Exam (elaborations)

Solution Manual for Orbital Mechanics for Engineering Students – 4th Edition by Howard Curtis

Rating

Sold

Pages

320

Grade

A+

Uploaded on

19-09-2025

Written in

2025/2026

This document contains the complete solution manual for Orbital Mechanics for Engineering Students, 4th Edition by Howard D. Curtis. It provides detailed, step-by-step solutions to all end-of-chapter problems, covering key topics such as Newton’s laws, two-body orbital motion, orbital maneuvers, interplanetary trajectories, relative motion and rendezvous, orbital perturbations, rigid-body dynamics, attitude dynamics, and spacecraft mission design. The manual is designed to support aerospace engineering students in mastering orbital mechanics concepts and applying them to real-world problem-solving.

Show more Read less

Institution

ORBITAL MECHANICS FOR ENGINEERING STUDENTS

Module

ORBITAL MECHANICS FOR ENGINEERING STUDENTS

Whoops! We can’t load your doc right now. Try again or contact support.

Report Copyright Violation

Written for

Institution: ORBITAL MECHANICS FOR ENGINEERING STUDENTS
Module: ORBITAL MECHANICS FOR ENGINEERING STUDENTS

Document information

Uploaded on: September 19, 2025
Number of pages: 320
Written in: 2025/2026
Type: Exam (elaborations)
Contains: Questions & answers

Subjects

orbital mechanics solution manual
howard curtis 4th edition solutions
orbital perturbations solutions
rigid body dynamics solutions
interplanetary trajectory solutions
spacecraft rendezvous exercises

Content preview

, SOLUTIONS MANUAL

to accompany

ORBITAL MECHANICS FOR ENGINEERING STUDENTS

Howard D. Curtis
Embry-Riddle Aeronautical University
Daytona Beach, Florida

, Solutions Manual Orbital Mechanics for Engineering Students Chapter 1

Problem 1.1
(a)

 
A  A  Axiˆ  Ay ˆj  Azkˆ  Axiˆ  Ayˆj  Azkˆ 
    
 Axiˆ  Axiˆ  Ayˆj  Azkˆ  Ayˆj  Axiˆ  Ayˆj  Azkˆ  Azkˆ  Axiˆ  Ayˆj  Azkˆ 
     
 Ax2 iˆ  iˆ  Ax Ay iˆ  ˆj  Ax Az iˆ  kˆ   AyAx ˆj  iˆ  Ay2 ˆj  ˆj  AyAz ˆj  kˆ  
   
 
 AzAx kˆ  iˆ  AzAy kˆ  ˆj  Az2 kˆ  kˆ 
 
 Ax2 1  Ax Ay 0  Ax Az 0  Ay Ax 0  Ay2 1  Ay Az 0  Az Ax 0  Az Ay 0  Az2 1
     
2 2 2
 Ax  Ay  Az


But, according to the Pythagorean Theorem, A 2x  A y2  A z2  A2 , where A  A , the magnitude of
the vector A . Thus A  A  A2 .

(b)
iˆ ˆj kˆ
A B  C  A  Bx By Bz
Cx Cy Cz
   
 Ax iˆ  Ay ˆj  Azkˆ  iˆ ByCz  BzCy  ˆjBxCz  BzCx   kˆ BxCy  ByCx 
 
 
 
 Ax ByCz  BzCy  Ay BxC z  BzCx   Az BxCy  ByCx  
or

A  B  C  AxByCz  AyBzCx  AzBxCy  AxBzCy  AyBxC z  AzBy Cx (1)

Note that A  B   C  C  A  B , and according to (1)

C  A  B  CxAyBz  Cy AzBx  Cz AxBy  CxAz By  Cy AxBz  Cz AyBx (2)

The right hand sides of (1) and (2) are identical. Hence A   B  C  A  B  C .

(c)
iˆ ˆj kˆ iˆ ˆj kˆ


A  B  C  Axiˆ  Ayˆj  Azkˆ  Bx  By Bz  Ax Ay Az
Cx Cy Cz ByCz  BzCy BzCx  BxCy BxCy  ByCx

  
 Ay BxCy  ByCx  Az BzCx  BxCz  iˆ  Az ByCz  BzCy  Ax BxCy  ByCx  ˆj
   
  
 A B C  B C   A B C  B C  kˆ

x z x x z y y z z y

 
  
 AyBxCy  AzBxC z  Ay ByCx  AzBz Cx iˆ  AxByCx  AzBy Cz  AxBxCy  Az BzCy ˆj 
 x z x y z y x x z y y z
 A B C  A B C  A B C  A B C kˆ
 Bx AyCy  AzCz   Cx AyBy  AzBz  iˆ  By AxCx  AzCz   Cy AxBx  AzBz  ˆj
   
z x x y y z x x y y
 B A C  A C  C A B  A B  kˆ
 

Add and subtract the underlined terms to get

1

, Solutions Manual Orbital Mechanics for Engineering Students Chapter 1

  
A  B  C   B x A yC y  A zC z  A xC x  C x A yB y  Az B z  A xB x  iˆ
 

  
 By AxCx  AzCz  AyCy  Cy AxBx  AzBz  AyBy  ˆj
 


 y y z z z
 B A C  A C  A C  C A B  A B  A B  kˆ
z x x x x  y y z z



 B x iˆ  B y ˆj  B zk ˆ A Cx x  A yC y  AzCz   C x iˆ  C y ˆj  Czkˆ A xB x  A yB y  AzB z 
or

A  B  C  BA  C  CA  B


Problem 1.2 Using the interchange of Dot and Cross we get

A  B  C  D  A  B  C D
But

A  B  C D   C  A  B D (1)

Using the bac – cab rule on the right, yields

A  B  C D  AC  B  BC  A D

or

A  B  C D  A  DC  B  B  DC  A (2)

Substituting (2) into (1) we get


A  B  C D  A  CB  D  A  DB  C
Problem 1.3

Velocity analysis

From Equation 1.38,

v  vo    rrel  vrel . (1)

From the given information we have

vo  10Iˆ  30Jˆ  5 0 K̂ (2)

   
rrel  r  ro  150Iˆ  200Jˆ  3 0 0 K̂  300Iˆ  200Jˆ  1 0 0 K̂  150Iˆ  400Jˆ  20 0 K̂ (3)

Iˆ Jˆ K̂
  rrel  0.6 0.4 1.0  320Iˆ  270Jˆ  30 0K̂ (4)
150 400 200

2

£13.73

Get access to the full document:

100% satisfaction guarantee

Immediately available after payment

Both online and in PDF

No strings attached

Get to know the seller

primearchive

3.0

(2)

Also available in package deal

Get to know the seller

primearchive Chamberlain College Of Nursing

View profile

Sold

Member since

4 months

Number of followers

Documents

217

Last sold

4 days ago

PrimeArchive

We provide premium, expertly crafted study materials that save you time and reduce stress. Our clear, effective guides are designed to give you the confidence and tools you need to ace your exams and achieve top grades.

3.0

2 reviews

Why students choose Stuvia

Created by fellow students, verified by reviews

Quality you can trust: written by students who passed their exams and reviewed by others who've used these revision notes.

Didn't get what you expected? Choose another document

No problem! You can straightaway pick a different document that better suits what you're after.

Pay as you like, start learning straight away

No subscription, no commitments. Pay the way you're used to via credit card and download your PDF document instantly.

“Bought, downloaded, and smashed it. It really can be that simple.”

Alisha Student

Frequently asked questions

What do I get when I buy this document?

You get a PDF, available immediately after your purchase. The purchased document is accessible anytime, anywhere and indefinitely through your profile.

Satisfaction guarantee: how does it work?

Our satisfaction guarantee ensures that you always find a study document that suits you well. You fill out a form, and our customer service team takes care of the rest.

Who am I buying these notes from?

Stuvia is a marketplace, so you are not buying this document from us, but from seller primearchive. Stuvia facilitates payment to the seller.

Will I be stuck with a subscription?

No, you only buy these notes for £13.73. You're not tied to anything after your purchase.

Can Stuvia be trusted?

4.6 stars on Google & Trustpilot (+1000 reviews) 44962 documents were sold in the last 30 days Founded in 2010, the go-to place to buy revision notes and other study material for 16 years now

Solution Manual for Orbital Mechanics for Engineering Students – 4th Edition by Howard Curtis

Written for

Document information

Subjects

Content preview

Also available in package deal

Get to know the seller

Recently viewed by you

Why students choose Stuvia

Created by fellow students, verified by reviews

Didn't get what you expected? Choose another document

Pay as you like, start learning straight away

Frequently asked questions

What do I get when I buy this document?

Satisfaction guarantee: how does it work?

Who am I buying these notes from?

Will I be stuck with a subscription?

Can Stuvia be trusted?