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प्रश्न
The area of a rectangle gets reduced by 9 sq. units if its length is reduced by 5 units and breadth is increased by 3 units. If we increase the length by 3 units and breadth by 2 units, then the area is increased by 67 sq. units. Find the length and breadth of the rectangle.
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उत्तर
Given:
- Let the length of the rectangle be (x) units.
- Let the breadth of the rectangle be (y) units.
Step-wise calculation:
1. According to the first condition:
If length is reduced by 5 units and breadth is increased by 3 units, the area decreases by 9 sq. units.
So, the area equation is:
(x – 5)(y + 3) = xy – 9
Expanding the left side:
xy + 3x – 5y – 15 = xy – 9
Simplify:
3x – 5y – 15 = –9
3x – 5y = 6 ...(1)
2. According to the second condition:
If length is increased by 3 units and breadth is increased by 2 units, the area increases by 67 sq. units.
So, the area equation is:
(x + 3)(y + 2) = xy + 67
Expanding the left side:
xy + 2x + 3y + 6 = xy + 67
Simplify:
2x + 3y + 6 = 67
2x + 3y = 61 ...(2)
3. Now solve equations (1) and (2):
3x – 5y = 6
2x + 3y = 61
Multiply (1) by 3 and (2) by 5 to eliminate (y):
9x – 15y = 18 ...(3)
10x + 15y = 305 ...(4)
Add (3) and (4):
9x – 15y + 10x + 15y = 18 + 305
19x = 323
`x = 323/19`
x = 17
4. Substitute (x = 17) into equation (1):
3(17) – 5y = 6
51 – 5y = 6
–5y = 6 – 51
–5y = –45
`y = 45/5`
y = 9
Length of the rectangle: 17 units.
Breadth of the rectangle: 9 units.
