How to Find the Angle Between Two Vectors?
Vector quantities are the physical quantities that have both magnitude and direction and the angle between two vectors can be easily found if the dot product or the cross product of the two vectors is given.
In this article, we will learn how to find the angle between two vectors, its formula, related examples, and others in detail.
How to Find the Angle Between Two Vectors?
Angle between vectors can be found by using two methods:
- Using Scalar (Dot) Product
- Using Cross (Vector) Product
However, the most commonly used formula for finding an angle between two vectors involves the scalar product.
Finding Angle using Scalar (Dot) Product
Two vectors combined into a scalar product give you a number. Scalar products can be used to define the relationships between energy and work. In mathematics, a scalar product is used to represent the work done by a force (which is a vector) in dispersing (which is a vector) an object. The scalar product is represented by a dot (.). Let,
Dot product be (a.b)
Magnitude of vector a = |a|
Magnitude of vector b = |b|
Angle between the vectors is
ΞΈ = Cos-1 [(a Β· b) / (|a| |b|)]
When two vectors are connected by a dot product, the direction of the angle α does not matter. The angle α can be measured by the difference between either vector since Cos α = Cos (-α) = Cos (2Ο β α).
Finding Angle Using Cross (Vector) Product
A cross product may also be known as a vector product. It is a form of vector multiplication that takes place between two vectors that have different kinds or natures. When two vectors are multiplied with each other and the resulting product is also a vector quantity, the resulting vector is called the cross product of two vectors or the vector product. Multiplication of two vectors yields vector products with a direction perpendicular to each vector. Let,
Cross product be (a Γ b)
Magnitude of vector a = |a|
Magnitude of vector b = |b|
|a Γ b| = |a| |b| sin ΞΈ
Angle between the vectors is,
ΞΈ = Sin-1 [|a Γ b| / (|a| |b|)]
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Sample Problems β How to Find the Angle Between Two Vectors?
Problem 1: Find the angle between two vectors a = {4, 5} and b = {5, 4}.
Solution:
Using aβ b = β£aβ£β β£bβ£β cos(ΞΈ)
Finding dot product: aβ b = (4β 5) + (5β 4) β 40
Magnitude of vectors:
|a| = β(42 + 52 ) = β(16 + 25 )β β41
|b| = β(52 + 42 ) = β(25 + 16) β β41
cos ΞΈ = (aβ b) β |a|β |b| β 40 β β41 β β41 β 40 β41
ΞΈ = cos-1 (40β41) β 20.556Β°
Problem 2: Find the angle between two vectors a = {2, 2} and b = {1, 1}.
Solution:
Using aβ b = β£aβ£β β£bβ£β cos(ΞΈ)
Finding dot product: aβ b = (2 β 1) + (2 β 1) β 4
Magnitude of vectors:
|a| = β(22 + 22)= β(4 + 4) β β8
|b| = β(12 + 12 )= β( 1+ 1 )β β2
cos ΞΈ = (aβ b) β |a|β |b| β 4 β β8 β β2 = 4 β4 β 1
ΞΈ = cos-1 (1) β 0Β°
Problem 3: Find the angle between two vectors a = i + 2j β k and b = 2i + 4j β 2k.
Solution:
Using aβ b = β£aβ£β β£bβ£β cos(ΞΈ)
Finding dot product: aβ b = (1β 2) + (2β 4) + ( -1β -2) = 2+ 8+2 β12
Magnitude of vectors:
|a| = β(12 + 22 + (-1)2 0 = β(1 + 4 + 1 )β β6
|b| = β(22 + 42 + (-2)2 ) = β(4+ 16 + 4) β β24
cos ΞΈ = (aβ b) β |a|β |b| β 12 β (β6 β β24) = 12 β12 β 1
ΞΈ = cos-1 (1) β 0Β°
Problem 4: Find the angle between two vectors a = i + 2j β k and b = 4j β 2k.
Solution:
a = i + 2j β k
b = 0i + 4j β 2k
Using aβ b = β£aβ£β β£bβ£β cos(ΞΈ)
Finding dot product: aβ b = (1β 0) + (2β 4) + (β1β β2) = 0+8+2 β10
Magnitude of vectors:
|a| = β(12 + 22 + (-1)2 0 = β( 1 + 4 + 1 )β β6
|b| = β(02 + 42 + (-2)2 ) = β(16 + 4) β β20
cos ΞΈ = (aβ b) β |a|β |b| = 10 β (β6β β20) = 10/β120 β 5 β β30
ΞΈ = cos-1 (5 β β30) β 45Β°
Problem 5: Find the angle between two vectors a = {1, -3} and b = {-3, 1}.
Solution:
Using aβ b = β£aβ£β β£bβ£β cos(ΞΈ)
Finding dot product: aβ b = (1 β -3) + (-3 β 1) = -3 -3 β -6
Magnitude of vectors:
|a| = β(12 + (-3)2 = β(1 + 9 )β β10
|b| = β(-3)2 + 12) = β(9 + 1) β β10
cos ΞΈ = (aβ b) β |a|β |b| β -6 β (β10 β β10) = -6 β10 β -3/5
ΞΈ = cos-1 (-3/5) β 126.87Β°
Problem 6: Find the angle between two vectors a = -3i + j and b = -3i + j.
Solution:
Using aβ b = β£aβ£β β£bβ£β cos(ΞΈ)
Finding dot product: aβ b = (-3 β -3 ) + (1 β 1) = 9 + 1 β10
Magnitude of vectors:
|a| = β(-3)2 + 12 = β(9 + 1 ) β β10
|b| = β(-3)2 + 12 = β(9 + 1 ) β β10
cos ΞΈ = (aβ b) β |a|β |b| β 10 β (β10 β β10) = 10 β10 β 1
ΞΈ = cos-1 (1) β 0Β°
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