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Area 36 and perimeter 40 what are the sides? - Answers
To find the sides of a rectangle with an area of 36 and a perimeter of 40, we can use the formulas: area (A) = length (l) × width (w) and perimeter (P) = 2(l + w). From the area equation, we have ( l \times w = 36 ), and from the perimeter equation, ( l + w = 20 ). Solving these equations, we find the dimensions to be ( l = 18 ) and ( w = 2 ), or vice versa. Thus, the sides of the rectangle are 18 and 2.
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Area 36 and perimeter 40 what are the sides? - Answers
To find the sides of a rectangle with an area of 36 and a perimeter of 40, we can use the formulas: area (A) = length (l) × width (w) and perimeter (P) = 2(l + w). From the area equation, we have ( l \times w = 36 ), and from the perimeter equation, ( l + w = 20 ). Solving these equations, we find the dimensions to be ( l = 18 ) and ( w = 2 ), or vice versa. Thus, the sides of the rectangle are 18 and 2.
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Area 36 and perimeter 40 what are the sides? - Answers
To find the sides of a rectangle with an area of 36 and a perimeter of 40, we can use the formulas: area (A) = length (l) × width (w) and perimeter (P) = 2(l + w). From the area equation, we have ( l \times w = 36 ), and from the perimeter equation, ( l + w = 20 ). Solving these equations, we find the dimensions to be ( l = 18 ) and ( w = 2 ), or vice versa. Thus, the sides of the rectangle are 18 and 2.
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