jravi
Junior Member level 3
Basic operations on matrices
2. Generation of various signals and sequences( periodic and aperiodic) such as unit impulse, unit step, square, saw tooth, triangular, sinusoidal, ramp, sinc function
3. Operations on signals and sequences such as addition, multiplication, scaling, shifting, folding, computation of energy and average power
4. Finding the even and odd parts of signal or sequence and real and imaginary parts of a signal
5. Convolution between signals and sequences
6. Autocorrelation and cross correlation between signals and sequences
7. Verification of linearity and time invariance properties of a given continuous/ discrete system
8. Computation of unit sample, unit step and sinusoidal responses of the given LTI system and verifying its physical realizability and stability properties
9. Gibbs phenomenon
10. Finding Fourier transform of a given signal and plotting its magnitude and phase spectrum
11. Waveform synthesis using Laplace transform
12. Locating zeros and poles, and plotting the pole –zero maps in S-plane and z-plane for the given transfer functions
13. Generation of Gaussian noise (real and complex), computation of its mean, M.S. values and its Skew, Kurtosis, and PSD, probability distribution function
14. Sampling theorem verification
15. Removal of noise by autocorrelation /cross correlation in a given signal corrupted by noise
16. Impulse response of raised cosine filter
17. Verification of Weiner- Khinchine relations
18. Checking a random process for stationary in wide sense
2. Generation of various signals and sequences( periodic and aperiodic) such as unit impulse, unit step, square, saw tooth, triangular, sinusoidal, ramp, sinc function
3. Operations on signals and sequences such as addition, multiplication, scaling, shifting, folding, computation of energy and average power
4. Finding the even and odd parts of signal or sequence and real and imaginary parts of a signal
5. Convolution between signals and sequences
6. Autocorrelation and cross correlation between signals and sequences
7. Verification of linearity and time invariance properties of a given continuous/ discrete system
8. Computation of unit sample, unit step and sinusoidal responses of the given LTI system and verifying its physical realizability and stability properties
9. Gibbs phenomenon
10. Finding Fourier transform of a given signal and plotting its magnitude and phase spectrum
11. Waveform synthesis using Laplace transform
12. Locating zeros and poles, and plotting the pole –zero maps in S-plane and z-plane for the given transfer functions
13. Generation of Gaussian noise (real and complex), computation of its mean, M.S. values and its Skew, Kurtosis, and PSD, probability distribution function
14. Sampling theorem verification
15. Removal of noise by autocorrelation /cross correlation in a given signal corrupted by noise
16. Impulse response of raised cosine filter
17. Verification of Weiner- Khinchine relations
18. Checking a random process for stationary in wide sense