Mastering Vectors: Adding and Subtracting with Magnitude

Mastering Vectors: Adding and Subtracting with Magnitude
1 / 15
next
Slide 1: Slide

This lesson contains 15 slides, with interactive quizzes and text slides.

Items in this lesson

Mastering Vectors: Adding and Subtracting with Magnitude

Slide 1 - Slide

This item has no instructions

Learning Objective
At the end of the lesson you will be able to use i and j and column vector notation, add and subtract vectors, and use Pythagoras theorem to calculate the magnitude of the vector.

Slide 2 - Slide

This item has no instructions

What do you already know about vectors?

Slide 3 - Mind map

This item has no instructions

Introduction to Vectors
Vectors are quantities that have both magnitude and direction. They are represented by arrows and can be manipulated mathematically.

Slide 4 - Slide

This item has no instructions

i and j Notation
i and j are unit vectors in the x and y direction respectively. They are used to represent components of a vector in 2D space.

Slide 5 - Slide

This item has no instructions

Column Vector Notation
Vectors can be represented as column matrices, with their components listed in a vertical arrangement.

Slide 6 - Slide

This item has no instructions

Adding Vectors
To add vectors, simply add their corresponding components. The resulting vector is the sum of the individual vectors.

Slide 7 - Slide

This item has no instructions

Subtracting Vectors
Subtracting vectors involves subtracting their corresponding components. The resulting vector is the difference between the individual vectors.

Slide 8 - Slide

This item has no instructions

Magnitude of a Vector
The magnitude of a vector represents its length and is calculated using the Pythagorean theorem in 2D space.

Slide 9 - Slide

This item has no instructions

Definition of Magnitude
Magnitude is the size of a vector, representing the distance from the starting point to the end point of the vector.

Slide 10 - Slide

This item has no instructions

Practice Questions
Solve the following vector problems: 1. Add the vectors A = 3i + 2j and B = -i - 4j. 2. Find the magnitude of the vector V = 5i + 12j.

Slide 11 - Slide

This item has no instructions

Plenary: Multiple Choice Activity
Which of the following is used to represent the components of a vector in 2D space? A) i and j notation B) Column vector notation C) Magnitude D) Pythagorean theorem

Slide 12 - Slide

This item has no instructions

Write down 3 things you learned in this lesson.

Slide 13 - Open question

Have students enter three things they learned in this lesson. With this they can indicate their own learning efficiency of this lesson.
Write down 2 things you want to know more about.

Slide 14 - Open question

Here, students enter two things they would like to know more about. This not only increases involvement, but also gives them more ownership.
Ask 1 question about something you haven't quite understood yet.

Slide 15 - Open question

The students indicate here (in question form) with which part of the material they still have difficulty. For the teacher, this not only provides insight into the extent to which the students understand/master the material, but also a good starting point for the next lesson.