In the linear equation 4x+y+3=0
the coefficients of x,y represents length and breadth of a rectangle.
Find the perimeter and area of that rectangle .
Explain.
Answers
Answer:
Required perimeter and area of this rectangle is 10 units and 4 unit^2.
Step-by-step explanation:
It is given that the coefficients of x,y represents length and breadth of a rectangle. { in equation 4x + y + 3 = 0 }.
In the question, coefficient of x is 4 and coefficient of y is 1.
Thus,
Length of the rectangle is 4 units ( or x ) .
Breadth of the rectangle is 1 unit ( or y ) .
From the properties of rectangle :
- Perimeter = 2( length + breadth )
- Area = length x breadth
*Of rectangle.
Thus,
= > Perimeter of this rectangle = 2( 4 + 1 ) units
= > Perimeter of this rectangle = 2 x 5 units
= > Perimeter of this rectangle = 10 units .
= > Area of this rectangle = 4 units x 1 unit
= > Area of this rectangle = 4 unit^2
Hence the required perimeter and area of this rectangle is 10 units and 4 unit^2.
It is not possible because coefficients which f not like cannot be used to find the perimeter or the area