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10 March, 14:03

Find the dimensions of a rectangle whose width is 7 miles less than it's length and whose area is 120 square miles.

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Answers (2)
  1. 10 March, 14:12
    0
    The width is 8 and the length is 15. 15x8=120 15-8=7
  2. 10 March, 14:22
    0
    Length = 15 miles and width = 8 miles.

    Step-by-step explanation:

    Given : A rectangle whose width is 7 miles less than it's length and whose area is 120 square miles.

    To find : Find the dimensions of a rectangle.

    Solution : We have given length and width of a rectangle.

    According to question:

    Let us consider the length of a rectangle = x.

    Width is 7 miles less than length

    Width = x - 7.

    Area of rectangle = length * width

    Plugging the values of length, width and area.

    Area of rectangle = length * width

    120 = x * (x-7)

    120 = x² - 7x

    On subtracting 120 from both sides and switching sides.

    x² - 7x - 120 = 0.

    On factoring

    x² - 15x + 8x - 120 = 0.

    Taking common x from two terms and 8 from last two terms.

    x (x - 15) + 8 (x - 15) = 0

    On grouping

    (x + 8) (x - 15) = 0

    x + 8 = 0 and x-15 = 0

    x = - 8 and x = 15.

    So length can not be negative values

    Then x = 15 miles.

    now, width = 15 - 7 = 8 miles.

    Therefore, Length = 15 miles and width = 8 miles.
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