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27 votes
27 votes
What is the diameter of hemisphere with a volume of 841 cm^3 to the nearest tenth of a centimeter?

User Sebastian Liendo
by
2.5k points

1 Answer

11 votes
11 votes

The rule of the volume of the hemisphere is


V=(2)/(3)\pi r^3

r is the radius of it

Since the diameter of the hemisphere is double the radius, then we can find the radius then multiply it by 2 to find it

Since the volume of the hemisphere is 841 cm^3, then

Substitute V by 841


\begin{gathered} 841=(2)/(3)\pi(r^3) \\ 841=(2)/(3)\pi r^3 \end{gathered}

Divide both sides by 2/3pi


\begin{gathered} (841)/((2)/(3)\pi)=((2)/(3)\pi r^3)/((2)/(3)\pi) \\ \\ (2523)/(2\pi)=r^3 \end{gathered}

Take cube root to both sides


\begin{gathered} \sqrt[3]{(2523)/(2\pi)}=\sqrt[3]{r^3} \\ 7.377555082=r \end{gathered}

Multiply it by 2 to find the diameter, then round it to the nearest tenth


\begin{gathered} d=7.377555082*2 \\ d=14.75511016 \\ d=14.8\text{ cm} \end{gathered}

The diameter of the hemisphere is 14.8 cm

User Snehal Poyrekar
by
2.9k points
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