The radius of the circle is 155.7 feet.
Given that
If a car goes around a turn too quickly, it can leave tracks that form an arc of a circle.
By finding the radius of the circle, accident investigators can estimate the speed of the car.
We have to determine
In the radius, accident investigators choose points A and B on the tire marks. Then, the investigators find the midpoint C of AB.
According to the question
In the given figure the measure of the segment AC is 130 feet.
And the measure of the segment CD = 70 feet
And the measure of the segment CE is (r-70).
The radius of the s choose points A and B on the tire marks are given by using the Pythagoras theorem.
Pythagoras theorem states that the square of the hypotenuse of a right-angled triangle is equal to the sum of the square of its base and height.
Then,
[tex]\rm r^2= (130)^2+(r-70)^2\\
\\
r^2= 16900+r^2+4900-140r\\
\\140r -21,800=r^2-r^2\\
\\
140r - 21,800=0\\
\\
140r = 21,800\\
\\
r = \dfrac{21800}{140}\\
\\
\rm r= 155.7[/tex]
Hence, the radius of the circle is 155.7 feet.
To know more about Pythagoras theorem click the link given below.
https://brainly.com/question/16914218
