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Unformatted text preview: homework 32 – NOORANI, ZOHEB 1 Latest unpenalized work: Apr 16 2008 Wednesday 04:00 (after this date you can not make a perfect score). Work cutoff: Apr 17 2008, 4:00 am. Question 1, chap 15, sect 2. part 1 of 1 10 points Simple harmonic motion can be described using the equation y = A sin( k x ω t φ ) . Hint: sin( θ ) = sin θ . Consider the simple harmonic motion given by the figure. + AA y π 2 π 3 π 4 π At position x = 0, we have ω t This motion is described by 1. y = A cos parenleftbigg ω t + 3 π 2 parenrightbigg 2. y = A tan parenleftbigg ω t + 3 π 2 parenrightbigg 3. y = A sin parenleftBig ω t + π 2 parenrightBig 4. y = A sin parenleftbigg ω t + 3 π 2 parenrightbigg 5. y = A sin parenleftBig ω t π 2 parenrightBig 6. y = A cos parenleftBig ω t + π 2 parenrightBig 7. y = A cos parenleftBig ω t π 2 parenrightBig 8. y = A tan parenleftBig ω t π 2 parenrightBig 9. y = A tan parenleftBig ω t + π 2 parenrightBig Question 2, chap 15, sect 2....
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This note was uploaded on 09/16/2009 for the course PHY 303K taught by Professor Turner during the Spring '08 term at University of Texas.
 Spring '08
 Turner
 Simple Harmonic Motion, Work

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