QA_4

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course Phy 121

6/15 at 7:20 PM

004. Acceleration

Goals:

• Definition of average rate of change of velocity with respect to clock time.

• Apply the definition of average rate of change to define acceleration.

• Interpret the slope of a velocity vs. clock time graph

• (understand the defining characteristic of the v vs. t graph for constant acceleration: not well emphasized at this point)

• Describe the v vs t graph of an object with nonuniform acceleration

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Question: `q001 Note that there are 13 questions in this assignment.

At a certain instant the speedometer of a car reads 5 meters / second (of course cars in this country generally read speeds in miles per hour and km per hour, not meters / sec; but they could easily have their faces re-painted to read in meters/second, and we assume that this speedometer has been similarly altered). Exactly 4 seconds later the speedometer reads 25 meters/second (that, incidentally, indicates very good acceleration, as you will understand later). At what average rate is the speed of the car changing with respect to clock time?

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Your solution:

Average rate of the speed with respect to clock time = change in speed / change in clock time.

Change in speed = (25 m/s - 5 m/s) = 20 m/s

Change in time = 4 s

Average rate of speed with respect to time = (20 m/s) / (4s) = 5 m/s^2

confidence rating #$&*:

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Given Solution:

The rate of change of the speed with respect clock time is equal to the change in the speed divided by the change in the clock time. So we must ask, what is the change in the speed, what is the change in the clock time and what therefore is the rate at which the speed is changing with respect to clock time?

The change in speed from 5 meters/second to 25 meters/second is 20 meters/second. This occurs in a time interval lasting 4 seconds. The average rate of change of the speed is therefore (20 meters/second)/(4 seconds) = 5 meters / second / second. This means that on the average, per second, the speed changes by 5 meters/second.

STUDENT QUESTION

Would we not have s^2 since we are multiplying s by s?

INSTRUCTOR RESPONSE

That is correct. However in this question I've chosen not to confuse the issue by simplifying the complex fraction m/s/s, which we address separately.

To clarify, m / s / s means, by the order of operations, (m/s) / s, which is (m/s) * (1/s) = m/s^2.

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Self-critique (if necessary): OK

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Self-critique rating: OK

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Question: `q002. Explain in commonsense terms of the significance for an automobile of the rate at which its velocity changes. Do you think that a car with a more powerful engine would be capable of a greater rate of velocity change?

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Your solution:

If the rate at which a car’s velocity changes is larger, it will go faster in a shorter time period. Therefore, I do think that a car with a more powerful engine would be capable of a greater rate of velocity changes.

confidence rating #$&*:

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Given Solution:

A car whose velocity changes more rapidly will attain a given speed in a shorter time, and will be able to 'pull away from' a car which is capable of only a lesser rate of change in velocity. A more powerful engine, all other factors (e.g., weight and gearing) being equal, would be capable of a greater change in velocity in a given time interval.

STUDENT COMMENT:

The significance for an automobile of the rate at which its velocity changes is the amount of speed it takes to travel to a place in a certain amount of time. If one car is traveling along side another, and they are going to the same location the velocity will be how long it take this car to get to this location going at a speed other than the other car. If a car with a more powerful engine were to travel the same distance its velocity would be capable of a greater rate if increased speed occurred.

INSTRUCTOR RESPONSE:

It's necessary here to distinguish between velocity, which is a pretty intuitive concept, and rate of change of velocity, which is much less intuitive and less familiar.

An object can change velocity at a constant rate, from rest to a very high velocity. All the while the rate of change of velocity with respect to clock time can be unchanging.

So the rate of change of velocity with respect to clock time has nothing to do with how fast the object is moving, but rather with how quickly the velocity is changing.

Moving from one location to another, the displacement is the change in position. If the displacement is divided by the time required we get the average rate of change of position with respect to clock time, or average velocity.

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Self-critique (if necessary): OK

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Self-critique rating: OK

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Question: `q003. Explain how we obtain the units meters / second / second in our calculation of the rate of change of the car's speed.

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Your solution:

When we divide the change in velocity over the time interval in seconds we obtain the units meters / second / second in our calculation.

confidence rating #$&*:

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Given Solution:

When we divide the change in velocity, expressed in meters/second, by the duration of the time interval in seconds, we get units of (meters / second) / second, often written meters / second / second.

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Self-critique (if necessary): OK

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Self-critique rating: OK

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Question: `q004. The unit (meters / second) / second is actually a complex fraction, having a numerator which is itself a fraction. Such a fraction can be simplified by multiplying the numerator by the reciprocal of the denominator. We thus get (meters / second) * (1/ second). What do we get when we multiply these two fractions?

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Your solution:

We get meters / second^2

confidence rating #$&*:

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Given Solution:

Multiplying the numerators we get meters * 1; multiplying the denominators we get second * second, which is second^2. Our result is therefore meters * 1 / second^2, or just meters / second^2. If appropriate you may at this point comment on your understanding of the units of the rate of change of velocity.

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Self-critique (if necessary): I should have went into more detail over multiplying numerators by one another then the denominators by one another.

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Self-critique rating: 3

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Question: `q004. If the velocity of an object changes from 10 m/s to -5 m/s during a time interval of 5 seconds, then at what average rate is the velocity changing with respect to clock time?

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Your solution:

Change in velocity = -15 m/s

Time = 5 s

Average rate of velocity change with respect to clock time = (-15 m/s) / 5 s= -3 m/s^2

confidence rating #$&*:

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Given Solution:

We see that the velocity changes from 10 meters/second to -5 meters/second, a change of -15 meters / second, during a five-second time interval. A change of -15 m/s during a 5 s time interval implies an average rate of -15 m/s / (5 s) = -3 (m/s)/ s = -3 m/s^2. This is the same as (-3 m/s) / s, as we saw above. So the velocity is changing by -3 m/s every second.

STUDENT QUESTION

Do you have to do the step -3 m/s /s. Because I get the same answer not doing that.

INSTRUCTOR RESPONSE

Your solution read ' -5 m/s - 10 m/s = -15 m/s / 5 seconds = -3 m/s '.

Everything was right except the units on your answer. So the answer to you question is 'Yes. It is very important to do that step.'

The final answer in the given solution is '-3 m/s every second', which is not at all the same as saying just '-3 m/s'.

-15 m/s / (5 s) = -3 m/s^2, which means -3 m/s per s or -3 cm/s every second or -3 m/s/s.

-3m/s is a velocity. The question didn't ask for a velocity, but for an average rate of change of velocity.

-3 m/s per second, or -3 m/s every second, or -3 m/s/s, or -3 m/s^2 (all the same) is a rate of change of velocity with respect to clock time.

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Self-critique (if necessary): OK

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Self-critique rating: OK

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Question: `q005. You should have noted that velocity can be positive or negative, as can the change in velocity or the rate at which velocity changes. The average rate at which a quantity changes with respect to time over a given time interval is equal to the change in the quantity divided by the duration of the time interval. In this case we are calculating the average rate at which the velocity changes. If v represents velocity then we we use `dv to represent the change in velocity and `dt to represent the duration of the time interval. What expression do we therefore use to express the average rate at which the velocity changes?

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Your solution:

Ave rate of velocity change with respect to clock time = ‘dv / ‘dt

confidence rating #$&*:

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Given Solution:

The average rate would be expressed by [ave rate of velocity change with respect to clock time] = `dv / `dt. The expression [ave rate of velocity change with respect to clock time] is pretty cumbersome so we give it a name. The name we give it is 'average acceleration', abbreviated by the letter aAve. Using a to represent acceleration, write down the definition of average acceleration. The definition of average acceleration is aAve = `dv / `dt. Please make any comments you feel appropriate about your understanding of the process so far.

STUDENT COMMENT:

It’s average velocity so it would be aAve.

INSTRUCTOR RESPONSE:

Good, but note:

It’s average acceleration (not average velocity) so it would be aAve.

In most of your course acceleration is constant, so initial accel = final accel = aAve.

• In this case we can just use 'a' for the acceleration.

STUDENT QUESTION

If I understand this correctly, the average rate in which velocity changes is acceleration???? Where did average

acceleration fit into the problem, the problem asked for the average rate that velocity changed?

INSTRUCTOR RESPONSE

Acceleration is rate of change of velocity with respect to clock time. So the terms 'average acceleration' and 'average rate of change of velocity with respect to clock time' are identical. The term 'average rate of change of velocity' actually leaves off the 'with respect to clock time', but in the context of uniformly accelerated motion 'average rate of change of velocity' is understood to mean 'average rate of change of velocity with respect to clock time' .

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Self-critique (if necessary): I understand that this is the same as finding aAve (which is easier to type out!).

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Self-critique rating: 3

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Question: `q006. If a runner is moving at 6 meters / sec at clock time t = 1.5 sec after starting a race, and at 9 meters / sec at clock time t = 3.5 sec after starting, then what is the average acceleration of the runner between these two clock times?

If you can, answer the question as posed. If not, first consider the two questions below:

• What is the change `dv in the velocity of the runner during the time interval, and what is the change `dt in clock time during this interval?

• What therefore is the average rate at which the velocity is changing with respect to clock time during this time interval?

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Your solution:

‘dv = 9 m/s - 6 m/s = 3 m/s

‘dt = 3.5 s - 1.5 s = 2 s

Therefore, aAve = ‘dv / ‘dt = 3m/s / 2s = 1.5 m/s^2

confidence rating #$&*:

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Given Solution:

We see that the runner's velocity changes from 6 meters/second to 9 meters/second, a change of `dv = 9 m/s - 6 m/s = 3 m/s, during a time interval lasting from t = 1.5 sec to t = 3.5 sec.

The duration of the interval is `dt = 3.5 s - 1.5 s = 2.0 s.

The rate at which the velocity changes is therefore 3 m/s / (2.0 s) = 1.5 m/s^2.

STUDENT QUESTION

I'm not understanding why you have the power of 2 for.

INSTRUCTOR RESPONSE

When you divide m/s by s you do the algebra of the fractions and get m/s^2. You don't get m/s.

The distinction is essential:

• m/s^2 is a unit of acceleration.

• m/s is a unit of velocity.

Velocity and acceleration are two completely different aspects of motion.

The algebra of dividing m/s by s was given in a previous question in this document. In a nutshell, (m/s) / s = (m/s) * (1/s) = m/s^2.

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Self-critique (if necessary): OK

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Self-critique rating: OK

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Question: `q007. On a graph of velocity vs. clock time, we can represent the two events of this problem by two points on the graph. The first point will be (1.5 sec, 6 meters/second) and the second point will be (3.5 sec, 9 meters / sec). What is the run between these points and what does it represent?

What is the rise between these points what does it represent?

What does the slope between these points what does it represent?

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Your solution:

Run: Change in clock time (x) = 3.5 s - 1.5 s = 2 s

Rise: Change in velocity (y) = 9 m/s - 6 m/s = 3 m/s

Slope = rise / run

Slope = 3 m/s / 2s = 1.5 m/s^2

confidence rating #$&*:

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Given Solution:

The rise from the first point to the second is from 6 meters/second to 9 meters/second, or 3 m/s. This represents the change `dv in velocity. The run is from 1.5 seconds to 3.5 seconds, or 2 seconds, and represents the change `dt in clock time. The slope, being the rise divided by the run, is 3 m/s / (2 sec) = 1.5 m/s^2. This slope represents `dv / `dt, which is the average acceleration during the time interval. You may if you wish comment on your understanding to this point.

STUDENT QUESTION

Are we going to use the terms acceleration and average acceleration interchangeably in this course? I just want to make sure

I understand.

INSTRUCTOR RESPONSE

Good question.

The term 'acceleration' refers to instantaneous acceleration, the acceleration at a given instant.

The term 'average acceleration' refers to the average acceleration during an interval, calculated by subtracting initial from final velocity and dividing by the change in clock time.

If acceleration is uniform, it's always the same. If acceleration is uniform, then, it is unchanging. In that case the instantaneous acceleration at any instant is equal to the average acceleration over any interval.

So when acceleration is uniform, 'acceleration' and 'average acceleration' are the same and can be used interchangeably.

Acceleration isn't always uniform, so before using the terms interchangeably you should be sure you are in a situation where acceleration is expected to be uniform.

This can be visualized in terms of graphs:

The instantaneous acceleration can be represented by the slope of the line tangent to the graph of v vs. t, at the point corresponding to the specified instant.

The average acceleration can be represented by the average slope between two points on a graph of v vs. t.

If acceleration is uniform then the slope of the v vs. t graph is constant--i.e., the v vs. t graph is a straight line, and between any two points of the straight line the slope is the same. In this case the tangent line at a point on the graph is just the straight-line graph itself.

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Self-critique (if necessary): The slope is the same as aAve.

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Self-critique rating: 3

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Question: `q008. In what sense does the slope of any graph of velocity vs. clock time represent the acceleration of the object? For example, why does a greater slope imply greater acceleration?

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Your solution:

Slope and aAve use the same formula: change in velocity / change in clock time and, consequently, represent the same thing. Therefore, a greater slope will imply greater acceleration.

confidence rating #$&*:

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Given Solution:

Since the rise between two points on a graph of velocity vs. clock time represents the change in `dv velocity, and since the run represents the change `dt clock time, the slope represents rise / run, or change in velocity /change in clock time, or `dv / `dt. This is the definition of average acceleration.

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Self-critique (if necessary): OK

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Self-critique rating: OK

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Question: `q009. This is the same situation as in the preceding problem: an automobile coasts down a hill with a constant slope. At first its velocity increases at a very nearly constant rate. After it attains a certain velocity, air resistance becomes significant and the rate at which velocity changes decreases, though the velocity continues to increase. Describe a graph of velocity vs. clock time for this automobile (e.g., neither increasing nor decreasing; increasing at an increasing rate, a constant rate, a decreasing rate; decreasing at an increasing, constant or decreasing rate; the description could be different for different parts of the graph).

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Your solution:

Clock time is the x axis and velocity is the y axis. At first, the graph increases at a constant rate since the velocity is. Then, because of air resistance, the graph still increases but now it increases at a decreasing rate.

confidence rating #$&*:

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Given Solution:

Your graph should have velocity as the vertical axis and clock time as the horizontal axis. The graph should be increasing since the velocity starts at zero and increases. At first the graph should be increasing at a constant rate, because the velocity is increasing at a constant rate. The graph should continue increasing by after a time it should begin increasing at a decreasing rate, since the rate at which the velocity changes begins decreasing due to air resistance. However the graph should never decrease, although as air resistance gets greater and greater the graph might come closer and closer to leveling off. Critique your solution by describing or insights you had or insights you had and by explaining how you now know how to avoid those errors.

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Self-critique (if necessary): I never actually thought that the graph would decrease. However, I should have included how after time, the graph would become more level. I should be more specific when describing graphs in this manner.

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Self-critique rating: 3

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Question: `q010. An automobile coasts down a hill with a constant slope. At first its velocity increases at a very nearly constant rate. After it attains a certain velocity, air resistance becomes significant and the rate at which velocity changes decreases, though the velocity continues to increase. Describe a graph of acceleration vs. clock time for this automobile (e.g., neither increasing nor decreasing; increasing at an increasing rate, a constant rate, a decreasing rate; decreasing at an increasing, constant or decreasing rate; the description could be different for different parts of the graph).

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Your solution:

Clock time would be on the x axis and acceleration would be on the y axis. Since acceleration is constant at first, the graph isn’t increasing or decreasing. Due to air pressure, the graph begins decreasing after time which makes the graph look like it is closer and closer to leveling off.

confidence rating #$&*:

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Given Solution:

Your graph should have acceleration as the vertical axis and clock time as the horizontal axis. At first the graph should be neither increasing nor decreasing, since it first the acceleration is constant. Then after a time the graph should begin decreasing, which indicates the decreasing rate at which velocity changes as air resistance begins having an effect. An accurate description of whether the graph decreases at a constant, increasing or decreasing rate is not required at this point, because the reasoning is somewhat complex and requires knowledge you are not expected to possess at this point. However it is noted that the graph will at first decrease more and more rapidly, and then less and less rapidly as it approaches the t axis.

STUDENT QUESTION: Can you clarify some more the differences in acceleration and velocity?

INSTRUCTOR RESPONSE: ** Velocity is the rate at which position changes and the standard units are cm/sec or m/sec.

Acceleration is the rate at which velocity changes and its standard units are cm/s^2 or m/s^2.

Velocity is the slope of a position vs. clock time graph.

Acceleration is the slope of a velocity vs. clock time graph. **

STUDENT QUESTION:

In the problem it states that velocity continues to increase even though the rate at which velocity changes decreases.

I don’t understand your the slope will decrease if this is true. I can understand a diminish in velocity and time, but not a down turn of the slope, which is what your solution leans to.

INSTRUCTOR RESPONSE

Your thinking is good, but you need carefully identify what it is you're describing.

The question here concerns the acceleration vs. clock time graph, whereas most of your comments apply to the velocity vs. clock time graph.

Under these conditions the slope of the velocity vs. clock time graph will decrease, this will occur as long as the acceleration vs. clock time graph decreases, regardless of whether that decrease is at a constant, an increasing or a decreasing rate.

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Self-critique (if necessary): OK

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Self-critique rating: OK

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Question: `q011. Which changes its velocity more quickly, on the average, a car which speeds up from 50 mph to 60 mph in 5 seconds, or a car which speeds up from 5 mph to 25 mph in 6 seconds?

Be sure to explain your answer.

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Your solution:

A car that speeds up from 5 mph to 25 mph in 6 seconds changes its velocity more quickly because its aAve is larger than the car which speeds up from 50 mph to 60 mph in 5 seconds.

aAve = ‘dv / ‘dt

aAve = (25 m/h - 5 m/h) / (6 s) = 3.3 m/h*s

aAve = (60 m/h - 50 m/h) / (5 s) = 2 m/h*s

3.3 m/h*s > 2 m/h*s

Confidence rating: 3

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Question: `q012. What do we get if we divide 40 meters by 5 meters / second?

Your answer will include a number and its units. You should explain how you got the units of your answer.

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Your solution:

40 meters divided by 5 meters/second

40 m / (5 m/s)

To make this easier to understand the units we multiply the numerator by the reciprocal of the denominator. So, 40 m * (1 s / 5 m) = 8 m*s / m

confidence rating #$&*:

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Question: `q013. On a graph of velocity v vs. clock time t we have the two points (5 s, 10 m/s) and (10 s, 20 m/s). What is the average slope of the graph between these points, and what does this average slope mean?

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Your solution:

Slope = rise / run

Rise = change in y = 20 m/s - 10 m/s = 10 m/s

Run = change in x = 10 s - 5 s = 5 s

Slope = 10 m/s / 5s = (10 m/s) * (1 / 5s) = 5 m/s^2.

This means the same thing as aAve because the rise is the same as ‘dv and the run is the same as ‘dt and the overall formula for aAve = ‘dv / ‘dt

Confidence rating: 3

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Self-critique (if necessary):

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Self-critique rating:

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Question: `q011. Which changes its velocity more quickly, on the average, a car which speeds up from 50 mph to 60 mph in 5 seconds, or a car which speeds up from 5 mph to 25 mph in 6 seconds?

Be sure to explain your answer.

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Your solution:

A car that speeds up from 5 mph to 25 mph in 6 seconds changes its velocity more quickly because its aAve is larger than the car which speeds up from 50 mph to 60 mph in 5 seconds.

aAve = ‘dv / ‘dt

aAve = (25 m/h - 5 m/h) / (6 s) = 3.3 m/h*s

aAve = (60 m/h - 50 m/h) / (5 s) = 2 m/h*s

3.3 m/h*s > 2 m/h*s

Confidence rating: 3

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Question: `q012. What do we get if we divide 40 meters by 5 meters / second?

Your answer will include a number and its units. You should explain how you got the units of your answer.

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Your solution:

40 meters divided by 5 meters/second

40 m / (5 m/s)

To make this easier to understand the units we multiply the numerator by the reciprocal of the denominator. So, 40 m * (1 s / 5 m) = 8 m*s / m

confidence rating #$&*:

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Question: `q013. On a graph of velocity v vs. clock time t we have the two points (5 s, 10 m/s) and (10 s, 20 m/s). What is the average slope of the graph between these points, and what does this average slope mean?

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Your solution:

Slope = rise / run

Rise = change in y = 20 m/s - 10 m/s = 10 m/s

Run = change in x = 10 s - 5 s = 5 s

Slope = 10 m/s / 5s = (10 m/s) * (1 / 5s) = 5 m/s^2.

This means the same thing as aAve because the rise is the same as ‘dv and the run is the same as ‘dt and the overall formula for aAve = ‘dv / ‘dt

Confidence rating: 3

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Self-critique (if necessary):

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Self-critique rating:

#*&!

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Question: `q011. Which changes its velocity more quickly, on the average, a car which speeds up from 50 mph to 60 mph in 5 seconds, or a car which speeds up from 5 mph to 25 mph in 6 seconds?

Be sure to explain your answer.

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Your solution:

A car that speeds up from 5 mph to 25 mph in 6 seconds changes its velocity more quickly because its aAve is larger than the car which speeds up from 50 mph to 60 mph in 5 seconds.

aAve = ‘dv / ‘dt

aAve = (25 m/h - 5 m/h) / (6 s) = 3.3 m/h*s

aAve = (60 m/h - 50 m/h) / (5 s) = 2 m/h*s

3.3 m/h*s > 2 m/h*s

Confidence rating: 3

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Question: `q012. What do we get if we divide 40 meters by 5 meters / second?

Your answer will include a number and its units. You should explain how you got the units of your answer.

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Your solution:

40 meters divided by 5 meters/second

40 m / (5 m/s)

To make this easier to understand the units we multiply the numerator by the reciprocal of the denominator. So, 40 m * (1 s / 5 m) = 8 m*s / m

confidence rating #$&*:

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Question: `q013. On a graph of velocity v vs. clock time t we have the two points (5 s, 10 m/s) and (10 s, 20 m/s). What is the average slope of the graph between these points, and what does this average slope mean?

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Your solution:

Slope = rise / run

Rise = change in y = 20 m/s - 10 m/s = 10 m/s

Run = change in x = 10 s - 5 s = 5 s

Slope = 10 m/s / 5s = (10 m/s) * (1 / 5s) = 5 m/s^2.

This means the same thing as aAve because the rise is the same as ‘dv and the run is the same as ‘dt and the overall formula for aAve = ‘dv / ‘dt

Confidence rating: 3

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Self-critique (if necessary):

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Self-critique rating:

#*&!#*&!

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