Sum of my Length and Breadth is 36. I am a rectangle. My Length is x units and breadth is y units The difference between my length and breadth is 6 units.
Answers
Answer:
- Length and breadth of the rectangle are 21 units and 15 units respectively.
Step-by-step explanation:
Given that:
A rectangle having,
- Length = x units
- Breadth = y units
Sum of length and breadth = 36 units
- i.e., x + y = 36 _____(i)
Difference between length and breadth = 6 units
- i.e., x - y = 6 _____(ii)
To Find:
- Length and breadth of the rectangle.
Finding the length and breadth:
Adding eqⁿ(i) and eqⁿ(ii).
⟶ (x + y) + (x - y) = 36 + 6
⟶ x + y + x - y = 42
Cancelling y.
⟶ 2x = 42
⟶ x = 42/2
⟶ x = 21
∴ Length of the rectangle = 21 units
In equation (ii).
⟶ x - y = 6
Putting the value of x.
⟶ 21 - y = 6
⟶ y = 21 - 6
⟶ y = 15
∴ Breadth of the rectangle = 15 units
Answer:
Answer:
Length and breadth of the rectangle are 21 units and 15 units respectively.
Step-by-step explanation:
Given that:
A rectangle having,
Length = x units
Breadth = y units
Sum of length and breadth = 36 units
i.e., x + y = 36 _____(i)
Difference between length and breadth = 6 units
i.e., x - y = 6 _____(ii)
To Find:
Length and breadth of the rectangle.
Finding the length and breadth:
Adding eqⁿ(i) and eqⁿ(ii).
⟶ (x + y) + (x - y) = 36 + 6
⟶ x + y + x - y = 42
Cancelling y.
⟶ 2x = 42
⟶ x = 42/2
⟶ x = 21
∴ Length of the rectangle = 21 units
In equation (ii).
⟶ x - y = 6
Putting the value of x.
⟶ 21 - y = 6
⟶ y = 21 - 6
⟶ y = 15
∴ Breadth of the rectangle = 15 units
Step-by-step explanation:
Hope this answer will help you.