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What is the radius of the cone

What is the radius of the cone-example-1
User Josh Rosen
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2 Answers

19 votes
19 votes
5 is the answer !!!!!!
User Psy
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23 votes
23 votes

Answer:

Explanation:

You can use calculus to derive the equation for the volume of a cone.

if we take an circle at the tip of the cone the radius is 0 but what we want to do is integrate along the x axis from 0 up to the height of the cone H.

So, the equation becomes


\int\limits^H_0 {\pi r^(2) } \, dx

r is related to x by the formula for a line; r = m*x+b

m is the rise over the run which is given by the maximum height H divided by the maximum radius R. So m = H/R and the intercept b = 0

now we have a formula for r in terms of x and with a little variable manipulation we can get a formula for x in terms of r

r = (R/H)*x

If we replace r by this formula in our integral we get:


\int\limits^H_0 {\pi ((R/H)*x)^(2) } \, dx

since
\pi, R, and H are constants we can move them outside the integral:


\pi (R^(2) /H^(2) )*\int\limits^H_0 {x^(2) } \, dx

the integral is easy. It is
(x^(3))/(3)\left \{{{x=H}\atop{x=0}} \right. which is equal to
H^(3) /3

substituting back into the original formula we get the equation for the volume of a cone.
V =
(\pi R^(2)H)/3

Use this formula with the values given in the question to solve for R.

183.17 =
\pi
R^(2)*7/3

rearranging we get


√(183.17*3/(7\pi ) ) = R

R ≅ 5

User Ganesh Kathiresan
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3.0k points