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Deck of Cards
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Card
labelPart A

Part A

Suppose a person with a weight of 686 N is in an elevator which is descending at a constant rate of 1.0 m/s and speeding up at a rate of 3.0 m/s2. What is the person's apparent weight?

Solution

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System:
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Person as a .

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Interactions:
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External influences from the earth (gravity) and the floor of the elevator (normal force).

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Model:
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.

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Approach:

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The physical picture and free body diagram for the person is: {table}{tr}{td}!Apparently I've Lost Weight^elevator1.png!{td}{td}!elevator2.png!{td}{tr} {tr}{th}Physical Picture{th}{th}Free Body Diagram{th}{tr}{table} which leads to the form of [Newton's 2nd Law|Newton's Second Law] for the _y_ direction: {latex}\begin{large}\[ \sum F_{y} = N - mg = ma_{y} \]\end{large}{latex} In our coordinates, the acceleration of the person is _a_~y~ = -3.0 m/s{color:black}^2^{color}, giving: {latex}\begin{large}\[ N = ma_{y} + mg = \mbox{476 N} \]\end{large}{latex} {tip}This result for the normal force is less than the person's usual weight, in agreement with our expectation that the person should feel lighter while accelerating downward.{tip}
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*Approach:*
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Card
labelPart B
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h2. Part B

Suppose a person with a weight of 686 N is in an elevator which is ascending at a constant rate of 1.0 m/s and slowing down at a rate of 3.0 m/s{color:black}^2^{color}.  What is the person's apparent weight?

h4. Solution

*System, Interactions and Model:* As in Part A.

*Approach:*  As in Part A, the acceleration is negative in our coordinates.  The free body diagram is also the same, and so we find the same result:

{latex}\begin{large}\[ N = \mbox{476 N} \]\end{large}{latex}
Card
labelPart C
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h2. Part C

Suppose a person with a weight of 686 N is in an elevator which is ascending at a constant rate of 1.0 m/s and speeding up at a rate of 3.0 m/s{color:black}^2^{color}.  What is the person's apparent weight?

h4. Solution

*System, Interactions and Model:*  As in Part A.

*Approach:*  The free body diagram and form of Newton's 2nd Law is the same as in Part A, except that the relative size of the forces will be different.  We can see this by writing Newton's 2nd Law for the y-direction:

{latex}\begin{large}\[ N = ma_{y} + mg \]\end{large}{latex}

This time, however, the acceleration is positive (_a_~y~ = + 3.0 m/s{color:black}^2^{color}) giving:

{latex}\begin{large}\[ N = \mbox{896 N} \] \end{large}{latex}

{tip}Upward acceleration increases the perceived weight.{tip}