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Exploring the scalar product of two vectors

We will start by reviewing a few main concepts before we explore the aim of this investigation. Review Question 1.

What is the symbol for magnitude of vector a?

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Review Question 2

Find the magnitude of the vector v = .

Introduction

In this exploration we will explore the geometric definition of a scalar product of two vectors in 2D. The results can be generalized to 3D as well. The scalar product is also known as the dot product. As a reminder, we know the algebraic definition of a scalar product of and is defined as

Question 1. Application of algebraic definition.

If the two vectors are and then find . Show your working,

Change the points and record your observations in the table. What do you observe between the angle and the scalar product?

Use the Geogebra applet here to complete the table above.
Use the Geogebra applet here to complete the table above.

Note.

For a vector you can enter this as <2, 1> in the Geogebra table. Please note that <2, 1> is not a conventional notation. We are using it here due the input limitation into Geogebra table.

Questions for Investigation 1.

1. What do you notice? 2. Which terms are proportional? 3. How can you explain this proportionality?

Now expand the table in your Geogebra applet with this investigation. You can use <4,0> to denote a vector 4i + 0j.

Now expand the table in your Geogebra applet with this investigation. You can use <4,0> to denote a vector 4i + 0j.

Questions for Investigation 2. Please use GDC or appropriate technology to answer these questions.

1.Use data from Investigation 2 only. Plot a graph with angle in the horizontal axis and the associated scalar product in the vertical axis. 2. Describe the pattern or trend on this curve. 3. Use an appropriate regression to find the equation of this curve.

Question 2.

Which of these is the geometric definition of a scalar product?

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Question 3

If vector a and vector b are perpendicular to each other then _____________.

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Question 4

Explain the reasoning for your response to question 3.

Question 5.

If the scalar product of two vectors is positive then _____________.

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Question 6.

If the angle between two vectors is obtuse then the scalar product must be _________.

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Final question.

What is a possible use of the scalar product of two vectors?