This question is related to Operating system
The input- output device vary in many dimensions. Explain these dimensions with examples
This question is related to Operating system The input- output device vary in many dimensions. Explain...
P 1.3 A device has the output, y, and input, x, which are related by y = 2x + x Obtain a linearized model (a) When the operating point is x=1. (b) When the operating point is x = 2.
5. 10pt] The input and output of a stable and causal LTI system are related by the differential dt2 dt Find the impulse response of this system
The output of a discrete-time system is related to the input by Y(n) x(n is 1 1) = - a. Find the transfer function of the system. b. If the input X(n) is stationary with E(X(n)) = 0 Rxx(k) = { 1, for k = 0 for k 0 0 find Sy(f) and EfY'(n) γγ
Consider a causal LTI system whose input xn] and output y[n] are related by the differenoe equation yn In--n] a. Find the impulse response of the system (without using any transform). (5 marks) b. Using convolution determine yin, 1f XIn = 1 un.(6 marks Consider a causal LTI system whose input xn] and output y[n] are related by the differenoe equation yn In--n] a. Find the impulse response of the system (without using any transform). (5 marks) b. Using convolution...
One of the most basic tasks of an operating system is to take care of input/output functions, which let other programs communicate with the computer hardware. the I/O functions take requests from the software the user run (the application software) and translate them into low-level requests that the hardware can understand and carry out. In general, an operating system serves as an interface between application software and hardware. discuss any five I/O tasks performed by the Operating System.
8. A separation unit has two input and two output streams; the system is operating at steady state. The first input stream has a flow of 185 kg/min with 35.0% w/w methanol; the second input stream has a flow of 100 kg/min with 44.0% w/w methanol. One of the desired output streams will have a flow of 85 kg/min with 75.0% w/w methanol. What is the flow rate and percent of methanol in the second output stream?
The input x(t) and output y(t) of a causal LTI system are related through the block-diagram representation shown in Figure P 9.35. Determine a differential equation relating y(t) and x(t). is this system stable?
The input and output of a causal LTI system are related by the diff. eq: d^2y(t)/dt^2 + 5dy(t)/dt + 6y(t) = 2x(t) a. Find impulse response of the system b. What is the response of the system if 2x(t) = e^(-2t)u(t)
Problem 3. The input and the output of a stable and causal LTI system are related by the differential equation dy ) + 64x2 + 8y(t) = 2x(t) dt2 dt i) Find the frequency response of the system H(jw) [2 marks] ii) Using your result in (i) find the impulse response of the system h(t). [3 marks] iii) Find the transfer function of the system H(s), i.e. the Laplace transform of the impulse response [2 marks] iv) Sketch the pole-zero...
A system is BIBO (bounded-input, bounded-output) stable if every bounded input X(t) yields a bounded output y(t). A system is NOT BIBO stable if there exists any bounded input that results in an unbounded output. By "bounded", we mean that the magnitude of the signal is always less than some finite number. (The signal x(t)=sin(t) would be considered a bounded signal, but X(t)t would not be a bounded signal.) Signals that are infinite in time, but with a magnitude that...