8.5 The Dot Product.

Slides:



Advertisements
Similar presentations
Geometry of R2 and R3 Dot and Cross Products.
Advertisements

Copyright © 2014, 2010, 2007 Pearson Education, Inc. 1 Section 6.7 Dot Product.
10.6 Vectors in Space.
The Scalar or Dot Product Lecture V1.2 Example 4 Moodle.
10.5 The Dot Product. Theorem Properties of Dot Product If u, v, and w are vectors, then Commutative Property Distributive Property.
Section 6.7 The Dot Product. Overview From last section, adding two vectors results in another vector. So also does multiplying a scalar (real number)
Copyright © 2011 Pearson, Inc. 6.2 Dot Product of Vectors.
Copyright © Cengage Learning. All rights reserved. 6 Additional Topics in Trigonometry.
Kinetic energy Vector dot product (scalar product) Definition of work done by a force on an object Work-kinetic-energy theorem Lecture 10: Work and kinetic.
6.4 Vectors and Dot Products
8.6.1 – The Dot Product (Inner Product). So far, we have covered basic operations of vectors – Addition/Subtraction – Multiplication of scalars – Writing.
12.9 Parallel & Perpendicular Vectors in Two Dimensions
Mrs. Rivas International Studies Charter School..
6.4 Vectors and Dot Products The Definition of the Dot Product of Two Vectors The dot product of u = and v = is Ex.’s Find each dot product.
Section 13.4 The Cross Product.
Dot Product of Vectors. Quick Review Quick Review Solutions.
1 © 2011 Pearson Education, Inc. All rights reserved 1 © 2010 Pearson Education, Inc. All rights reserved © 2011 Pearson Education, Inc. All rights reserved.
Copyright © Cengage Learning. All rights reserved. Vectors in Two and Three Dimensions.
Vectors and the Geometry of Space Copyright © Cengage Learning. All rights reserved.
Vectors in Space 11.2 JMerrill, Rules The same rules apply in 3-D space: The component form is found by subtracting the coordinates of the initial.
1. Determine vectors and scalars from these following quantities: weight, specific heat, density, volume, speed, calories, momentum, energy, distance.
Advanced Precalculus Notes 8.5 The Dot Product The dot product of two vectors is a scalar: If v = 2i – 3j and w = 5i + 3j find: a) v ∙ wb) w ∙ vc) v ∙
Sec 13.3The Dot Product Definition: The dot product is sometimes called the scalar product or the inner product of two vectors.
Dot Product TS: Developing a capacity for working within ambiguity Warm Up: Copy the below into your notebook The dot product of u = and v = is given by.
Dot Product Second Type of Product Using Vectors.
Dot Products Objectives of this Section Find the Dot Product of Two Vectors Find the Angle Between Two Vectors Determine Whether Two Vectors and Parallel.
Lesson 6.4 – Dot Products The dot product of two vectors is given by
Honors Pre-Calculus 12-4 The Dot Product Page: 441 Objective: To define and apply the dot product.
1 st Day Section 6.4. Definition of Dot Product The dot product of vector u and vector v is A dot product is always a scalar (real #). Why?
Discrete Math Section 12.4 Define and apply the dot product of vectors Consider the vector equations; (x,y) = (1,4) + t its slope is 3/2 (x,y) = (-2,5)
Today in Precalculus Turn in graded wkst and page 511: 1-8 Notes:
Section 4.2 – The Dot Product. The Dot Product (inner product) where is the angle between the two vectors we refer to the vectors as ORTHOGONAL.
The Dot Product. Note v and w are parallel if there exists a number, n such that v = nw v and w are orthogonal if the angle between them is 90 o.
Dot Product of Vectors. What you’ll learn about How to find the Dot Product How to find the Angle Between Vectors Projecting One Vector onto Another.
8.5 The Dot Product Precalculus. Definition of the Dot Product If u= and v= are vectors, then their dot product (u v) is defined by: u v = a 1 a 2 + b.
8.6.2 – Orthogonal Vectors. At the end of yesterday, we addressed the case of using the dot product to determine the angles between vectors Similar to.
The definition of the product of two vectors is: 1 This is called the dot product. Notice the answer is just a number NOT a vector.
Chapter 4 Vector Spaces Linear Algebra. Ch04_2 Definition 1: ……………………………………………………………………. The elements in R n called …………. 4.1 The vector Space R n Addition.
6.4 Vector and Dot Products. Dot Product  This vector product results in a scalar  Example 1: Find the dot product.
12.3 The Dot Product. The dot product of u and v in the plane is The dot product of u and v in space is Two vectors u and v are orthogonal  if they meet.
12.3 Dot Product (“multiplying vectors”) Properties of the dot product Angle between two vectors using dot product Direction Cosines Projection of a vector.
The definition of the product of two vectors is: This is called the dot product. Notice the answer is just a number NOT a vector.
6.4 Vectors and Dot Products Objectives: Students will find the dot product of two vectors and use properties of the dot product. Students will find angles.
11.6 Dot Product and Angle between Vectors Do Now Find the unit vector of 3i + 4j.
Vectors and Dot Products OBJECTIVES: Find the dot product of two vectors and use the properties of the dot product. Find the angle between two vectors.
Dot Product of Vectors.
Dot Product and Angle Between Two Vectors
Additional Topics in Trigonometry
Sullivan Algebra and Trigonometry: Section 10.5
Objective: Computing work.
6.2 Dot Product of Vectors.
Parallel & Perpendicular Vectors in Two Dimensions
Lecture 3 0f 8 Topic 5: VECTORS 5.3 Scalar Product.
4.4 The Dot Product.
Law of sines Law of cosines Page 326, Textbook section 6.1
6.2 Dot Product of Vectors.
Section 3.2 – The Dot Product
12.3 The Dot Product.
8.6 Vectors in Space.
Find {image} and the angle between u and v to the nearest degree: u = < 7, -7 > and v = < -8, -9 > Select the correct answer: 1. {image}
Copyright © Cengage Learning. All rights reserved.
Find {image} , if {image} and {image} .
Copyright © 2014, 2010, 2007 Pearson Education, Inc.
THE DOT PRODUCT.
11 Vectors and the Geometry of Space
Find {image} , if {image} and {image} .
12.9 Parallel & Perpendicular Vectors in Two Dimensions
Vectors and Dot Products
RAYAT SHIKSHAN SANSTHA’S S.M.JOSHI COLLEGE HADAPSAR, PUNE
Presentation transcript:

8.5 The Dot Product

Theorem Properties of Dot Product If u, v, and w are vectors, then Commutative Property Distributive Property

Theorem Angle between Vectors

v = 4i + 3j v = 2i - j

Two vectors v and w are said to be parallel if there is a nonzero scalar a so that v = aw. In this case, the angle q between v and w is 0 or p.

Determine whether the vectors v = -3i + 2j and w = -9i + 6j are parallel. The vectors are parallel since w = 3v.

Theorem Two vectors u and v are orthogonal if and only if

Determine whether the vectors v = 4i - j and w = 2i + 8j are orthogonal.

y w = 2i + 8j x v = 4i - j

Theorem

The work W done by a constant force F in moving an object from A to B is defined as

Find the work done by a force of 50 pounds acting in the direction 3i + j in moving an object 20 feet from (0, 0) to (20, 0).

||F|| = 50 (3, 1) (20, 0)

Work is approximately 948.68 foot-pounds.