Answer :
Final answer:
The probe, starting from rest, accelerates at a rate of 0.45 m/s² in space. This acceleration is caused by a force of approximately 14.94 Newtons.
Explanation:
To examine the situation outlined in the question, we must apply Newton's second law of motion, which states that force equals mass times acceleration (F = ma). The question provides us with the mass of the probe (33.2 kg) and the displacement over time (101 m in 15 s), which we can use this to find the acceleration, and ultimately, the force.
First, we calculate the probe's velocity (v) using the formula v = d/t, where d is distance and t is time. In this case, v = 101 m / 15 s = 6.73 m/s.
Remember, the probe started at rest, meaning the initial velocity (u) is 0. We can then find the acceleration (a) using the equation a = (v - u) / t. Plugging in our values, we get acceleration as a = (6.73 m/s - 0) / 15s = 0.45 m/s².
Finally, we find the force by substituting these values back into Newton's second law: F = ma = 33.2 kg * 0.45 m/s² = 14.94 N. Therefore, the force produced is approximately 14.94 Newtons.
Learn more about Newton's Second Law here:
https://brainly.com/question/13447525
#SPJ2
Answer:
a
=
F
M
a
=
137
30.8
x
=
1
2
a
t
2
x
=
1
2
⋅
137
30.8
⋅
13
2
x
=
375.86
Explanation: Hope this helps ;)
