Question E: Convolution and system stability Zero-state response of a system can be found by using convolution of the input signal and unit impulse response:

Need Assistance with Part E.

B. Zero input response A system is specified by the following equation y[n]--y[n-1]--ly-2] = 2x[n] Use filtic command in MATLAB to define the initial conditions. Then use filter command to find and sketch the zero input response of the system for y-1 1 and y[-2]2 C. Zero-state response Use MATLAB to determine and sketch the zero-state response of the system in part B to the input x[n] given below, 1. 2tn x[n] = 2 cos (-) ( u [n]-u [n-10) E. Convolution and system stability Zero-state response of a system can be found by using convolution of the input signal and unit impulse response: Use conv command from MATLAB to compute the zero-state response of the system defined in part B to the input x[n] in part C 1. B. Zero input response A system is specified by the following equation y[n]--y[n-1]--ly-2] = 2x[n] Use filtic command in MATLAB to define the initial conditions. Then use filter command to find and sketch the zero input response of the system for y-1 1 and y[-2]2 C. Zero-state response Use MATLAB to determine and sketch the zero-state response of the system in part B to the input x[n] given below, 1. 2tn x[n] = 2 cos (-) ( u [n]-u [n-10) E. Convolution and system stability Zero-state response of a system can be found by using convolution of the input signal and unit impulse response: Use conv command from MATLAB to compute the zero-state response of the system defined in part B to the input x[n] in part C 1