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The rectangular Ornaments garden is 20 feet and 10 feet in length and breadth, respectively.Given that the fencing is 60 feet long The garden has a 200 square foot space.
The garden's 60-foot perimeter is determined by the length of the fencing, which is equal to the garden's perimeter.Let I and b represent the garden's length and breadth, respectively.The garden's perimeter is therefore 2(+b)=60, where l+b=60/2 = 30 and l=30-b (i)
The rectangular garden's area is equal to 200 by lxb. Equation (): (30 - b)b = 200; 30b - = 200; b - 30b + 200 = 0\sā b - 106 - 20b + 200=0\sā b{b- 10) - 20(b- 10) = 0 ā (b-20) (b- 10) =\s b=20 or b=10; b- 20 = 0 or b- 10 = 0
Using equation (), we can see that if b=20, then I=30-20=10, and if b=10, then I=30-10=20.
The rectangular garden is 20 feet long and 10 feet wide as a result.
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