![I wanted to calculate the Fourier transform of sin(at) and ended up that it's indeterminate. Wolfram Alpha says tho that the answer has to do with the Dirac delta function. Where did I wanted to calculate the Fourier transform of sin(at) and ended up that it's indeterminate. Wolfram Alpha says tho that the answer has to do with the Dirac delta function. Where did](https://preview.redd.it/qimpj3v538o41.jpg?auto=webp&s=8a34f51b56d1aa485a21c2bba40a877f38a1f2cf)
I wanted to calculate the Fourier transform of sin(at) and ended up that it's indeterminate. Wolfram Alpha says tho that the answer has to do with the Dirac delta function. Where did
![SOLVED: 1. (12) These two parts are independent. a) Find the inverse of the Fourier transform X(f)=je-f2/4sin(10Tf). Sketch x(t). (b) Apply Parseval's theorem for Fourier transforms to evaluate the integral af where > SOLVED: 1. (12) These two parts are independent. a) Find the inverse of the Fourier transform X(f)=je-f2/4sin(10Tf). Sketch x(t). (b) Apply Parseval's theorem for Fourier transforms to evaluate the integral af where >](https://cdn.numerade.com/ask_images/76c6ce7968c445f0a656c2ed98d25e9b.jpg)
SOLVED: 1. (12) These two parts are independent. a) Find the inverse of the Fourier transform X(f)=je-f2/4sin(10Tf). Sketch x(t). (b) Apply Parseval's theorem for Fourier transforms to evaluate the integral af where >
![DFT (Discrete Fourier Transform) calculator of a 4-sample signal, with 8 bit resolution on the real and imaginary parts : r/redstone DFT (Discrete Fourier Transform) calculator of a 4-sample signal, with 8 bit resolution on the real and imaginary parts : r/redstone](https://preview.redd.it/dft-discrete-fourier-transform-calculator-of-a-4-sample-v0-rqxb3civv0fa1.png?auto=webp&s=090a397b3543ab7fb52aa12dafd58e30b92b2f66)
DFT (Discrete Fourier Transform) calculator of a 4-sample signal, with 8 bit resolution on the real and imaginary parts : r/redstone
![Fourier Transforms with the Ti-Nspire CX CAS - www.TiNspireApps.com - Stepwise Math & Science Solutions Fourier Transforms with the Ti-Nspire CX CAS - www.TiNspireApps.com - Stepwise Math & Science Solutions](https://tinspireapps.com/blog/wp-content/uploads/2022/03/image.png)