Newton’s Second Law of Motion: Difference between revisions
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'''Answer: 8.05 N''' | '''Answer: 8.05 N''' | ||
'''Explanation:''' Simply use the formula stated in Newton's Second Law of Motion. Force= 3.5(2.3)= 8.05 N | '''Explanation:''' Simply use the formula stated in Newton's Second Law of Motion. Force= 3.5(2.3)= 8.05 N. | ||
===Middling=== | ===Middling=== | ||
A car has a mass of 200 kg. The car starts at rest. Ten seconds later, the car is moving at a speed of 20 | A car has a mass of 200 kg. The car starts at rest. Ten seconds later, the car is moving at a speed of 20 m/s. What is the force applied on the object? | ||
'''Answer: 400 N''' | '''Answer: 400 N''' | ||
'''Explanation: First, solve for the acceleration by finding the change in velocity, over the change in time. Therefore (20-0)/(10-0)=20/10=2 m/^2. Then use this acceleration value and the given mass to implement Newton's Second Law of Motion. Therefore, Force= 200(2)=400 N | '''Explanation''': First, solve for the acceleration by finding the change in velocity, over the change in time. Therefore (20-0)/(10-0)=20/10=2 m/^2. Then use this acceleration value and the given mass to implement Newton's Second Law of Motion. Therefore, Force= 200(2)=400 N. | ||
===Difficult=== | ===Difficult=== | ||
A human named Julio has a mass of 40 kg and is running. Initially, Julio has a momentum of 240 kgm/s. Ten seconds later, Julio has a velocity of 8 m/s. What is the force applied on Julio? | |||
'''Answer: 8 N''' | |||
'''Explanation:''' This question is difficult because it has multiple parts to it. First, one must solve for the acceleration by dividing the momentum by the mass(240/40=6 m/s) and then finding the difference between the two velocities(8-6=2), and then divide the difference by the change in time(2/10=0.2 m/s^2) Next, Newton's Second Law must be applied in order to find the force(Force=0.2(40)= 8 N). Therefore the answer is 8 N | |||
==Connection to Newton's Other Laws== | ==Connection to Newton's Other Laws== |
Revision as of 15:07, 27 November 2016
Claimed by Rahul Singi Fall 2016
History
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Main Idea
A Mathematical Model
At the most basic level, Newton's Second Law of Motion states that force is equal to mass multiplied by acceleration, or F=ma. At face value, this means the force applied on an object is dependent on only two factors, the mass of the object and the acceleration, or change of momentum of the object. However, Newton's Second Law of Motion provides us with more information than simply that. First, it shows that the force applied on an object must be in the same direction as the acceleration, as mass is simply a positive constant. This can be further investigated to show that the force increases as the magnitude of acceleration increases, meaning acceleration, momentum, and force all have a positive relationship.
Additionally, this law can be re-written to show that [math]\displaystyle{ {\frac{d\vec{p}}{dt}}_{system} = \vec{F}_{net} }[/math] where dp/dt represents change of momentum. Therefore, the greater the change in momentum, the greater the force being applied on the object.
A Computational Model
How do we visualize or predict using this topic. Consider embedding some vpython code here Teach hands-on with GlowScript
Manipulate the code to see the different motions of the cart. See what changing the direction of the force, the net force, or the mass of the ball does to the momentum and final position of the cart.
Example Problems
Simple
Given a object has a mass of 3.5 kg and an acceleration of 2.3 m/s^2. What is the force applied on the object?
Answer: 8.05 N
Explanation: Simply use the formula stated in Newton's Second Law of Motion. Force= 3.5(2.3)= 8.05 N.
Middling
A car has a mass of 200 kg. The car starts at rest. Ten seconds later, the car is moving at a speed of 20 m/s. What is the force applied on the object?
Answer: 400 N
Explanation: First, solve for the acceleration by finding the change in velocity, over the change in time. Therefore (20-0)/(10-0)=20/10=2 m/^2. Then use this acceleration value and the given mass to implement Newton's Second Law of Motion. Therefore, Force= 200(2)=400 N.
Difficult
A human named Julio has a mass of 40 kg and is running. Initially, Julio has a momentum of 240 kgm/s. Ten seconds later, Julio has a velocity of 8 m/s. What is the force applied on Julio?
Answer: 8 N
Explanation: This question is difficult because it has multiple parts to it. First, one must solve for the acceleration by dividing the momentum by the mass(240/40=6 m/s) and then finding the difference between the two velocities(8-6=2), and then divide the difference by the change in time(2/10=0.2 m/s^2) Next, Newton's Second Law must be applied in order to find the force(Force=0.2(40)= 8 N). Therefore the answer is 8 N
Connection to Newton's Other Laws
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References
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