Question

Find the height $ h $ of a cylinder if radius $r = 8.3\, \text{cm}$ and area $A = 1266.6132\, \text{cm}$.

Answer

$21.6457$

Explanation

STEP 1: find base area $ AB $

To find base area $ AB $ use formula:

$$ AB = r^2 \cdot \pi $$

After substituting $r = 8.3\, \text{cm}$ we have:

$$ AB = \left( 8.3\, \text{cm} \right)^{2} \cdot \pi $$ $$ AB = 68.89\, \text{cm}^2 \cdot \pi $$

STEP 2: find lateral area $ AL $

To find lateral area $ AL $ use formula:

$$ A = 2 AB + AL $$

After substituting $A = 1266.6132\, \text{cm}$ and $AB = 68.89\pi\, \text{cm}^2$ we have:

$$ 1266.6132\, \text{cm} = 2 \cdot 68.89\pi\, \text{cm}^2 + AL $$ $$ 1266.6132\, \text{cm} = 137.78\, \text{cm}^2 + AL $$ $$ AL = 1266.6132\, \text{cm} - 137.78\, \text{cm}^2 $$ $$ AL = 1128.8332\, \text{cm} $$

STEP 3: find height $ h $

To find height $ h $ use formula:

$$ AL = 2 \cdot h \cdot r \cdot \pi$$

After substituting $AL = 1128.8332\, \text{cm}$ and $r = 8.3\, \text{cm}$ we have:

$$ 1128.8332\, \text{cm} = 2 \cdot h \cdot \left( 8.3\, \text{cm} \right)^{4} \cdot \pi$$$$ 1128.8332\, \text{cm} = 16.6\, \text{cm} \cdot h \cdot \pi $$$$ h = \dfrac{ 1128.8332\, \text{cm}}{ 16.6\, \text{cm} \, \pi } $$$$ h \approx 21.6457 $$

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