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'''Claimed by Alyssa Jackson Spring 2017 (09 April 2017)'''
Claimed by '''Jason Lee (Fall 2023)'''
 
'''Edited by Nagela Nukuna Fall 2017 (28 December 2017)'''
 
'''Edited by Darye Ji Fall 2018 (25 November 2018)'''
==The Main Idea==
==The Main Idea==


The Right-Hand Rule is an easy way to find the '''direction''' of a cross product interaction before doing the math. For any equation involving a cross product, the right hand rule is a valuable tool for finding the direction. There are two primary ways of using the right hand rule.  
The Right-Hand Rule is an easy way to find the '''direction''' of a cross product interaction before doing the math. For any equation involving a cross product, the right hand rule is a valuable tool for finding the direction. There are two primary ways of using the right hand rule.  


1) The first method is to use your entire right hand. In the example below, the velocity is pointing north up (+y) and the magnetic field is pointing to the left (-x). We place our hand with our thumb sticking up along the velocity because that is the first variable in F= qv X B. Next, we curl our fingers towards the magnetic field. Our thumb is pointing outwards toward us; therefore, the direction of magnetic force is out of the page (+z). It is important to note that this only applies to positive charges. For negative charges, this direction is opposite.
2) The second method also uses your entire right hand to find the direction of the conventional current from your magnetic field. In this method, you use your thumb to point in the direction of the magnetic field, and the direction your other fingers point is the direction of the conventional current. In this specific example, the direction of the magnetic field is out of the page (+z), meaning that the conventional current goes in the counter-clockwise direction. Vice versa, if the magnetic field is into the page (-z), then the conventional current would be in the clockwise direction.


''Right-Hand Rule for Force''
1) The first method is to use your entire right hand. Make shape of a high five with your right hand with your right hand, with your thumb sticking out perpendicular to the direction of your fingers. Align your hand with the first vector listed in the cross product. Then, curl your fingers toward the second vector listed in the cross product without moving your palm. You must rotate your hand to whatever orientation it requires for this to be possible, while keeping your thumb perpendicular to your fingers through the entire process. Your thumb will point in the direction of the cross product. In the example depicted below the cross product points "out" of the page, the same direction as the thumb.


[[File:RightHand1.png]]
[[File:RightHand1.png]]
[[File:RH2.png]]
[[File:RH2.png]]


===A Mathematical Model===


The Right-Hand Rule is mathematically modeled by the cross product:
2) The second method is extremely similar to the first. Start by making a thumbs up, and maintain your thumb extended in this way through the entire process. Extend your index (pointer) finger and align it with the first vector in the cross product. Extend your middle finger and align it with the second vector while keeping your ring and pinkie fingers closed. This will force you to orient your hand in such a way that your thumb will point in the direction of the cross product. This is demonstrated below.
:<math>\mathbf{u\times v}=(u_2v_3sin\mathbf{i}+u_3v_1\mathbf{j}+u_1v_2\mathbf{k})
 
[[File:Right hand rule cross product.svg|Right hand rule cross product]]
 
==A Mathematical Model==
 
The Right-Hand Rule is a technique for modeling the direction of a cross product:
:<math>\mathbf{u\times v}=(u_2v_3\mathbf{i}+u_3v_1\mathbf{j}+u_1v_2\mathbf{k})
-(u_3v_2\mathbf{i}+u_1v_3\mathbf{j}+u_2v_1\mathbf{k})
-(u_3v_2\mathbf{i}+u_1v_3\mathbf{j}+u_2v_1\mathbf{k})
</math>
</math>
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''The cross product can also be solved in the following form (using '''u''' and '''v'''):''
''The cross product can also be solved in the following form (using '''u''' and '''v'''):''
:<math>\mathbf{u} \times \mathbf{v} = \left\| \mathbf{u} \right\| \left\| \mathbf{v} \right\| \sin (\theta)</math>
:<math>| \mathbf{u} \times \mathbf{v} | = | \mathbf{u} | | \mathbf{v} | \sin (\theta)</math>


===Cross Product: Alternate Method 1===
===Cross Product: Alternate Method 1===


If you are like me and for some particular reason it was hard to grasp the traditional method of carrying out a cross product, fear not! There is an alternate method that will lead you to the same answer in a more an intuitive manner.
Alternate methods for computing a cross product exist, though this one is limited to cross products of 3 dimensions.


This is a method I picked up a while back and has been proving quite useful since.[[1]]
Structure the three components in a circle and assign a clockwise direction around this circle.  


It involves structuring the three components in a circle and assigning a clockwise direction around this circle.
Crossing one component with another component that can be reached clockwise on on the next move around the circle yields a vector third direction.  
 
 
Every time you cross one component with another component that can be reached clockwise on on the next move around the circle, you know that you will have a positive direction in the direction of the third direction.  


This can be seen in the picture below.  
This can be seen in the picture below.  


[[File:CircleMethod2.png]]
[[File:CircleMethod2.png]]


In order to quickly solve a cross product using this alternate method, see the following example.
In order to quickly solve a cross product using this alternate method, see the following example.
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[[File:CircleCR3.png]]
[[File:CircleCR3.png]]


[[1]] '''NOTE:''' I did not devise this method, but simply learned it.
Note: order matters in cross products. When crossing two vectors in the counter-clockwise direction the resulting third vector is negative.


===Cross Product: Alternate Method 2===
[[File:Wikicrossprod.png]]


===Cross Product: Alternate Method 3===


===Cross Product: Alternate Method 2===
If you're personally more of a math person, and you have taken linear algebra or have done determinants before, cross products are essentially taking determinants of a 3x3 matrix.  
[[File:Wikicrossprod.png]]


===Another Alternate Right Hand Rule===
1. For the first row, write down '''i, j, k'''. These are your directional components with '''"i"''' representing the +x direction, '''"j"''' the +y direction, and '''"k"''' the +z direction.


If you didn't understand the first two right hand rules, hopefully this third one will be the charm.  
2. If you are crossing '''a x b''', write down the a components in the second row and b components in the third row corresponding to the x,y,z direction. If for example, ax is in the -x direction, simply make the value of ax negative.


Let us take a simple physics problem as an example.
3. Then take the determinant of the 3x3 matrix which is shown below. Don't forget that the second term ('''j''') must be negative.
We know that <math>\mathbf{F} = q\mathbf{v} \times \mathbf{B}</math>


Instead of using our right hand, we can just use the method pictured below to find the direction of the magnetic force given the direction of the moving particle and the magnetic field.  
[[File:Crossproductdet.png]]


[[File:fvb4.png]]
==A Computational Model==


===A Computational Model===
For a computational model, the Right-Hand Rule is just an easy way to determine the direction of the result of a cross product, but the model below allows you to change the two initial vectors, which the cross product will react to, and it will show that the right hand rule is true for any set of vectors that are not facing the same direction.
(Note: Just because you can determine the direction of a cross product using the RHR does '''NOT''' mean that every equation involving cross products will end up with that direction. Please make sure to account for any changes in sign, magnitude, or direction when solving cross product equations.


The cross product is used to describe many magnetic interactions, for example, magnetic field created by a moving charge or a current and magnetic force on a particle by a magnetic field. Because of this, using the right hand rule, to determine the direction of a cross product, can be a useful to check behind the math for sign errors.
<html>
<iframe src="https://trinket.io/embed/glowscript/746a15552f" width="100%" height="356" frameborder="0" marginwidth="0" marginheight="0" allowfullscreen></iframe>
<html>


Follow the chart bellow to find which fingers correspond to which vectors.
==Examples==


:<math>\mathbf{A\times B}=\mathbf{C}</math>
===Magnetic Field for a Point Charge (Bio-Savart Law)===


{| class=wikitable
The equation written in pink in the picture below is the Bio-Savart Rule for a single charged particle which will be later explained in further chapters. As you can see, there is a cross product within the equation, and it can be a little tricky finding the direction of the magnetic field.
|-  
! Vector !! Right-hand !! Right-hand (alternative)
|-
| A || First or index || Thumb || Palm
|-
| B || Second finger or palm || First or index || First finger
|-
| C || Thumb || Second finger or palm || Thumb
|}


Another method for determining the direction of the product orthogonal vector is to place the fingers of your right hand in the direction of the first vector(A). Curl your fingers in the direction of the second vector(B), effectively making the "thumbs up" sign in whichever direction the thumb happens to be pointing. The resulting vector(C) is in the direction in which your thumb is now pointing.
Using the Right-Hand rule (alternative 2):
    1. place your palm in the direction of velocity since it is velocity crossed rhat
          2. curl your finger to the direction of rhat
                3. Point your thumb up( perpendicular from your fingers) and this direction is the direction of your magnetic field, ''assuming that the charge is positive''.
                    If your charge is negative, then simply flip the direction of your thumb.


==Examples==
In the picture below, the direction of the magnetic field would be out of the page (+z) if the particle is positively charged. If the charge was an electron (negatively charged), then the direction of the magnetic field would be into the page (-z).
[[File:BioSavartUno1.png]]
[[File:Screen Shot 2018-11-25 at 23.13.22.png]]


===Magnetic Force on a Moving Particle===
===Magnetic Force on a Moving Particle===
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# The thumb points in the direction of magnetic force F.
# The thumb points in the direction of magnetic force F.


For example, for a positively charged particle moving to the right, in a region where the magnetic field points up, the resultant force points out of the page.
For example, for a positively charged particle moving to the right, in a region where the magnetic field points up, the resultant force points out of the page (+z). If it was the same situation, but the particle was negatively charged, the you would flip the direction of your thumb, and the resultant force points into the page (-z).


===Magnetic Field made by a Current===
===Magnetic Field made by a Current===
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1. How is the topic connected to something you are interested in?
1. How is the topic connected to something you are interested in?


I am interested in being able to find how induced currents are generated from the presence of other particles or electric fields. Using the Right-Hand-Rule is actually a simple application of complex Physics principles. A lot of what we learn is Physics 2 is abstract knowledge, so it is interesting to think of these concepts in a more tangible form.
It's honestly a valuable tool in determining the direction of cross-products which allows me to see if my math is correct. For example, to figure out the direction of the conventional current that flows in a wire whose magnetic field changes the direction of a compass, I would have the use the right-hand rule to help me out.
 
If a charged particle is moving at a certain speed and is under a magnetic field, the right-hand rule can be used to determine the force the particle will experience.  


2. How is it connected to your major?
2. How is it connected to your major?


As an Industrial Engineering major, knowing how to calculate cross products is not directly related to my major, nor my Supply Chain concentration. However, being able to understand how magnetic fields, currents, charges of particles, force, and electric fields all connect to each other is an important concept to understand both in college and in the real world. Physics principles, specifically cross product, are used quite frequently in shortest path problems.
As a computer engineering major, it is very relevant in my physics class, and although we don't see the right hand rule in action first-hand, I know it plays a critical role in what we do when designing circuits and can be used to explain things at a molecular level.


3. Is there an industrial application?
3. Is there an industrial application?


When creating wheels, knowledge of the cross product controls how the wheel is built and fixed when it is broken. Whenever two objects work in tandem or against each other, maximum impact is produced when the two vectors are perpendicular (because <math>\sin (90)=1</math>).
Using sails for a boat deals with cross-product because when the wind blows, the sails experience angular momentum '''L = I x w'''


==History==
==History==
[[File:John Ambrose Fleming 1890.png|thumb|left| John Ambrose Fleming 1890]]
John Ambrose Fleming is credited with devising the right-hand rule. He was a professor at the University College, London where he was liked by many of his students. Fleming devised the right hand rule (though Fleming's original version used the left hand) in order to make relationships between current, its magnetic field, and the electromotive force easier to visualize and understand.
Though he was best known for his right-hand rule in which he connected the observation vector, magnetic field, and current, he also had a left-hand rule as well which he used for motors. It connected force, magnetic field, and current.


John Ambrose Fleming is credited with devising the right hand rule. He was a professor at the University College, London where he was liked by many of his students. He taught them how to easily determine the direction of a current. He made directional relationships easier between current, its magnetic field, and the electromotive force.
[[File:LeftHandOutline.png|thumb|Fleming's original rule]]


==See Also==
==See Also==
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--[[User:Cjacobson7|Cjacobson7]] ([[User talk:Cjacobson7|talk]]) 13:45, 10 November 2015 (EST)


[[Category:Fields]]
[[Category:Fields]]

Latest revision as of 10:47, 27 November 2023

Claimed by Jason Lee (Fall 2023)

The Main Idea

The Right-Hand Rule is an easy way to find the direction of a cross product interaction before doing the math. For any equation involving a cross product, the right hand rule is a valuable tool for finding the direction. There are two primary ways of using the right hand rule.


1) The first method is to use your entire right hand. Make shape of a high five with your right hand with your right hand, with your thumb sticking out perpendicular to the direction of your fingers. Align your hand with the first vector listed in the cross product. Then, curl your fingers toward the second vector listed in the cross product without moving your palm. You must rotate your hand to whatever orientation it requires for this to be possible, while keeping your thumb perpendicular to your fingers through the entire process. Your thumb will point in the direction of the cross product. In the example depicted below the cross product points "out" of the page, the same direction as the thumb.


2) The second method is extremely similar to the first. Start by making a thumbs up, and maintain your thumb extended in this way through the entire process. Extend your index (pointer) finger and align it with the first vector in the cross product. Extend your middle finger and align it with the second vector while keeping your ring and pinkie fingers closed. This will force you to orient your hand in such a way that your thumb will point in the direction of the cross product. This is demonstrated below.

Right hand rule cross product

A Mathematical Model

The Right-Hand Rule is a technique for modeling the direction of a cross product:

[math]\displaystyle{ \mathbf{u\times v}=(u_2v_3\mathbf{i}+u_3v_1\mathbf{j}+u_1v_2\mathbf{k}) -(u_3v_2\mathbf{i}+u_1v_3\mathbf{j}+u_2v_1\mathbf{k}) }[/math]


The cross product can also be solved in the following form (using u and v):

[math]\displaystyle{ | \mathbf{u} \times \mathbf{v} | = | \mathbf{u} | | \mathbf{v} | \sin (\theta) }[/math]

Cross Product: Alternate Method 1

Alternate methods for computing a cross product exist, though this one is limited to cross products of 3 dimensions.

Structure the three components in a circle and assign a clockwise direction around this circle.

Crossing one component with another component that can be reached clockwise on on the next move around the circle yields a vector third direction.

This can be seen in the picture below.

In order to quickly solve a cross product using this alternate method, see the following example.

Note: order matters in cross products. When crossing two vectors in the counter-clockwise direction the resulting third vector is negative.

Cross Product: Alternate Method 2

Cross Product: Alternate Method 3

If you're personally more of a math person, and you have taken linear algebra or have done determinants before, cross products are essentially taking determinants of a 3x3 matrix.

1. For the first row, write down i, j, k. These are your directional components with "i" representing the +x direction, "j" the +y direction, and "k" the +z direction.

2. If you are crossing a x b, write down the a components in the second row and b components in the third row corresponding to the x,y,z direction. If for example, ax is in the -x direction, simply make the value of ax negative.

3. Then take the determinant of the 3x3 matrix which is shown below. Don't forget that the second term (j) must be negative.

A Computational Model

For a computational model, the Right-Hand Rule is just an easy way to determine the direction of the result of a cross product, but the model below allows you to change the two initial vectors, which the cross product will react to, and it will show that the right hand rule is true for any set of vectors that are not facing the same direction. (Note: Just because you can determine the direction of a cross product using the RHR does NOT mean that every equation involving cross products will end up with that direction. Please make sure to account for any changes in sign, magnitude, or direction when solving cross product equations.

<html> <iframe src="https://trinket.io/embed/glowscript/746a15552f" width="100%" height="356" frameborder="0" marginwidth="0" marginheight="0" allowfullscreen></iframe> <html>

Examples

Magnetic Field for a Point Charge (Bio-Savart Law)

The equation written in pink in the picture below is the Bio-Savart Rule for a single charged particle which will be later explained in further chapters. As you can see, there is a cross product within the equation, and it can be a little tricky finding the direction of the magnetic field.

Using the Right-Hand rule (alternative 2):

    1. place your palm in the direction of velocity since it is velocity crossed rhat
          2. curl your finger to the direction of rhat
                3. Point your thumb up( perpendicular from your fingers) and this direction is the direction of your magnetic field, assuming that the charge is positive.
                    If your charge is negative, then simply flip the direction of your thumb.

In the picture below, the direction of the magnetic field would be out of the page (+z) if the particle is positively charged. If the charge was an electron (negatively charged), then the direction of the magnetic field would be into the page (-z).

Magnetic Force on a Moving Particle

[math]\displaystyle{ \mathbf{F} = q\mathbf{v} \times \mathbf{B} }[/math]

The direction of the cross product may be found by application of the right hand rule as follows:

  1. The index finger points in the direction of the momentum vector qv.
  2. The middle finger points in the direction of the magnetic field vector B.
  3. The thumb points in the direction of magnetic force F.

For example, for a positively charged particle moving to the right, in a region where the magnetic field points up, the resultant force points out of the page (+z). If it was the same situation, but the particle was negatively charged, the you would flip the direction of your thumb, and the resultant force points into the page (-z).

Magnetic Field made by a Current

[math]\displaystyle{ \mathbf{B} = \frac{\mu_0I}{4\pi}\int_{\mathrm{wire}}\frac{\mathrm{d}\boldsymbol{\ell} \times \mathbf{\hat r}}{r^2}, }[/math]

The direction of the cross product may be found by application of the right hand rule as follows:

  1. The thumb points in the direction of current I.
  2. The index finger points in the direction of the observation vector r.
  3. The middle finger points in the direction of the magnetic field vector B.

Direction of Magnetic Field made by a Current

The direction of curl of the magnetic field can be found using a modified right hand rule:

  1. The thumb points in the direction of conventional current.
  2. The curl of the fingers indicates the direction of magnetic field at each location surrounding the flow of current.

For example:

  1. In the image below, conventional current flows to the left (-x). By pointing your thumb in the -x direction and curling your fingers, the magnetic field curls in the y,z-plane, as shown.

Force on a Current from a Magnetic Field

[math]\displaystyle{ \mathbf{F} = \mathbf{I} \times \mathbf{B} }[/math]

The direction of the cross product may be found by application of the right hand rule as follows:

  1. The index finger points in the direction of the current I.
  2. The middle finger points in the direction of the magnetic field vector B.
  3. The thumb points in the direction of magnetic force F.

For example, for a current moving into the page, in a region where the magnetic field points up, then the force is to the right of the current.

Another Force on a Current from a Magnetic Field

In the situation shown below, we have a current pointing downward or in the negative y direction and we have a magnetic field into the page or in the negative z direction. Instead of using the typical right hand rule, we can use easy cross product method below to find the direction of the force.

Hall Effect Example

In the above picture, you see that all the positive charges accumulated at the top and all the negative charges accumulated to the bottom. You know the direction the particles velocity and magnetic field. Can you find out the charge of the particle using the right hand rule?

In the picture, the particles are coming out of the negative terminal, so they are electrons. This can be verified by using the right hand rule. You curl your fingers from velocity vector to magnetic field vector to find the direction of magnetic force perpendicular. Your thumb is pointing up, but since these are negative charges, its opposite and you flip your hand and you find that the direction of the magnetic force is actually pointing down. Therefore it makes sense that the electrons would accumulate at the bottom since its magnetic force is pushing them towards there.

Connectedness

1. How is the topic connected to something you are interested in?

It's honestly a valuable tool in determining the direction of cross-products which allows me to see if my math is correct. For example, to figure out the direction of the conventional current that flows in a wire whose magnetic field changes the direction of a compass, I would have the use the right-hand rule to help me out.

If a charged particle is moving at a certain speed and is under a magnetic field, the right-hand rule can be used to determine the force the particle will experience.

2. How is it connected to your major?

As a computer engineering major, it is very relevant in my physics class, and although we don't see the right hand rule in action first-hand, I know it plays a critical role in what we do when designing circuits and can be used to explain things at a molecular level.

3. Is there an industrial application?

Using sails for a boat deals with cross-product because when the wind blows, the sails experience angular momentum L = I x w

History

John Ambrose Fleming 1890

John Ambrose Fleming is credited with devising the right-hand rule. He was a professor at the University College, London where he was liked by many of his students. Fleming devised the right hand rule (though Fleming's original version used the left hand) in order to make relationships between current, its magnetic field, and the electromotive force easier to visualize and understand.

Though he was best known for his right-hand rule in which he connected the observation vector, magnetic field, and current, he also had a left-hand rule as well which he used for motors. It connected force, magnetic field, and current.

Fleming's original rule

See Also

External Links

  1. https://www.khanacademy.org/test-prep/mcat/physical-processes/magnetism-mcat/a/using-the-right-hand-rule
  2. https://ocw.mit.edu/courses/physics/8-02t-electricity-and-magnetism-spring-2005/lecture-notes/prs_w06d1.pdf
  3. http://physics.bu.edu/~duffy/semester2/d12_RHR_practice.html

References

  1. https://en.wikipedia.org/wiki/Right-hand_rule
  2. https://en.wikipedia.org/wiki/Magnetic_field
  3. https://nationalmaglab.org/education/magnet-academy/history-of-electricity-magnetism/pioneers/john-ambrose-fleming