There is a square garden whose area is 425.5969sq.m.If from every side the length is decreased by 0.03m,then what will be the possible length of new square garden.
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To find the possible length of the new square garden, we need to first calculate the length of the original square garden.
Given that the area of the original square garden is 425.5969 sq.m, we can find the length of one side by taking the square root of the area.
sqrt(425.5969) ≈ 20.637 m
Next, we need to calculate the length of the decreased sides of the new square garden. We subtract 0.03m from each side of the original square.
Length of new square garden = 20.637 - 0.03 ≈ 20.607 m
Therefore, the possible length of the new square garden is approximately 20.607 meters.
To find the possible length of the new square garden, we first need to calculate the original length of the garden.
The area of a square is given by the formula: Area = Length ^ 2
In this case, we are given that the area of the garden is 425.5969 sq.m. Therefore, we can set up the equation:
425.5969 = Length ^ 2
To find the original length, we can take the square root of both sides of the equation.
Length = √425.5969
Using a calculator, we find that the square root of 425.5969 is approximately 20.6332.
Now that we know the original length of the square garden, we can calculate the new length after decreasing each side by 0.03m.
New Length = Original Length - 0.03
Plugging in the value of the original length we found,
New Length = 20.6332 - 0.03
Calculating this, we find that the new length of the square garden is approximately 20.6032 meters.
each side is now √425.5969 = 20.63
Reduce by .03 to 20.6