The volume of a solid hemisphere is $56\frac{4}{7} cm^3$. What is its total surface area (in cm²)? (Take $\pi=\frac{22}{7} $)

The volume of a solid hemisphere is $56\frac{4}{7} cm^3$ . What is its total surface area (in cm²)? (Take $\pi=\frac{22}{7}$ )

A $\frac{495}{7}$

B $\frac{396}{7}$

C $\frac{594}{7}$

D $\frac{494}{7}$

Answer:

\frac{594}{7}

Given:

The volume of a solid hemisphere is 56\frac{4}{7} cm^3

Take $\pi=\frac{22}{7}$

Formula used:

The volume of the solid hemisphere $=\frac{<span style="color: inherit">2}{3}</span>\pi{r^3}$

The total surface area of the solid hemisphere = 3πr²

Where,

r, is the radius of the hemisphere

Calculation:

According to the question, the required figure is:

The volume of the solid hemisphere,

$\frac{2}{3}\pi{r^3}=56\frac{4}{7}$

$\frac{2}{3}\times{\frac{22}{7}}\times{r^3}=\frac{396}{7}$

$\frac{2}{3}\times{22}\times{r^3}=396$

$r^3=\frac{396\times{3}}{2\times{22}}$

$r^3=27$

$r=3$

Now,

The total surface area of the solid hemisphere $=3\times{\frac{22}{7}}\times{32}=\frac{594}{7}cm^3$

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