### 2 videos in "Dot Products, Cross Products, and Determinants"

## Lecture 2: Determinants & cross product

Lecture 2: Determinants & cross product

3931 views, 2 ratings - 00:52:50

Part of video series Calculus 3 Course acquired through MIT OpenCourseWare

Denis Auroux. 18.02 Multivariable Calculus, Fall 2007. (Massachusetts Institute of Technology: MIT OpenCourseWare). http://ocw.mit.edu (Accessed March 14, 2009). License: Creative Commons Attribution-Noncommercial-Share Alike.

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Learn about finding determinants and cross products of vectors and their applications.

- Lecture Notes - Lecture Notes from this lesson.
- Transcript of Lesson - Written transcript from this lesson.
- Problem Set - A problem set with some problems from this lecture.
- Vector Operations and Properties - A list of some operations and properties using vectors.

- How do you find a determinant of two vectors?
- How do you find the cross product of two vectors?
- What is a cross product?
- What are some applications of finding a dot product?
- What is a unit vector?
- How do you find a unit vector?
- How do you find the projection of a vector in a direction?
- How do you find the components of a vector along a unit vector?
- How do you find the area of a polygon using vectors?
- How do you find the area of a triangle using vectors?
- What is the vector formula for the area of a triangle?
- How do you find the area of a parallelogram using vectors?
- What does the cross product of two vectors mean geometrically?
- How do you know if the direction of a cross product is up or down?
- What is the right-hand rule?
- How can you find the direction of the cross product of two vectors?
- How do you find the volume of a box using vectors?
- How do you find the determinant of three vectors?
- What is the handedness of coordinates?
- How do you find the length of a cross product of two vectors?

This lesson starts with a quick review of dot products between vectors, and moves on to cross products and determinants. This is another very important lecture in Multivariable Calculus, taught very well and understandably. This is a really great lecture overall.