What does IFT mean?
IFT means Inverse fast Fourier Transform
This acronym/slang usually belongs to Technology, IT etc. category.
What is the abbreviation for Inverse fast Fourier Transform?
Inverse fast Fourier Transform can be abbreviated as IFT
Other shorthands for Inverse fast Fourier Transform are: IFFT
Other shorthands for Inverse fast Fourier Transform are: IFFT
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Most popular questions people look for before coming to this page
Q: A: |
What does IFT stand for? IFT stands for "Inverse fast Fourier Transform". |
Q: A: |
How to abbreviate "Inverse fast Fourier Transform"? "Inverse fast Fourier Transform" can be abbreviated as IFT. |
Q: A: |
What is the meaning of IFT abbreviation? The meaning of IFT abbreviation is "Inverse fast Fourier Transform". |
Q: A: |
What is IFT abbreviation? One of the definitions of IFT is "Inverse fast Fourier Transform". |
Q: A: |
What does IFT mean? IFT as abbreviation means "Inverse fast Fourier Transform". |
Q: A: |
What is shorthand of Inverse fast Fourier Transform? The most common shorthand of "Inverse fast Fourier Transform" is IFT. |
Abbreviations or Slang with similar meaning
- FFT-BPM - Fast Fourier Transform Beam Propagation Method
- FFT-MOT - Fast Fourier Transform Marching-On-In-Time method
- FFTAU - Fast Fourier Transform Arithmetic Unit
- FFTBM - Fast Fourier Transform Based Method
- FFTCU - Fast Fourier Transform Control Unit
- IFFTW - Inverse Fast Fourier Transform with Windowing
- TL-IFFT - Transmission Line Inverse Fast Fourier Transform
- FFT - Fast Fourier Transform
- FFTA - Fast Fourier Transform Analysis
- FFTS - Fast Fourier Transform Spectrometer
- IFFT - Inverse Fast Fourier Transform
- IDFT - Inverse Discrete Fourier Transform
- FFTZ - fast Fourier transform, zero-padded FFT
- IFWT - Inverse Fast Wavelet Transform
- FFTA - Fast Fourier Transform Analyzer
- FFTC - fast Fourier transform convolution
- FFTS - Fast Fourier Transform Spectrometry
- IFFT - Inverse Fast Fourier Trasform
- FFT/IFFT - FastFourier Transform/Inverse Fast Fourier Transform
- fftm - fast Fourier transform on multipoles