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10 September, 11:35

A parallelogram has sides measuring 21.8 m and 41.2 m. The height corresponding to the 21.8 is 11.2 m. Find the height, to the nearest tenth of a meter, corresponding to the 41.2 m base

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Answers (2)
  1. 10 September, 11:46
    0
    The height corresponding to the 41.2 m base is 5.9m

    Step-by-step explanation:

    Let Base of the parallelogram (b) = 21.8m

    Base of the parallelogram (B) = 41.2 m.

    Height corresponding to base 21.8m = h = 11.2 m

    Height corresponding to base 41.2m = H = ?

    Area of parallelogram = Base * Height

    B*H = b*h

    41.2 * H = 21.8*11.2

    H = (21.8*11.2) / 41.2

    H = 244.16/41.2

    H = 5.9m

    The height corresponding to the 41.2 m base is 5.9m
  2. 10 September, 11:50
    0
    21.2 meters (m)

    Step-by-step explanation:

    If the side of a parallelogram 21.8 m = height 11.2m

    The side of parallelogram 41.2 m = height?

    We would cross multiply

    That would give us

    (41.2m * 11.2m) : 21.8m

    = 21.166972477m

    Approximately to the nearest tenth of a meter = 21.2meters (m)

    Therefore, the height, corresponding to the side of the parallelogram 41.2m to the nearest tenth is 21.2meters (m)
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