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Explanation:
A truncated cone is where we start with a regular 3D cone and chop off the top. The portion up top is a smaller cone, which we'll ignore. The bottom part is the truncated cone portion.
In the real world, a lampshade is one example of a truncated cone.
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Let x be the radius of the sphere.
We'll be focusing on a vertical cross section of the truncated cone. Refer to figure 1 in the diagram below.
We have the following points
We'll connect a few of those points forming the dashed lines in figure 1.
To start off, draw a segment from D to G. This forms rectangle BGDE with sides of EB = 2x and BG = 2. The side BC is 18 units, so that must mean GC = BC - BG = 18 - 2 = 16.
Since EB = 2x, this means DG is also 2x.
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Now focus on triangles ABC and AFC. They are congruent right triangles. We can prove this using the HL (hypotenuse leg) theorem. Recall that the radius of a circle is perpendicular to the tangent line, which is why angle AFC is 90 degrees. Angle ABC is a similar story.
Because they are congruent right triangles, this indicates side BC is the same length as side FC. Therefore, FC = 18
Through similar logic, triangles ADE and ADF are congruent as well which leads to ED = FD = 2.
Combine sides FD and FC to get the length of DC
DC = FD+FC = 2+18 = 20
This is the hypotenuse of the right triangle GCD
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After all that, we have the right triangle GCD with the legs of 2x and 16. The hypotenuse is 20. Refer to figure 2 shown below.
As you can probably guess, we'll use the pythagorean theorem to find the value of x.
a^2 + b^2 = c^2
(DG)^2 + (GC)^2 = (CD)^2
(2x)^2 + (16)^2 = (20)^2
4x^2 + 256 = 400
4x^2 = 400-256
4x^2 = 144
x^2 = 144/4
x^2 = 36
x = sqrt(36)
x = 6 is the radius of the sphere.
