The diagonal of a rectangle 901 m and breadth of rectangle is 60 m . Find the length of rectangle.
Answers
Step-by-step explanation:
Given :-
The diagonal of a rectangle 901 m and breadth of rectangle is 60 m .
To find :-
Find the length of rectangle?
Solution :-
Given that
The diagonal of a rectangle = 901 m
The breadth of rectangle = 60 m .
Let the length of the rectangle be l m
We know that
The diagonal of a rectangle (d) =√(l²+b²)
=> d² = (l²+b²)
=> l² = d²-b²
We have , d = 901 m and b = 60 m
On Substituting these values in the above formula then
=> l² = (901)²-(60)²
=> l² = 811801-3600
=> l² = 808201
=> l = √808201
=> l = 899 m
Therefore, length = 899 m
Answer:-
The length of the rectangle = 899 m
Used formulae:-
→ The diagonal of a rectangle (d) =√(l²+b²)
- d = diagonal
- l = length
- b = breadth
Step-by-step explanation:
Solution :
Given that
The diagonal of a rectangle = 901 m
The breadth of rectangle = 60 m.
Let the length of the rectangle be I m We know that
The diagonal of a rectangle (d) =√(1²+b²)
=> d² = (1²+b²)
=> 1² = d²-b²
We have, d = 901 m and b = 60 m
On Substituting these values in the
above formula then => 1² = (901)²-(60)²
=> 1² = 811801-3600
=> 1² = 808201
=> 1 = √808201
=> 1899 m
Therefore, length = 899 m
Answer:
The length of the rectangle = 899 m
Used formulae:
→ The diagonal of a rectangle (d)
On Substituting these values in the above formula then
=> 1² = (901)²-(60)²
=> 1² = 811801-3600
=> 1² = 808201
=> 1 = √808201
=> 1 899 m
Therefore, length = 899 m
Answer:
The length of the rectangle = 899 m
Used formulae:
→ The diagonal of a rectangle (d) =√(1²+b²)
d = diagonal
1 = length
b = breadth