#$&* course PHY 201 30. Rotational Motion Question: `q001. Note that this assignment contains 5 questions.
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Given Solution: The change of 20 degrees in 5 seconds implies a rate of change of 20 degrees / (5 seconds) = 4 deg / sec. We call this the angular velocity of the object, and we designate angular velocity by the symbol `omega. &&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&& Self-critique (if necessary): ok ------------------------------------------------ Self-critique Rating #$&*:ent: ok ********************************************* Question: `q002. What is the average angular velocity of an object which rotates through an angle of 10 `pi radians in 2 seconds? YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY Your solution: The average angular velocity of an object which rotates through and angle of 10 pi radians in 2 seconds is found as follows: ‘omega = 10 pi radians/ 2 seconds When we solve for this it gives us a total of 5 pi radians/second. confidence rating #$&*: ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^
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Given Solution: The average angular velocity is equal to the angular displacement divided by the time required for that displacement, in this case giving us `omega = `d`theta / `dt = 10 `pi radians / 2 seconds = 5 `pi rad/s. STUDENT QUESTION I write 5’pi radians as 15.7 radians. I know they equal each other, but would you rather see me write it as 5’pi?? INSTRUCTOR RESPONSE 5 pi is exact and 15.7 is not. The rounding error in the approximation 15.7 might or might not be significant in a given situation. Also it's easy to see how 5 pi is related to the conditions of the problem; 15.7 is not as obviously related. So in this case the multiple-of-pi notation is preferable, though either would be acceptable. &&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&& Self-critique (if necessary): ok Self-critique rating ok ********************************************* Question: `q003. If an object begins with an angular velocity of 3 radians / sec and ends up 10 seconds later within angular velocity of 8 radians / sec, and if the angular velocity changes at a constant rate, then what is the average angular velocity of the object? In this case through how many radians this the object rotate and at what average rate does the angular velocity change? YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY Your solution: If our starting velocity is 3 radians/ second and ends up with an angular velocity of 8 radians/second. We take 8radians+ 3 radians which gives us a total of 11 radians. We take this value and divide it by two so that we can determine what our average angular velocity is. This gives us a value of 5.5 radians/second To find our the total displacement, we take our average angular velocity and multiply it by our time interval. This gives us 5.5 radians/second * 10 seconds which gives us 55 radians. The angular velocity changes at a rate that can be found by taking our average velocity and dividing it by our total time interval. This will give us a value of 0.55 radians/second. confidence rating 3
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Given Solution: Starting at 3 rad/s and ending up at 8 rad/s, the average angular velocity would be expected to be greater than the minimum 3 rad/s and less than the maximum 8 rad/s. If the angular velocity changes at a constant rate, we would in fact expect the average angular velocity to lie halfway between 3 rad/s and 8 rad/s, at the average value (8 rad/s + 3 rad/s) / 2 = 5.5 rad/s. Moving at this average angular velocity for 10 sec the object would rotate through 5.5 rad/s * 10 s = 55 rad in 10 sec. The change in the angular velocity during this 10 seconds is (8 rad/s - 3 rad/s) = 5 rad/s; this change takes place in 10 seconds so that the average rate at which the angular velocity changes must be ( 5 rad / sec ) / (10 sec) = .5 rad/s^2. This is called the average angular acceleration. Angular acceleration is designated by the symbol lpha. Since the angular velocity in this example changes at a constant rate, the angular acceleration is constant and we therefore say that &&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&& Self-critique (if necessary): ok Self-critique rating ok ********************************************* Question: `q004. If an object starts out with angular velocity 14 rad/s and accelerates at a rate of 4 rad/s^2 for 5 seconds, then at what rate is the object rotating after the 5 seconds? Through how many radians will the object rotate during this time? YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY Your solution: First we need to determine the rate that the object is rotating after the 5 second interval. We take 4 radians/s^2 * 5 seconds. This will give us a value of 20 radians/second. If we started at an angular velocity rate of 14 radians/s and ended up rotating at 20 radians/second, then we need to add these two values together. We have 14 radians/second + 20 radians/second = 34 radians/second as our ending angular velocity. From here we can find the average velocity by adding 14 radians/second + 34 radians/second. This gives us a total of 48 radians/ second. We then find the average velocity by diving 48 radians/ second by 2 and it gives us 24 radians/second. If we want to see how far the object rotated we take 24 radians/second and multiply it by our time period of 5 seconds. This gives us a value of 120 radians. confidence rating 3
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Given Solution: Changing angular velocity at the rate of 4 rad/s^2 for 5 sec the angular velocity will change by (4 rad/s^2) (5s) = 20 rad/s. Since the angular velocity was already 14 rad/s at the beginning of this time period, it will be 14 rad/s + 20 rad/s = 34 rad/s at the end of the time period. The uniform rate of change of angular velocity implies that the average angular velocity is (14 rad/s + 34 rad/s) / 2 = 24 rad/s. An average angular velocity of 24 radians/second, in 5 seconds the object will rotate through an angle `d`theta = (24 rad/s) ( 5 sec) = 120 rad. &&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&& Self-critique (if necessary): OK Self-critique rating OK ********************************************* Question: `q005. A rotating object starts with an angular velocity of 12 radians / second and accelerates through 60 radians in 6 seconds. What are its final angular velocity and angular acceleration? YYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYYY Your Solution: Ang v= 5 rad/s ? Ang accel=10 rad/s^2 confidence rating #$&*: ^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^^ &&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&&& Self-critique (if necessary):ok ------------------------------------------------ Self-critique rating:ok " Self-critique (if necessary): ------------------------------------------------ Self-critique rating: " Self-critique (if necessary): ------------------------------------------------ Self-critique rating: #*&!