Answer:
The time that passes until the police catch the speeder is 82.6204 seconds.
Explanation:
A body performs a uniformly accelerated rectilinear motion or uniformly varied rectilinear motion when its path is a straight line and its acceleration is constant. This implies that the speed increases or decreases its modulus in a uniform way.
The position is calculated by the expression:
x = x0 + v0*t + 1/2*a*tĀ²
where:
First, letās look at the police carās equations of motion. In this case:
So: x = 50 m/s*t + 1/2*2 m/sĀ²*tĀ²
Now for the speederās carās equations of motion you know:
So: x = 3,000 m + 55 m/s*t + 1/2*1 m/sĀ²*tĀ²
When the police catch the speeder they are both in the same position. So:
50 m/s*t + 1/2*2 m/sĀ²*tĀ²= 3,000 m + 55 m/s*t + 1/2*1 m/sĀ²*tĀ²
Solving:
0= 3,000 m + 55 m/s*t + 1/2*1 m/sĀ²*tĀ² - 50 m/s*t - 1/2*2 m/sĀ²*tĀ²
0= 3,000 + 55 *t + 1/2*tĀ² - 50*t - 1*tĀ²
0= 3,000 + 55 *t - 50*t - 1*tĀ² + 1/2*tĀ²
0= 3,000 + 5*t - 1/2*tĀ²
Applying the quadratic formula:
[tex]x1,x2=\frac{-5+-\sqrt{5^{2}-4*(-\frac{1}{2})*3000 } }{2*(-\frac{1}{2} )}[/tex]
x1= -72.6209
and x2= 82.6209
Since you are calculating the value of a time and it cannot be negative, then the time that passes until the police catch the speeder is 82.6204 seconds.
