Question

10) A conical tent having base diameter 24m and slant height 14m. Find the CSA of the tent. *

1 point

1056 m²

448 m²

528 m²

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Answer 1

Given:

• Diameter of the conical tent = 24 m

• Height of the conical tent = 14 m.

To find :

• CSA of the conical tent .

Solution :

• As we know that :

$\star \boxed{ \red{\bold{ CSA \: \: of \: \: the \: \: cone \: = \pi \: r \: l \: }} }$

where, r is radius and l is slant height of the cone .

• Radius = Diameter / 2 = 24/2

• Radius = 12 m

Put the values :

$\implies \: CSA \: of \: the \: cone = \frac{22}{ \cancel7} \times 12 \times \cancel{14} \\ \\ \implies \: CSA \: of \: the \: cone \: = 22 \times 12 \times 2 \\ \\ \implies \: CSA \: of \: the \: cone \: = 22 \times 24 \\ \\ \implies \: CSA \: of \: the \: cone \: = \: 528 \: {m}^{2}$

Hence, option D is correct .

• CSA of the cone is 528m².

Answer 2

Step-by-step explanation:

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