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20 March, 04:02

The length of a rectangle exceeds its width by 7 inches and the area is 30 square inches. what are the length and width of the rectangle?

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  1. 20 March, 04:28
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    Let's assume w represent the width of the rectangle.

    Given that, the length of a rectangle exceeds its width by 7 inches. So,

    length = w + 7.

    Given, area is 30 square inches.

    Since Area = l * w

    So, we can set up an equation as following:

    (w + 7) * w = 30

    w² + 7w = 30 By distribution property.

    w² + 7w - 30 = 0 Subtract 30 from each sides.

    Next step is to solve the above equation by factoring to get the value of w.

    First step is to breakdown the constant - 30 into two multiples so that their addition will result the coefficient of w = 7.

    So, - 30 = - 3 * 10.

    Addition of - 3 and 10 will give 7.

    So, next step is to replace 7w with - 3w + 10w. Therefore,

    w² - 3w + 10w - 30 = 0

    (w² - 3w) + (10w - 30) = 0 Make the group of terms.

    w (w - 3) + 10 (w - 3) = 0 Take out the common factor from each group.

    (w - 3) (w + 10) = 0 Take out the common factor (w - 3).

    w - 3 = 0 and w + 10 = 0 Set up each factor equal to 0.

    So, w = 3 and - 10.

    Width cannot be negative 10.

    So, w = 3.

    Now length = w + 7 = 3 + 7 = 10

    Hence length of the rectangle is 10 inches and width is 3 inches.
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