Separable equations Study guides, Revision notes & Summaries
Looking for the best study guides, study notes and summaries about Separable equations? On this page you'll find 68 study documents about Separable equations.
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Lecture notes: Maths for Engineers and Scientists (Math1551): Differential Equations
- Lecture notes • 26 pages • 2024
- Available in package deal
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- £8.48
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This set of Year 1 notes from Durham University's "Maths for Engineers" module offers an in-depth exploration of Differential Equations. It covers a wide range of topics including first-order ODEs (Separable, Homogeneous, Linear, Bernoulli, and Exact), second-order ODEs (Homogeneous and Inhomogeneous), applications, damped and forced oscillations, and systems of linear ODEs. The notes are detailed and methodically structured, with clear examples and step-by-step solutions to help students mas...
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NEU Differential Equations and Linear Algebra Notes
- Lecture notes • 119 pages • 2024
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- £11.94
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Notes for Northeastern University's differential equations and linear algebra course throughout the entire semester (or diff eqs and lin alg in general). Differential equations topics include 1st order differential equations, 2nd order differential equations, homogeneous systems, non-homogenous systems, separable equations, mechanical vibrations etc. Linear algebra topics include Laplace transform, shifting theorem, convolution, matrices, systems of equations, eigenvalues, eigenvectors, etc. In...
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Differential Equations Handwritten Complete Notes
- Lecture notes • 54 pages • 2024
- Available in package deal
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These notes comprehensively cover key topics in differential equations, including: 
 
Formation of Differential Equations: Techniques to derive differential equations from given functions or conditions. 
First-Order Differential Equations: Different types (e.g., separable, exact, linear) with solved examples and step-by-step solutions. 
Applications of Differential Equations: Practical uses in fields like physics, engineering, and economics. 
Higher-Order Differential Equations: Detailed discuss...
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overview of differential equation
- Summary • 8 pages • 2024
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- £5.77
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Differential equations are mathematical expressions involving an unknown function and its derivatives, essential for describing many physical phenomena. Ordinary differential equations (ODEs) focus on functions of a single independent variable and their derivatives. A notable type of ODE is the separable differential equation, which can be solved by separating variables and integrating both sides. Initial conditions, which specify the value of the solution at a specific point, are crucial for de...
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Solution Manual for Advanced Engineering.pdf
- Exam (elaborations) • 41 pages • 2023
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- £7.49
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Chapter 1 
First-Order Differential 
Equations 
1.1 Terminology and Separable Equations 
1. The differential equation is separable because it can be written 
3y 
2 
dy 
= 4x, 
dx 
or, in differential form, 
Integrate to obtain 
3y 
2 dy = 4xdx. 
y 
3 
= 2x 
2 
+ k. 
This implicitly defines a general solution, which can be written explicitly 
as 
y = (2x 
2 
+ k) 
1/3 
, 
with k an arbitrary constant. 
2. Write the differential equation as 
dy 
x 
dx = −y, 
which separates as 
1 1 
if x /= 0 an...
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Solution Manual for Advanced Engineering.pdf
- Exam (elaborations) • 41 pages • 2023
-
- £6.16
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Chapter 1 
First-Order Differential 
Equations 
1.1 Terminology and Separable Equations 
1. The differential equation is separable because it can be written 
3y 
2 
dy 
= 4x, 
dx 
or, in differential form, 
Integrate to obtain 
3y 
2 dy = 4xdx. 
y 
3 
= 2x 
2 
+ k. 
This implicitly defines a general solution, which can be written explicitly 
as 
y = (2x 
2 
+ k) 
1/3 
, 
with k an arbitrary constant. 
2. Write the differential equation as 
dy 
x 
dx = −y, 
which separates as 
1 1 
if x /= 0 an...
-
Solution Manual for Advanced Engineering.pdf
- Exam (elaborations) • 41 pages • 2023
-
- £7.49
- + learn more
Chapter 1 
First-Order Differential 
Equations 
1.1 Terminology and Separable Equations 
1. The differential equation is separable because it can be written 
3y 
2 
dy 
= 4x, 
dx 
or, in differential form, 
Integrate to obtain 
3y 
2 dy = 4xdx. 
y 
3 
= 2x 
2 
+ k. 
This implicitly defines a general solution, which can be written explicitly 
as 
y = (2x 
2 
+ k) 
1/3 
, 
with k an arbitrary constant. 
2. Write the differential equation as 
dy 
x 
dx = −y, 
which separates as 
1 1 
if x /= 0 an...
-
Exam (elaborations) TEST BANK FOR Principles of Mathematical Analysis By Walter Rudin (A Complete Solution Guide)
- Exam (elaborations) • 387 pages • 2021
-
- £11.94
- 1x sold
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Exam (elaborations) TEST BANK FOR Principles of Mathematical Analysis By Walter Rudin (A Complete Solution Guide) 
A Complete Solution Guide to 
Principles of Mathematical Analysis 
by Kit-Wing Yu, PhD 
 
Copyright 
c 2018 by Kit-Wing Yu. All rights reserved. No part of this publication may be reproduced, 
stored in a retrieval system, or transmitted, in any form or by any means, electronic, mechanical, photocopying, 
recording, or otherwise, without the prior written permission of the author....
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chapter2-first order differential equations
- Lecture notes • 4 pages • 2024
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- £6.16
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This document explores the contents of Chapter Two, which centers on first-order differential equations. It meticulously examines separable equations, providing streamlined, step-by-step illustrations to facilitate understanding and practical implementation.
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Separable Differential Equations, Exact Differential Equations, Homogeneous Differential Equations
- Summary • 2 pages • 2024
-
- £3.92
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Differential equations are mathematical expressions involving an unknown function and its derivatives, essential for describing many physical phenomena. Ordinary differential equations (ODEs) focus on functions of a single independent variable and their derivatives. A notable type of ODE is the separable differential equation, which can be solved by separating variables and integrating both sides. Initial conditions, which specify the value of the solution at a specific point, are crucial for de...
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