The Dot Product and Cross Product: Finding the Angle Between Two Vectors

Click For Summary

Homework Help Overview

The discussion revolves around the relationship between the dot product and cross product of two vectors, specifically focusing on determining the angle theta that satisfies the equation A dot B = |A x B|. Participants are examining the implications of different angles in this context.

Discussion Character

  • Conceptual clarification, Assumption checking

Approaches and Questions Raised

  • Participants explore the conditions under which the dot product equals the magnitude of the cross product, questioning the validity of specific angle choices (225 degrees and 315 degrees). There is an emphasis on understanding the significance of the smaller angle between vectors in these calculations.

Discussion Status

Some participants have provided clarifications regarding the definitions of the dot and cross products, noting the importance of the angle's range. There is an ongoing exploration of the assumptions made by the question's author regarding angle measurement.

Contextual Notes

There is a mention of common practices regarding angle definitions (0° ≤ θ ≤ 180°) and the potential for differing interpretations of angles in the context of vector operations.

raptik
Messages
21
Reaction score
0

Homework Statement


If theta is the angle between two non-zero vectors A and B, then which of the following angles theta results in A dot B = |A x B|?

Homework Equations


A dot B = ABcos(theta)
A x B = ABsin(theta)

The Attempt at a Solution


There were two choices in the multiple choice answers where cos(theta) = |sin(theta)|

1 is 225 degrees and the other is 315 degrees. The correct answer is 315 degrees. Can somebody explain or help illustrate why 225 is wrong and 315 is right?
 
Physics news on Phys.org
When performing the dot and cross product the angle used in the formulas you listed is always the smaller angle between the two vectors. So an angle of 315 degrees corresponds to an angle of 45 degrees (360-315=45). And 225 corresponds to an angle of 135 degrees. This should help you answer your question.
 
Additionally the Magnitude of the cross product is defined as:

|A x B|= |A||B| sin(theta)

not = |AB sin(theta)| or AB |sin(theta)| as you eluded to in your post.
 
newguy1234 said:
Additionally the Magnitude of the cross product is defined as:

|A x B|= |A||B| sin(theta)

not = |AB sin(theta)| or AB |sin(theta)| as you eluded to in your post.

True as long as we agree that 0° ≤ θ ≤ 180°, as is common practice. But apparently the question's author has a different idea about the angle between two vectors!
 

Similar threads

The derivative of the dot product "distributes" over each vector
  • · Replies 5 ·
Replies
5
Views
842
Are Orthogonal Vectors Proven by Derivative and Dot Product?
  • · Replies 4 ·
Replies
4
Views
2K
Torque on a Circular Current Loop under a Misaligned Magnetic Field
  • · Replies 1 ·
Replies
1
Views
1K
Vector cross product anti-commutative property
  • · Replies 9 ·
Replies
9
Views
3K
Magnetic moment and magnetic field and dot product
  • · Replies 13 ·
Replies
13
Views
3K
Finding dot product, cross, and angle between 2 vectors
  • · Replies 3 ·
Replies
3
Views
2K
Solution to the Two-Body Problem: Cross-Product and Dot-Product Integration
  • · Replies 2 ·
Replies
2
Views
1K
Vectors in yz and xz plane dot product, cross product, and angle
  • · Replies 8 ·
Replies
8
Views
2K
Understanding the Relationship between Dot and Cross Products
  • · Replies 6 ·
Replies
6
Views
2K
How Do Dot Products Reflect Vector Projections?
  • · Replies 1 ·
Replies
1
Views
2K