Hooke's Law: Difference between revisions

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This resource page addresses Hooke's Law. (Claimed by brapsas3)
This resource page addresses Hooke's Law.  
 
Claimed by Navila Akther Spring 2018


==The Main Idea==
==The Main Idea==


'''Hooke's law''' is a principle that states that some force F needed to compress or extend a spring by some distance s is directly proportional to that distance.   
'''Hooke's law''' or the law of elasticity  named after 17th century Physicist Robert Hooke is the law that states the Force acting on an elastic object is equal to k*x. In other words, the law states that the force required to stretch an elastic object such as a spring is directly proportional to how far the object stretches.  The force may be applied to the spring by stretching, compressing, squeezing, bending, or twisting.  The value of k depends on the material, its dimensions, and shape.  Hooke's law may also be expressed in terms of stress and strain.  Stress is the force applied per unit area of a material and strain is the relative change in shape or size due to a force acting on it.   
 
===Units of Measurement===
 
The SI units of Force is N (newtons) or kg·m/s<sup>2</sup> (kilograms times meters per second squared) and for displacement is m (meters). The SI units for the spring constant k is N/m (newtons per meter) or kg/s<sup>2</sup> (kilograms per second squared).


===A Mathematical Model===
===A Mathematical Model===


This system can be expressed as F = ks, where k is some constant factor that is characteristic of the spring.
This system can be expressed as F = ks, where k is a constant specific to that material and s is the stretch of the object.
In some cases it will be expressed as F=-ks, in this case F is the restoring force that causes elastic materials to return to their original dimensions rather than the applied force.


===A Computational Model===
===A Computational Model===
Line 15: Line 22:
==History==
==History==


Hooke's law is named after the 17th century British physicist [[Robert Hooke]]. Hooke first publicly 'stated' the law in 1660, initially concealing it in the Latin anagram "ceiiinosssttuv," which represented the phrase ''Ut tensio, sic vis'' — "As the extension, so the force." However, this solution was not published until 1678.   
Hooke's law is named after the 17th century British physicist Robert Hooke. He first stated the law in 1660 as a Latin anagram then published the solution in 1678 named ut tensio, sic vis which translated means "the extension is proportional to the force." Hooke discovered this law when there was a need to navigate trade routes and avoid dangerous waters effectively.  He came up with the idea of using a coiled spring in a watch to tell timeAlthough he wasn't the first to complete the spring based watch, he is credited with the discovery of the relationship of the spring as it is believed to be his idea first.


Hooke's equation also applies to many other situations where some elastic body is being deformed, and the ball-spring model is often used as the basis for many contact interactions.
==Real Life Applications==
In addition to springs, Hooke’s Law also applies in many other situations where an elastic body is deformed. Some examples include inflating a balloon and pulling on a rubber band to measuring the amount of wind force is needed to make a tall building bend and sway. This law has had many real life applications, such as the creation of a balance wheel, the mechanical clock, the portable timepiece, the spring scale and the manometer. Also, because it is a close approximation of all solid bodies, it is applicable to numerous branches of science and engineering. These include the disciplines of seismology, molecular mechanics and acoustics.


==Problem Set==
==Problem Set==
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===Question 1===
===Question 1===
QUESTION:
<br>What is the force required to stretch a spring whose constant value is 100 N/m by an amount of 0.50 m?
SOLUTION:
<br>Using the formula F=ks solve the question
<br>  F=force(N)
<br>  k=force constant(N/m)
<br>  s=stretch or compression(m)


F=(100)(0.50)
[[File:Hooke1.jpg]]
F=50 N


===Question 2===
===Question 2===
QUESTION:
<br>If 223 N stretches a spring 12.7 cm, how much stretch can we expect to result from a force of 534 N?


SOLUTION:
[[File:Hooke2.jpg]]
<br>Set up a proportionality statement
<br>223N/534N=12.7cm/x
<br>Solve
<br>x=30.4cm


===Question 3===
===Question 3===
QUESITON:
 
 
<br>When the weight hung on a spring is increased by 60 N, the new stretch is 15 cm more. If the original stretch is 5 cm, what is the original weight?
<br>When the weight hung on a spring is increased by 60 N, the new stretch is 15 cm more. If the original stretch is 5 cm, what is the original weight?


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[http://www.introduction-to-physics.com/elasticity-problems.html]
[http://www.introduction-to-physics.com/elasticity-problems.html]
[https://www.teachengineering.org/collection/van_/lessons/van_cancer_lesson2/stress_strain_hookes_law_key.pdf]
<br>[https://www.teachengineering.org/collection/van_/lessons/van_cancer_lesson2/stress_strain_hookes_law_key.pdf]
[http://hyperphysics.phy-astr.gsu.edu/hbase/permot2.html Elasticity and Hooke's Law]
<br>[http://hyperphysics.phy-astr.gsu.edu/hbase/permot2.html]
Invention by Design: How Engineers Get from Thought to Thing. Cambridge, MA: Harvard University Press
<br>Invention by Design: How Engineers Get from Thought to Thing. Cambridge, MA: Harvard University Press


[[Category:Contact Interactions]]
[[Category:Contact Interactions]]

Latest revision as of 22:43, 18 April 2018

This resource page addresses Hooke's Law.

Claimed by Navila Akther Spring 2018

The Main Idea

Hooke's law or the law of elasticity named after 17th century Physicist Robert Hooke is the law that states the Force acting on an elastic object is equal to k*x. In other words, the law states that the force required to stretch an elastic object such as a spring is directly proportional to how far the object stretches. The force may be applied to the spring by stretching, compressing, squeezing, bending, or twisting. The value of k depends on the material, its dimensions, and shape. Hooke's law may also be expressed in terms of stress and strain. Stress is the force applied per unit area of a material and strain is the relative change in shape or size due to a force acting on it.

Units of Measurement

The SI units of Force is N (newtons) or kg·m/s2 (kilograms times meters per second squared) and for displacement is m (meters). The SI units for the spring constant k is N/m (newtons per meter) or kg/s2 (kilograms per second squared).

A Mathematical Model

This system can be expressed as F = ks, where k is a constant specific to that material and s is the stretch of the object. In some cases it will be expressed as F=-ks, in this case F is the restoring force that causes elastic materials to return to their original dimensions rather than the applied force.

A Computational Model

A vpython visualization of Hooke's Law

History

Hooke's law is named after the 17th century British physicist Robert Hooke. He first stated the law in 1660 as a Latin anagram then published the solution in 1678 named ut tensio, sic vis which translated means "the extension is proportional to the force." Hooke discovered this law when there was a need to navigate trade routes and avoid dangerous waters effectively. He came up with the idea of using a coiled spring in a watch to tell time. Although he wasn't the first to complete the spring based watch, he is credited with the discovery of the relationship of the spring as it is believed to be his idea first.

Real Life Applications

In addition to springs, Hooke’s Law also applies in many other situations where an elastic body is deformed. Some examples include inflating a balloon and pulling on a rubber band to measuring the amount of wind force is needed to make a tall building bend and sway. This law has had many real life applications, such as the creation of a balance wheel, the mechanical clock, the portable timepiece, the spring scale and the manometer. Also, because it is a close approximation of all solid bodies, it is applicable to numerous branches of science and engineering. These include the disciplines of seismology, molecular mechanics and acoustics.

Problem Set

A few sample problems and their solutions.

Question 1

Question 2

Question 3


When the weight hung on a spring is increased by 60 N, the new stretch is 15 cm more. If the original stretch is 5 cm, what is the original weight?

SOLUTION:
Click Here

See also

Robert Hooke
Spring Potential Energy
Tension
Young's Modulus

Further reading

Elasticity and Hooke's Law

What is Hooke's Law?

Encyclopedia Brittanica: Hooke's Law

External links

Doodle Science provides a brief run through of Hooke's Law.

An alternate explanation of Hooke's Law with a sample problem set.

References

[1]
[2]
[3]
Invention by Design: How Engineers Get from Thought to Thing. Cambridge, MA: Harvard University Press