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Step by step solution of both cases from example 9.14. This example uses the method of separation of variables on the wave equation.
Course Code
SCEE09004 Publisher
Daniel Friedrich Licence Type
Creative Commons - Attribution Language
English Date Created
February 27th, 2021
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Step by step solution of example 9.13 which covers a wave equation problem solved by the method of characteristics.
Course Code
SCEE09004 Publisher
Daniel Friedrich Licence Type
Creative Commons - Attribution Language
English Date Created
February 27th, 2021
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Step by step solution of the radially symmetric heat conduction or diffusion problem from example 9.24
Course Code
SCEE09004 Publisher
Daniel Friedrich Licence Type
Creative Commons - Attribution Language
English Date Created
February 13th, 2021
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Step by step solution of example 9.23 with the Laplace transform method
Course Code
SCEE09004 Publisher
Daniel Friedrich Licence Type
Creative Commons - Attribution Language
English Date Created
February 6th, 2021
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Machine Learning Practical (MLP) Lecture 07, Clip 03 / 09.
Course Code
INFR11132 Licence Type
All rights reserved Language
English
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In this example video, we calculate the Laplace transform of the ramp, sine and cosine functions, and the hyperbolic sine and cosine functions directly from the Laplace transform definition.
Course Code
SCEE08009 Publisher
Daniel Friedrich Licence Type
Creative Commons - Attribution Language
English Date Created
September 2nd, 2020
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In this video, you will find a walkthrough of question 7 from Tutorial 1.
Licence Type
All rights reserved The University of Edinburgh Date Created
August 18th, 2020
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Evaluate the stability of the third order ODE given by: x''' + 2x'' + 4x' + 8x = t exp(2t) with x(0)=x'(0) = 0 and x''(0)=1
Course Code
SCEE08009 Publisher
Daniel Friedrich Licence Type
Creative Commons - Attribution Language
English Date Created
November 6th, 2019
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Solve a third order ODE with the Laplace transform method. The initial value problem is given by: x''' + 2x'' + 4x' + 8x = t exp(2t) with x(0)=x'(0) = 0 and…
Course Code
SCEE08009 Publisher
Daniel Friedrich Licence Type
Creative Commons - Attribution Language
English Date Created
November 6th, 2019
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Example lecture for Earth science and ecology from the undergraduate open day
Licence Type
Creative Commons - Attribution Language
English Date Created
June 10th, 2019
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Rhythmic Durations Audio Example
Publisher
Eli Appleby-Donald Licence Type
All rights reserved The University of Edinburgh
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This project was created by the School of Informatics, University of Edinburgh.
Publisher
University of Edinburgh Licence Type
Creative Commons - Attribution Non Commercial Language
English Date Created
November 20th, 2017
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For subtitling
Licence Type
All rights reserved The University of Edinburgh
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Welcome to Economic Democracy: The Cooperative Alternative, our MOOC about worker-owned and worker-controlled firms.
We often hear that political democracy is the best available form of…
Licence Type
All rights reserved The University of Edinburgh Language
english
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Welcome to Economic Democracy: The Cooperative Alternative, our MOOC about worker-owned and worker-controlled firms.
We often hear that political democracy is the best available form of…
Licence Type
All rights reserved The University of Edinburgh
|
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Welcome to Economic Democracy: The Cooperative Alternative, our MOOC about worker-owned and worker-controlled firms.
We often hear that political democracy is the best available form of…
Licence Type
All rights reserved The University of Edinburgh Language
english
|