the length of a rectangle exceeds its breadth by 7 cm if the length is decreased by 4 cm and breadth is increased by 3 cm the area of a new rectangle is the same as the area of original rectangle find the length and the breadth of the origin rectangle
Answers
Let the breadth be x cm
So, the length be x + 7 cm
New Rectangle -
Breadth = (x + 3) cm
Length = (x + 7 - 4) cm = (x + 3) cm
According to Question,
Given : Area of Original rectangle = Area of New rectangle
x(x + 7) = (x + 3)(x + 3)
=> x² + 7x = x² + 3x + 3x + 9
=> 7x = 6x + 9
=> 7x - 6x = 9
=> x = 9
Required Measurements -
Length = (x + 7) = (9 + 7) = 16 cm
Breadth = x = 9 cm
Hence, the length and breadth of the original rectangle are 16 cm and 9 cm respectively
Solution:-
given:-
• The length of the rectangle exceeds it's breadth by 7cm.
• If the length is decreased by 4cm and the breadth is increased by 3cm.
• The area of new rectangle is the same as the area of original rectangle.
Find:-
• The length and breadth of the original rectangle = ?
Formula:-
=> Area of rectangle
= length(L) × breadth(B)
Now, by given,
let, x be the breadth of rectangle so,
for original rectangle.
• breadth = B1 = x ........ ( 1 )
• length = L1 = x + 7 ........ ( 2 )
so, now....
for new rectangle
• breadth = B2 = x + 3 ........ (3)
• length = L2 = x + 7 - 4 ....... ( 4 )
we know,
=> (Area of new rectangle) = (Area of oringinal rectangle)
=> L2 × B2 = L1 × B1
=>( x + 7 - 4 ) ( x + 3 ) = ( x + 7) ( x )
=> ( x + 3 ) ( x + 3 ) = x² + 7x
=> ( x + 3 )² = x² + 7x
=> x² + 6x + 9 = x² + 7x
=> x² - x² + 6x - 7x + 9 = 0
=> - x + 9 = 0
=> - x = - 9
=> x = 9
From ( 1 ),
• breadth = x = 9 cm.
From ( 2 ),
• length = x + 7
• length = 9 + 7
• length = 16 cm.
Hence length and breadth of original rectangle is 16cm and 9cm respectively.
i hops it helps you.