Mathematics
Easy

Question

# Find the perimeter of the rectangle whose coordinates are as follows A (0, 0), B (20, 0), C (20, 15), D (0, 15)

Hint:

## The correct answer is: 70

### The given coordinates of the rectangle are:A is (0,0)B is (20,0)C is (20,15)D is (0,15)We have to find the length of the adjacent sides.To find the length we will use the following criteria:1) If x coordinate is same, we will find the absolute distance using y coordinate. An absolute distance is the length of the point from the respective axis. If x coordinate is same then its length is measured from x axis. It is a positive quantity.2) If y coordinate is same we will use the x coordinate to find absolute distance.3) If the points are in same quadrant, we will have to subtract the absolute distances to find length.4) If the points are in adjacent quadrants, we will have to add the absolute distances to find length.We will consider the side AB as length and BC as breadth.A is origin and B is on x axis. And point C is in first quadrant. A and B have same signs. And B and C have same signs.We will find the length of side AB.For the points A and B, y coordinate is same. We will find the absolute distance using x coordinate. It is distance from y axis.Absolute distance of the point A = |0|Absolute distance of the point B = |20|Length of AB = |20| - |0|= 20Length of the rectangle is 20 units.We will find the length of side BC.For the points B and C, x coordinate is same. We will find the absolute distance using y coordinate. It is distance from x axis.Absolute distance of the point B = |0|Absolute distance of the point C = |15|Length of BC = |15| - |0|= 15Breadth of the rectangle is 15 units.The formula for perimeter is 2(length + breath)Perimeter of rectangle ABCD = 2(length + breath)= 2(20 + 15)= 70 unitsTherefore, perimeter of the rectangle is 70 units.

For such questions, we have to see if the points of the rectangle are in same quadrant or adjacent quadrants. We can use distance formula to find the length of sides of rectangle too.