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If CD is tangent to the circle, AB = 3.30 and BC=2.80, what is the length of CD?DABс

If CD is tangent to the circle, AB = 3.30 and BC=2.80, what is the length of CD?DABс-example-1
User Froxx
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1 Answer

26 votes
26 votes

Given the circle A

CD is tangent to the circle and AD is a radius of the circle

So, CD ⊥ AD

So, the measure of angle ADC = 90

So, the triangle ADC is a right angle triangle

AC is the hypotenuse = AB + BC = 3.30 + 2.80 = 6.10

And AD = AB = the radius of the circle = 3.30

We will use the Pythagorean theorem to find CD

So,


\begin{gathered} AC^2=AD^2+CD^2 \\ CD^2=AC^2-AD^2 \\ CD^2=6.1^2-3.3^2=26.32 \\ CD=\sqrt[]{26.32}=5.13 \end{gathered}

So, the answer will be CD = 5.13

User Eljenso
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2.8k points