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27 July, 16:11

Ms. Ahmed has a rectangular garden where she grows tomatoes. The length of her garden is represented by t + 4 and the width by 2t - 1.

Express the area of Ms. Ahmed's garden as a polynomial in standard form.

If the area of Ms. Ahmed's garden is 56 ft2, what are the dimensions of the garden?

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  1. 27 July, 16:12
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    area of the garden as a polynomial in standard form = 2t² + 7t - 4

    The dimension will be 8 ft by 7 ft.

    Step-by-step explanation:

    The area of a rectangular shape is the product of the length and the width. Ms Ahmed rectangular garden with a length represented as t + 4 and width of 2t - 1, the area of the garden can be solved by multiplying both value.

    Area of the garden = (t + 4) (2t - 1)

    Area of the garden = 2t² - t + 8t - 4

    Area of the garden = 2t² + 7t - 4

    Expressing the area as a polynomial in standard form simply implies that the terms are express from the biggest exponent tot he lowest exponent. Therefore,

    area of the garden as a polynomial in standard form = 2t² + 7t - 4

    When the area is 56 ft².

    2t² + 7t - 4 = 56

    2t² + 7t - 4 - 56 = 0

    2t² + 7t - 60 = 0

    fin the numbers you can multiply to give you - 120 and add to give you 7. The numbers are 15 and - 8. Therefore,

    2t² + 15t - 8t - 60 = 0

    t (2t + 15) - 4 (2t + 15) = 0

    (t - 4) (2t + 15) = 0

    t = 4 or - 15/2

    let use t = 4 as it is positive.

    area = (t + 4) (2t - 1)

    area = (4 + 4) (8 - 1)

    area = 8 * 7 = 56 ft²

    The dimension will be 8 ft by 7 ft.
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