Fourier Transform

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1. 

   Derivative Of A Distribution

   Stanford / Mathematics
   Brad G. Osgood
   

   Derivative Of A Distribution, Example: Derivative Of A Unit Step, Example: Derivative Of Sgn(X), Applications To The Fourier Transform (Using The Derivative Theorem), Caveat To Distributions: Multiplying Distributions, Distributions*Functions, Special Case: The Delta Function And Sampling, Convolution In Distributions, Special Case: Convolution When T = Delta, The Scaling Property Of Delta

2. 

   Linear Systems: Basic Definitions

   Stanford / Mathematics
   Brad G. Osgood
   

   Linear Systems: Basic Definitions, Direct Proportionality As Example, Special Cases Of Linear Systems, Eigenvectors And Eigenvalues, The Spectral Theorem And Finding A Basis Of Eigenvectors, Matrix Multiplication = Only Example Of Finite Dimensional Linear Systems, Integration Against A Kernel Generalizing Matrix Multiplication, Example: The Fourier Transform

3. 

   Laplace Transform Solves an Equation 2

   Khan Academy / Mathematics
   Salman Khan
   

   Second part of using the Laplace Transform to solve a differential equation.

4. 

   Using the Laplace Transform to Solve a Nonhomogeneous Equation

   Khan Academy / Mathematics
   Salman Khan
   

   Solving a non-homogeneous differential equation using the Laplace Transform.

5. 

   Aliasing Demonstration With Music

   Stanford / Mathematics
   Brad G. Osgood
   

   Aliasing Demonstration With Music, Transition To Discrete! The DFT, The Plan For Transitioning To Discrete Time, Creating A Discrete Signal From F(T) Creating A Discrete Version Of The Fourier Transform Of The Sampled Version Of F(T), Summary Of What We Just Did, Summary Of Results (Formulas), Moving From Continuous To Discrete Variables, Final Result: The DFT

6. 

   Solution Via Laplace Transform And Matrix Exponential

   Stanford / Mathematics
   Stephen Boyd
   

   Solution Via Laplace Transform And Matrix Exponential, Laplace Transform Solution Of X_^ = Ax, Harmonic Oscillator Example, Double Integrator Example, Characteristic Polynomial, Eigenvalues Of A And Poles Of Resolvent, Matrix Exponential, Time Transfer Property

7. 

   Laplace Transform of t^n: L(t^n)

   Khan Academy / Mathematics
   Salman Khan
   

   Laplace Transform of t^n: L{t^n}.

8. 

   Discrete-time fourier transforms

   MIT / Computer Science
   Robert Gallager
   Lizhong Zheng
   

   Discrete-time fourier transforms and sampling theorem

9. 

   Laplace Transform of: L(t)

   Khan Academy / Mathematics
   Salman Khan
   

   Determining the Laplace Transform of t.

10. 

    Analyzing General Periodic Phenomena As A Sum Of Simple Periodic Phenomena

    Stanford / Mathematics
    Brad G. Osgood
    

    Summary Of Previous Lecture (Analyzing General Periodic Phenomena As A Sum Of Simple Periodic Phenomena), Fourier Coefficients; Discussion Of How General The Fourier Series Can Be (Examples Of Discontinuous Signals), Discontinuity And Its Impact On The Generality Of The Fourier Series, Infinite Sums To Represent More General Periodic Signals, Summary Of Convergence Issues, Convergence: Continuous Case, Smooth Case (Fourier Series...more

11. 

    More Laplace Transform Tools

    Khan Academy / Mathematics
    Salman Khan
    

    A grab bag of things to know about the Laplace Transform.

12. 

    Tomography And Inverting The Radon Transform

    Stanford / Mathematics
    Brad G. Osgood
    

    Tips For Filling Out Evals, Tomography And Inverting The Radon Transform; Setup, Introducing Coordinates, Delta Along A Line, The Integral Of U Along A Line, Inverting The Radon Transform