The bottom of a cylindrical container has an area of 10 cm². The container is filled to a height whose mean is 5 cm, and whose standard devi

Question

The bottom of a cylindrical container has an area of 10 cm². The container is filled to a height whose mean is 5 cm, and whose standard deviation is 0.3 cm. Let V denote the volume of fluid in the container.
Find μv and σv.

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Elliana 5 hours 2021-11-25T12:49:07+00:00 1 Answer 0 views 0

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    2021-11-25T12:50:30+00:00

    Answer:

    μv =50 cm^{3}

    σv= 3 cm^{3}

    Step-by-step explanation:

    Volume is found by multiplying the area and height. Since we’re given both area and height of 10 and 5 cm respectively then

    μv =A.h= 10*5= 50 cm^{3}

    The standard deviation of the volume will be

    σv= 0.3*10= 3 cm^{3}

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