Solve for Work to Stretch Spring 9in. Beyond Natural Length

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The discussion revolves around calculating the work required to stretch a spring beyond its natural length, specifically from 3 feet to 9 inches. Participants clarify the application of Hooke's law (F = kx) and the correct formula for work done on a spring, which is W = 0.5kx^2. The spring constant is derived from the given work for a 3-foot stretch, leading to the realization that 9 inches is a quarter of that length. After some confusion and recalculations, the correct approach is confirmed, emphasizing the importance of proper unit conversion and formula application. Ultimately, the original poster resolves their misunderstanding with guidance from others in the thread.
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Homework Statement


"If the work required to stretch a spring 3 ft beyond its natural length is 8 ft-lb, how much work W is needed to stretch it 9 in. beyond its natural length?"


Homework Equations


F=kx.


The Attempt at a Solution


F=kx so 8 = 3k. k= 8/3 then I use an integral of from 0 to .25 (9 inches is .25 of three feet) of (8/3)x. I do it manually and get 1/12. I'm wrong so I do it on a calculator to check for error and I get the same answer. I must be approaching the problem incorrectly, but how?
Thanks in advance
 
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"F=kx so 8 = 3k"
How did you do this??

You are being given the amount of work done to extend the spring by 3 ft. How did you use the force relation??
 


F = kx is Hooke's law describing the force to stretch a spring. What formula describes the work done when you stretch a spring? (Don't mix up force and work!)
 


Okay so I set 8 equal to the integral from 0 to 3 of the spring constant dx and then solve. How am I supposed to find the spring constant? Is there a better way?
 


rubecuber said:
Okay so I set 8 equal to the integral from 0 to 3 of the spring constant dx and then solve.
You would integrate the force*dx, thus kx dx (not just k dx).
How am I supposed to find the spring constant?
The spring constant is your only unknown.
Is there a better way?
Sure. Just look up the formula for the work done to stretch a spring. (Hint: It's the same formula for the energy stored in a stretched spring.) That way you won't have to do any integrating. :wink:
 


Great, so W= .5kx^2. Then 16=kx^2. Since the initial displacement is 3, 16/9 =k. Now knowing the spring constant to be 16/9 I can find the work to move it .25 of three feet as [(.5)(16/9)(.25^2) which gives me 1/18. But I'm still wrong? Did I make another stupid mistake?
 


And by the way, thank you for bearing with me
 


rubecuber said:
Great, so W= .5kx^2. Then 16=kx^2. Since the initial displacement is 3, 16/9 =k. Now knowing the spring constant to be 16/9 I can find the work to move it .25 of three feet as [(.5)(16/9)(.25^2) which gives me 1/18. But I'm still wrong? Did I make another stupid mistake?
9 inches = how many feet?
 


9 inches is 3/4 of a foot but I'm solving for three feet so that would makes nine inches a quarter of three feet. Am I really missing something this obvious?
 
  • #10


Wow I'm stupid. I just figured it out. Thanks for putting up with this.
 

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