How to Find the Magnitude of a Vector

Reviewed by Grace Imson, MA

Last Updated: September 27, 2024 Fact Checked

A vector is a geometrical object that has both a magnitude and direction. ^{[1]
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Research source} The magnitude is the length of the vector, while the direction is the way it's pointing. Calculating the magnitude of a vector is simple with a few easy steps. Other important vector operations include adding and subtracting vectors , finding the angle between two vectors , and finding the cross product .

Method 1

Method 1 of 2:

Finding the Magnitude of a Vector at the Origin

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1
Determine the components of the vector. Every vector can be numerically represented in the Cartesian coordinate system with a horizontal (x-axis) and vertical (y-axis) component. ^{[2]
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Research source} It is written as an ordered pair $v=<x,y>$ .
- For example, the vector above has a horizontal component of 3 and a vertical component of -5, therefore the ordered pair is <3, -5>.
When you draw the horizontal and vertical components, you end up with a right triangle. The magnitude of the vector is equal to the hypotenuse of the triangle so you can use the Pythagorean theorem to calculate it. ^{[3]
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3
Rearrange the Pythagorean theorem to calculate the magnitude. The Pythagorean theorem is A ² + B ² = C ² . “A” and “B” are the horizontal and vertical components of the triangle while “C” is the hypotenuse. Since the vector is the hypotenuse you want to solve for “C”. ^{[4]
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- x ² + y ² = v ²
- v = √(x ² + y ² ))
4
Solve for the magnitude. Using the equation above, you can plug in the numbers of the ordered pair of the vector to solve for the magnitude. ^{[5]
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- For example, v = √((3 ² +(-5) ² ))
- v =√(9 + 25) = √34 = 5.831
- Don't worry if your answer is not a whole number. Vector magnitudes can be decimals.

Method 2

Method 2 of 2:

Finding the Magnitude of a Vector Away from the Origin

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1
Determine the components of both points of the vector. Every vector can be numerically represented in the Cartesian coordinate system with a horizontal (x-axis) and vertical (y-axis) component. ^{[6]
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Research source} It is written as an ordered pair $v=<x,y>$ . If you are given a vector that is placed away from the origin of the Cartesian coordinate system, you must define the components of both points of the vector.
- For example, the vector AB has an ordered pair for point A and point B.
- Point A has a horizontal component of 5 and a vertical component of 1, so the ordered pair is <5, 1>.
- Point B has a horizontal component of 1 and a vertical component of 2, so the ordered pair is <1, 2>.
2
Use a modified formula to solve for the magnitude. Because you now have two points you are dealing with, you must subtract the x and y components of each point before you solve using the equation v = √((x ₂ -x ₁ ) ² +(y ₂ -y ₁ ) ² ). ^{[7]
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- Point A is ordered pair 1 <x ₁ , y ₁ > and point B is ordered pair 2 <x ₂ , y ₂ >
3
Solve for the magnitude. Plug in the numbers of your ordered pairs and calculate the magnitude. Using our above example the calculation looks like this: ^{[8]
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- v = √((x ₂ -x ₁ ) ² +(y ₂ -y ₁ ) ² )
- v = √((1-5) ² +(2-1) ² )
- v = √((-4) ² +(1) ² )
- v = √(16+1) = √(17) = 4.12
- Don't worry if your answer is not a whole number. Vector magnitudes can be decimals. ^{[9]
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The coordinates of head and tail of a vector are (2, 1, 0), (-4, 2, -3). What is the magnitude of the vector?

Community Answer

You can use the same formula: |→a| = √((x2 – x1)^2 + (y2 – y1)^2), but add on (z2 – z1)^2 at the end for the third set of coordinates!

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How do I find the direction?

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Use this formula: tan(y component / x component). If the vector is in quadrant 3 or 4, add a half rotation.

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What is the magnitude of the resultant vector of vector A-12.66 and vector B-11.93?

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To get the magnitude you need to square both the vectors' magnitude and then take the underroot.

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How to Find the Magnitude of a Vector

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Finding the Magnitude of a Vector at the Origin

Finding the Magnitude of a Vector Away from the Origin

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