the graphical method to find the co-ordinates of the fouth vertex B. Find : (i) the co-ordinates of the mid point of BC (ii) the co-ordinates of the mix point of CD and (iii) the co-ordinates of the point of intersection of the diagonals of the square ABCD.

In square ABCD, A=(3,4),B=(-2,4) and C=(-2,-1). By plotting these point on a graph paper, find the co-ordinates of vertex D. Also find the area of the square.

A (-1, 0), B (1, 3) and D (3, 5) are the vertices of a parallelogram ABCD. Find the co-ordinates of vertex C.

Show that A (3, 2), B (6, -2) and C (2, -5) can be the vertices of a square. Without using the co-ordinates of vertex D, find the equation of side AD of the square and also the equation of diagonal BD.