the area of rectangular field is 7875 square if the length and breadth are in ratio 7 ratio 5 find the length and breadth of a rectangle
Answers
☆ Solution ☆
Given :-
- The area of rectangular field is 7875² unit.
- The length and breadth are in ratio 7 : 5.
To Find :-
- The length and breadth of the rectangle.
Step-by-Step-Explaination :-
Let,
- The ratios be 7x and 5x.
So,
Length of the rectangle = 7x
Breadth of the rectangle = 5x
Now,
As we know that :-
Area of rectangle = length × breadth
Where,
- Area of the rectangle = 7875²
- Length of the rectangle = 7x
- Breadth of the rectangle = 5x
Putting the respective value,
7875 = 7x × 5x
7875 = 35x
x = 7875x
x = 225
Thus,
Length of the rectangle = 7x = 7 × 225 = 1,575 unit
Breadth of the rectangle = 5x = 5 × 225 = 1,125 unit
Hence Solved !
Step-by-step explanation:
☆ Solution ☆
Given :-
The area of rectangular field is 7875² unit.
The length and breadth are in ratio 7 : 5.
To Find :-
The length and breadth of the rectangle.
Step-by-Step-Explaination :-
Let,
The ratios be 7x and 5x.
So,
Length of the rectangle = 7x
Breadth of the rectangle = 5x
Now,
As we know that :-
Area of rectangle = length × breadth
Where,
Area of the rectangle = 7875²
Length of the rectangle = 7x
Breadth of the rectangle = 5x
Putting the respective value,
7875 = 7x × 5x
7875 = 35x
x = 7875x
x = 225
Thus,
Length of the rectangle = 7x = 7 × 225 = 1,575 unit
Breadth of the rectangle = 5x = 5 × 225 = 1,125 unit
Hence Solved !