Alignment of a Solar Panel: Dot and Cross Products
In this dot and cross product learning exercise, students identify vector points under given conditions determine vertical support and determine angles of an object. This two-page learning exercise contains two problems.
3 Views 4 Downloads
Worksheet 9 - Math 222 - Three-Dimensional Coordinate System
In this coordinate system worksheet, students compute the areas and lengths in polar coordinates, find unit vectors, work with the three-dimensional coordinate system, compute cross products, and compute dot product equations. This...
12th - Higher Ed Math
Introduction to Calculus
This heady calculus text covers the subjects of differential and integral calculus with rigorous detail, culminating in a chapter of physics and engineering applications. A particular emphasis on classic proof meshes with modern graphs,...
11th - Higher Ed Math CCSS: Adaptable
Calculus - Early Transcendentals
This textbook takes the learner from the basic definition of slope through derivatives, integrals, and vector multivariable calculus. Each section is composed primarily of examples, with theoretical introductions and explanations in...
9th - Higher Ed Math CCSS: Adaptable
New Review Dot Products and Duality | Essence of Linear Algebra, Chapter 7
The dot product of two matrices is a number on the number line, its transformation. The resource presents the dot product as a linear transformation from two dimensions to one dimension. The video uses the numerical and graphical...
14 mins 11th - Higher Ed Math CCSS: Adaptable
New Review Cross Products | Essence of Linear Algebra, Chapter 8
Equate the area of a parallelogram with the magnitude. The 11th installment in a 15-video series introduces the concept of the cross product of two vectors. The presentation makes the geometric connection between the cross product, the...
9 mins 11th - Higher Ed Math
New Review Cross Products in the Light of Linear Transformations | Essence of Linear Algebra Chapter 8 Part 2
What do cross products and parallelpipeds have in common? The video discusses the geometric representation of the cross product. The geometric interpretation explains why the computational trick in calculating the cross product works.
13 mins 11th - Higher Ed Math CCSS: Adaptable