QuestionA baseball bat contacts a baseball for The average force exerted by the bat on the ball is 8900 N .
Part A
If the ball has an initial velocity of toward the bat and the force of the bat causes the ball's motion to reverse direction, what is the ball's speed as it leaves the bat? Express your answer with the appropriate units.
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Studdy Solution
STEP 1
What is this asking?
How fast is a baseball going *after* it's hit by a bat, if we know how fast it was going *before* it was hit, how heavy it is, how hard it was hit, and for how long?
Watch out!
Velocity has direction!
Don't forget that the initial velocity is *towards* the bat, meaning in the opposite direction of the final velocity.
STEP 2
1. Impulse-Momentum Theorem
2. Calculate the Impulse
3. Find the Final Velocity
STEP 3
Alright, let's start with the *impulse-momentum theorem*!
This theorem tells us that the **change in momentum** of an object is equal to the **impulse** applied to it.
Momentum is how hard it is to stop something, and impulse is a force acting over time.
It's like, the longer you push something, the more its momentum changes!
STEP 4
Mathematically, the impulse-momentum theorem is written as: Where is the **impulse** and is the **change in momentum**.
STEP 5
Momentum is simply mass times velocity.
So, the change in momentum is:
Where is the **mass**, is the **final velocity**, and is the **initial velocity**.
STEP 6
Combining these, we get:
STEP 7
Impulse is the **average force** multiplied by the **time** the force acts: Where is the **average force** and is the **time**.
STEP 8
We're given **8900 N** and **1.3 × 10⁻³ s**.
Let's plug those in:
So, our **impulse** is **11.57 kg⋅m/s**.
STEP 9
Now, let's go back to our impulse-momentum equation:
STEP 10
We know **11.57 kg⋅m/s**, **0.145 kg**, and **-44 m/s** (negative because it's going *towards* the bat).
We want to find .
STEP 11
Let's plug in our values:
STEP 12
Simplify and solve for :
STEP 13
The ball's speed as it leaves the bat is **35.79 m/s**.
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