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Help its due in 5 hours. And I haven’t got the answer right for 2 hours.

Help its due in 5 hours. And I haven’t got the answer right for 2 hours.-example-1
User Andrew France
by
2.3k points

1 Answer

11 votes
11 votes

\text{Volume=}12.41n^2inches^3

Step-by-step explanation

the volume of a cone is given by:


\text{Volume}=(1)/(3)\pi\cdot r^2\cdot h

Step 1

find the radius:

let

Circumference= 6n inches

radius= r


\begin{gathered} \text{Circumference = 2 }\cdot\pi\cdot radius \\ \text{replace} \\ 6n\text{ inches=2}\cdot\pi\cdot\text{ r} \\ \text{divide both sides by 2}\pi \\ \frac{6n\text{ }}{2\pi}\text{=}\frac{\text{2}\cdot\pi\cdot\text{ r}}{2\pi} \\ so \\ r=\frac{6n\text{ }}{2\pi}=(3n)/(\pi) \\ r=(3n)/(\pi) \end{gathered}

Step 2

apply the formula for the volume of the cone:

let

h=13 inhces


\begin{gathered} r=(3n)/(\pi) \\ h=13\text{ inches} \end{gathered}

replace.


\begin{gathered} \text{Volume}=(1)/(3)\pi\cdot r^2\cdot h \\ \text{Volume}=(1)/(3)\pi\cdot(\frac{3\text{ n}}{\pi})^2\cdot13 \\ \text{Volume}=(1)/(3)\pi((9n^2))/(\pi^2)\cdot13 \\ \text{Volume}=(3n^2)/(\pi)\cdot13 \\ \text{Volume}=(39n^2)/(\pi)in^3 \end{gathered}

so, the answer is


\begin{gathered} \text{Volume}=(39n^2)/(\pi)in^3 \\ \text{Volume}\approx(39n^2)/(\pi)in^3 \\ \text{Volume=}12.41n^2inches^3 \end{gathered}

I hope this helps you

Help its due in 5 hours. And I haven’t got the answer right for 2 hours.-example-1
User JoeyP
by
2.7k points
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