How Fast Does the Block Travel After Leaving the Spring?

AI Thread Summary
The discussion focuses on the mechanics of a block being propelled by a spring on a frictionless surface and incline. When the block is compressed, it stores potential energy, which is converted to kinetic energy upon release. The block's speed can be calculated using energy conservation principles, equating the initial potential energy to kinetic energy. As the block ascends the incline, it loses kinetic energy, which transforms into gravitational potential energy. The participants explore the calculations needed to determine how far the block travels up the incline before sliding back down.
ledhead86
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A 2.00-kg block is pushed against a spring with negligible mass and force constant k = 400 N/m, compressing it 0.220 m. When the block is released, it moves along a frictionless, horizontal surface and then up a frictionless incline with slope of 37 degrees.
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What is the speed of the block as it slides along the horizontal surface after having left the spring?
 
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If you'd like help, you must show your attempted solution. Hint: Energy is conserved.
 
so I am thinkin in need to use the formula delta_k=-delta_u. Or k_1+U_1=k_2-K_1. So would K_1= (1/2)(2 kg)(0)^2, and U_1=(1/2)(400 N/m)(0.22 m)^2. k_2=(1/2)(2 kg)*V_2^2, and U_2=(1/2)(400 N/m)(0)^2.
 
Try to express what's going on in words:

When compressed the block has _______ energy and no _____ energy, and when released the ____ energy will be converted into ______ energy because now the block will be moving. Since the sufrace is frictionless the block will move at a _____ velocity having a KE equal to the initially stored _____ energy. It will then lose all this ______ energy to become gravitational _____ energy as it goes up the ramp.


After you fill that out correctly, it should be fairly easy to figure out what is equal to what, and so forth to plug in numbers.
 
When compressed the block has potential energy and no kinetic energy, and when released the potential energy will be converted into kinetic energy because now the block will be moving. Since the sufrace is frictionless the block will move at a constant velocity having a KE equal to the initially stored PE energy. It will then lose all this KE energy to become gravitational potential energy as it goes up the ramp.

So I had it setup correctly. Now how do I find how far the block travels up the incline before starting to slide back down ?
 
ledhead86 said:
So I had it setup correctly. Now how do I find how far the block travels up the incline before starting to slide back down ?
By finding the point where all the energy is transformed to gravitational PE.
 
OK. So I know -delta_U=F* D * sin(theta)
So. 9.68=F*D*sin(37). What is F. Is that 400N, the spring constant?
 
Never mind, I figured it out.
 
Did the fill inthe blanks help?
 

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