Difference between revisions of "Skill Set 03.2"
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| − | ===3. | + | ===3. A ball rolls off the edge of a cliff. The instant it leaves the edge, it has an initial horizontal velocity of 17.3 m/s, and it strikes the ground after 1.56 seconds. What is the speed of impact?=== |
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| − | + | So in the vertical direction you can use v = u + at to solve for the final vertical velocity.<br><br> | |
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| + | v = 0 + (-9.81 m/s<sup>2</sup>)(1.56 s)<br> | ||
| + | v = -15.3036 m/s<br><br> | ||
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| + | Since the acceleration in the horizontal direction is 0, the initial velocity of 17.3 m/s is also the final velocity. With both our horizontal and vertical final velocities, we can find the magnitude of the impact by using the Pythagorean Theorem.<br><br> | ||
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| + | 17.3<sup>2</sup> + -15.3<sup>2</sup> = c<sup>2</sup><br> | ||
| + | c = '''23.1 m/s''' | ||
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[[#top | Table of Contents]] | [[#top | Table of Contents]] | ||
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===4. Question=== | ===4. Question=== | ||
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Revision as of 11:35, 12 February 2009
Main Page > IB Physics Skill Sets > Skill Set 03.2
Contents
- 1 1. A ball rolls off the edge of a cliff. The instant it leaves the edge, it has an initial horizontal velocity of 17.3 m/s, and it strikes the ground after 1.56 seconds. How high is the cliff?
- 2 2. A ball rolls off the edge of a cliff. The instant it leaves the edge, it has an initial horizontal velocity of 17.3 m/s, and it strikes the ground after 1.56 seconds. How far from the base of the cliff does the ball land?
- 3 3. A ball rolls off the edge of a cliff. The instant it leaves the edge, it has an initial horizontal velocity of 17.3 m/s, and it strikes the ground after 1.56 seconds. What is the speed of impact?
- 4 4. Question
- 5 5. Question
1. A ball rolls off the edge of a cliff. The instant it leaves the edge, it has an initial horizontal velocity of 17.3 m/s, and it strikes the ground after 1.56 seconds. How high is the cliff?
Using s = ut + 1/2at2:
s = 0 + 1/2(9.81)(1.56)2 = 11.936 m
2. A ball rolls off the edge of a cliff. The instant it leaves the edge, it has an initial horizontal velocity of 17.3 m/s, and it strikes the ground after 1.56 seconds. How far from the base of the cliff does the ball land?
We will again use s = ut + 1/2at2, but since horizontal acceleration = 0, the equation becomes s = ut.
s = ut = (17.3)(1.56) = 26.988 m
3. A ball rolls off the edge of a cliff. The instant it leaves the edge, it has an initial horizontal velocity of 17.3 m/s, and it strikes the ground after 1.56 seconds. What is the speed of impact?
So in the vertical direction you can use v = u + at to solve for the final vertical velocity.
v = 0 + (-9.81 m/s2)(1.56 s)
v = -15.3036 m/s
Since the acceleration in the horizontal direction is 0, the initial velocity of 17.3 m/s is also the final velocity. With both our horizontal and vertical final velocities, we can find the magnitude of the impact by using the Pythagorean Theorem.
17.32 + -15.32 = c2
c = 23.1 m/s
4. Question
Solution goes here
5. Question
Solution goes here
