Find study content
Learning Materials

Discover learning materials by subject, university or textbook.

Explanations

Textbooks

Exams
All Subjects

Anthropology

Archaeology

Architecture

Art and Design

Bengali

Biology

Business Studies

Greek

Chemistry

Chinese

Combined Science

Computer Science

Economics

Engineering

English

English Literature

Environmental Science

French

Geography

German

History

Hospitality and Tourism

Human Geography

Italian

Japanese

Law

Macroeconomics

Marketing

Math

Media Studies

Medicine

Microeconomics

Music

Nursing

Nutrition and Food Science

Physics

Polish

Politics

Psychology

Religious Studies

Sociology

Spanish

Sports Sciences

Translation

All Subjects

Biology

Business Studies

Chemistry

Combined Science

Computer Science

Economics

English

Environmental Science

Geography

History

Math

Physics

Psychology

Sociology

EXAM TYPES

GCSE

IGCSE

AS

A Level

International A Level

University Admissions Tests

GCSE SUBJECTS

GCSE 1

GCSE 2

GCSE 3

GCSE 4

GCSE 5

SOME-TEXT

IGCSE SUBJECTS

IGCSE 1

AS SUBJECTS

AS 1

A Level SUBJECTS

A Level 1

International A Level SUBJECTS

International A Level 1

University Admissions Tests SUBJECTS

University Admissions Tests 1
Features
Features

Discover all of these amazing features with a free account.

Flashcards

Vaia AI

Notes

Study Plans

Study Sets
What’s new?

Flashcards
Study your flashcards with three learning modes.

Study Sets
All of your learning materials stored in one place.

Notes
Create and edit notes or documents.

Study Plans
Organise your studies and prepare for exams.
Resources
Discover

All the hacks around your studies and career - in one place.

Find a job

Find a degree

Student Deals

Magazine

Mobile App
Featured

Magazine
Trusted advice for anyone who wants to ace their studies & career.

Job Board
The largest student job board with the most exciting opportunities.

Vaia Deals
Verified student deals from top brands.

Our App
Discover our mobile app to take your studies anywhere.

Go to App

Learning Materials

Features

Discover

Chapter 11: Q. 1 (page 879)

Unit vectors: If v is a nonzero vector, explain why $\frac{v}{| |v| |}$ is a unit vector.

Short Answer

Expert verified

By definition of a unit vector if v is a nonzero vector then $\frac{v}{||v||}$ is a unit vector.

Step by step solution

01

Step 1. Given Information.

It is given thatvis a non-zero vector.

02

Step 2. Explanation.

A unit vector is defined as the vector that has a magnitude equal to $1$ and its formula is $\vec{u} = \frac{v}{||v||} .$

If v is a non-zero vector and we divide it by its magnitude, then by the definition of a unit vector it is also a unit vector.

Thus, $\frac{v}{||v||} = \vec{u} .$

Unlock Step-by-Step Solutions & Ace Your Exams!

Full Textbook Solutions
Get detailed explanations and key concepts
Unlimited Al creation
Al flashcards, explanations, exams and more...
Ads-free access
To over 500 millions flashcards
Money-back guarantee
We refund you if you fail your exam.

Start your free trial

Over 30 million students worldwide already upgrade their learning with Vaia!

One App. One Place for Learning.

All the tools & learning materials you need for study success - in one app.

Get started for free

Most popular questions from this chapter

Let $r (t) = (x (t), y (t), z (t)), t \in [a, \infty),$ be a vector-valued function, where a is a real number. Explain why the graph of r may or may not be contained in some sphere centered at the origin. (Hint: Consider the functions $r_{1} (t) = (\cos t, \sin t, 1 / t)$ and $r_{2} (t) = (\cos t, \sin t, t), both with domain [1, \infty) .)$

Given a differentiable vector-valued function $r (t)$ , what is the relationship between $r' (t_{0})$ and $T (t_{0})$ at a point $t_{0}$ in the domain of $r (t)$ ?

$Find the derivative of the vector - valued function r (t) = <t^{3}, 5 t^{3}, - 2 t^{3}>, t > 0, and show that the derivative at any point t_{0} is a scalar multiple of the derivative at any other point . What does this property say about the graph of r ? Sketch the graph of r .$

Evaluate the limits in Exercises 42–45.

$\underset{t \to π}{l i m} (\sin t, \cos t, s e c t)$

Let C be the graph of a vector-valued function r. The plane determined by the vectors T(t₀) and B(t₀) and containing the point r(t₀) is called the rectifying plane for C at r(t₀). Find the equation of the rectifying plane to the helix determined by $r (t) = (\cos (t), \sin (t), t)$ when t = π.

See all solutions

Recommended explanations on Math Textbooks

Calculus

Read Explanation

Geometry

Read Explanation

Pure Maths

Read Explanation

Probability and Statistics

Read Explanation

Theoretical and Mathematical Physics

Read Explanation

Discrete Mathematics

Read Explanation

View all explanations

What do you think about this solution?

We value your feedback to improve our textbook solutions.

Study anywhere. Anytime. Across all devices.

Sign-up for free