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Re: The above diagram shows 3 identical circles placed inside a [#permalink]
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GreenlightTestPrep wrote:
Image

The above diagram shows 3 identical circles placed inside a right triangle so that all 3 circles are tangent to line AB. What is the radius of each circle?

A) 5
B) 6
C) 7
D) 8
E) 10


Key property: A line tangent to a circle is perpendicular to the circle's radius at the point of intersection

First, if we add the centers of each triangle as as well as the point E, we get the following:
Image


At this point, if we draw lines from point E to each of the three vertices, look at the following:
Image


At this point we may recognize that: (area of ∆AEB) + (area of ∆CEA) + (area of ∆CEB) = area of ∆ACB

Area of triangle = (base)(height)/2

So, we get: (40)(r)/2 + (30)(5r)/2 + (50)(r)/2 = (40)(30)/2
Simplify to get: 20r + 75r + 25r = 600
Simplify: 120r = 600
Solve: r = 600/120 = 5

Answer: A

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Brent
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Re: The above diagram shows 3 identical circles placed inside a [#permalink]
greenpistachio wrote:
I'd choose A, but my way is more of an estimate.

Find the area for the triangle:
1/2(30)(40)=600

The area of the circles can't be more than 600:

(pie)(r^2)=600
r=13.8

But that's the radius for 3 circles, and to find the radius of each circle, I divided by 3 which gets me 4.6. Rounded up, so I chose A.

Is my approach wrong and I just got lucky?

That's a great idea, and you did arrive at the correct answer, but this was a bit of a coincidence. Here's why....

If we want to compare the total area of the 3 circles with the area of triangle ABC, we can't write: (pi)(r^2) = 600, because this assumes that we have just one circle.
If r = the radius of ONE circle, then (pi)(r^2) = the area of one circle, which means (3)(pi)(r^2) = the total area of THREE circles.
So, we need to write: (3)(pi)(r^2) = 600
From here we get: (pi)(r^2) = 200
And: r^2 ≈ 64 (after dividing both sides by pi)
Solve: r ≈ 8

Why is this number so much greater than the correct answer? Because, we are equating the total area of the circles with the area of triangle ABC, when we can see that the 3 circles definitely don't take up the entire area of the triangle.

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Brent
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Re: The above diagram shows 3 identical circles placed inside a [#permalink]
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wow :oops:
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Re: The above diagram shows 3 identical circles placed inside a [#permalink]
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