Physics Explained Through a Video Game/Introduction to Work and Energy
Topic 3.1 - Introduction to Work and Energy
[edit | edit source]Goals:
- Know what work is.
- Understand and apply the derivation for work.
- Know what kinetic and potential energy are.
- Use and calculate physical situations using the work-energy theorem.
Topic 3.1.1 - Work
[edit | edit source]Example 1: Rolling City Boulder
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To further describe the behavior of a physical object, we can consider work. Work is a type of energy within a system, which we'll discuss shortly. It involves considering the magnitude of a selected force on an object and the displacement that the object has had.
In its simplest form, work is the product of a force's magnitude and an object displacement, given that (1) the force is constant and (2) the force and displacement vectors are pointing in the same direction. In this special case, . We could use the convention that work can be represented by the symbol such that .
As an example of this, consider a rolling circular boulder in a modified version of lack of comfort by swiped3. The boulder accelerates towards the right while on a flat surface. This is because wind is pushing on the boulder, providing it a constant that is pointed towards the right. Additionally, during the video, there is a displacement vector towards the right.
Exercise: Suppose that has a magnitude of and the displacement magnitude is . What would be the net work done on the boulder?
Answer:
In this case, we are told that the force is constant. Also, we can see in the diagram that the and vectors are pointing in the same direction (towards the right). Thus, we can use the formula , as shown below to find the work done on the boulder by the net force, .
[We're considering the work done by the net force on the ball. As such, we're calculating for the net work on the ball.]
[Substitution.]
[2 sigfigs]
The boulder has a net work of while it is pictured rolling on the rooftop.
Example 2: Propeller Planes
[edit | edit source]To note, we can also calculate for the work done by a force on an object even when the displacement vector isn't parallel with the force vector. With this, we can use the general formula for the work done on an object, given a constant force:
Definition of Work Given a Constant Force: |
With the equation above, note two things:
- Work is a scalar value. This means that it is a one-dimensional value. However, it can be either negative or positive. For more information, consider this video by Khan Academy. Also, the next example will go further into this concept.
- The dot product is used in the equation. This is a type of multiplication between two vectors. Generally, this concept is introduced in a precalculus course.
If dot products are unfamiliar to you, we can also write the general equation for work done by constant force alternatively as . In this,
- and are respectively the magnitude of the vectors and .
- is the difference in direction between the two vectors.
Answer: To solve this problem, we can first list the information mentioned in the prompt.
- We're solving for the work done by the gravitational force on the plane.
- The gravitational force vector has a magnitude of and is directed downwards.
- The displacement vector has a magnitude of . It is directed below the +X Axis.
With this, we can find the variables needed for substitution into the equation . More specifically, the gravitational force vector's magnitude is our variable. In addition, the displacement vector represents the variable. Therefore, we can partially substitute in our variables into the equation such that:
[Formula]
[We're considering the gravitational force acting on the plane.]
[Substitution of the gravitational force and displacement vector magnitudes.]
To consider the value of , we can graph and as diagrammed to the right. Using the information given and the diagram, we can find that . We can substitute this value into our equation for and continue simplifying.
[Substitution of ]
[Using degree mode; Algebra; 2 sigfigs]
While the plane is descending, the gravitational force does of work on the plane.
Example 3: Assembly Line
[edit | edit source]Content Prerequisite
Before reading this example, please watch a related video created by Khan Academy.
We can also calculate the work done by a force even when a force is changing. Suppose that in the map Factory of Copy Maps by antidonaldtrump / Armin van Buren that colored boxes are being pushed along an assembly line. On the top row of the assembly line, the blocks have a net force that is pushing them forward along the line, accelerating them in the leftward direction.
Unlike previous examples, the force that is being exerted on the object is varying. This means that the equation , which assumes that the force is constant, cannot be directly used.
Instead, we can consider calculating for the work on the colored boxes graphically.
Walkthrough: Suppose that on the top row of the assembly line where:
- The yellow box flips onto it side and begins moving towards the left over two conveyor belts.
- The yellow box travels along the first belt.
- The net force for the yellow box on the first belt is .
- Then, the yellow box travels along the second belt.
- The net force for the yellow box while on the second belt is .
In this example, we're going to be calculating graphically for the work done on the yellow box by the net force. To do this, we can create a function of the force on the yellow box with respect to its displacement as pictured on the right. To go further, we need to consider some theory regarding work.
Using this definition, we can create a graph of the yellow box's net force, with respect to . Because the force exerted on the yellow box is dependent on where the box is positioned, is the independent variable () and is the dependent variable ().
As mentioned above, because work is the accumulation of force with respect to distance, if we were to calculate the area between the green curve and the axis, this would be work done on the yellow box between and .
This can be done through breaking apart the pictured graph into two rectangles as also pictured. From here, we can easily calculate the area of each of these rectangles, giving us the amount of work done.
With this, we can combine the two rectangle areas to find the work done:
Shape | Shape Area | Associated Displacement Domain |
---|---|---|
Purple Rectangle | to | |
Blue Rectangle | to | |
Total Area | ( when adjusted for sigfigs) | to |
Thus, when the yellow box was being pushed along the top portion of the assembly line, it had a work of done by the net force acting on it.
Section 3.1.2 - Kinetic Energy
[edit | edit source]Example 1: Arrows in the Forest
[edit | edit source]In this example, there will be an introduction of kinetic energy, what it means conceptually, and how to calculate for it in a physical situation. [Content]
Example 2: Flying Squirrel
[edit | edit source][Intro] Suppose the in-game situation in the map Flying Squirrel by Raspy 667. In this map, a flying squirrel is gently moving through the air back and forth. What would be the kinetic energy of the squirrel at each of the labeled points from the video [cont]
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