Sketch the block diagram of the air conditioner systems, identifying the input, output, the controller and the plant. ?
Sketch the block diagram of the air conditioner systems, identifying the input, output, the controller and...
Block diagram of the system is given below. Design the C(s) block as PI (Proportional-Integral) controller such that it makes the system stable, damping coefficient of the characteristic equation=0.7, natural frequency=100 rad/sec. Sketch the output of the system vs time. (Input is unit step) Cis) 1/(s-5) + I Cis) 1/(s-5) + I
control system chosen is an Air Conditioner, answer the following: A) Draw a control block diagram for the entire system. B.) What happens to the system if you sent a maximum control signal to the system? [For example, if you left the throttle on the floor what would happen to the car? If you left the oven on and the thermometer broke what would happen?] C.) How does the system respond when the control system is working?
5. Referencing the following diagram, sketch a block diagram of a closed-loop, computer-controlled system, which includes transducer, transmitter, ADC / DAC, controller, actuator, communication 14.5 Marks final control element. 5. Referencing the following diagram, sketch a block diagram of a closed-loop, computer-controlled system, which includes transducer, transmitter, ADC / DAC, controller, actuator, communication 14.5 Marks final control element.
yce) Figure 1: Time-domain block diagram, with input u(t) and output y(t). For the block diagram shown in Figure find the system transfer function Y (s)/U(s).
yUCni ias the block diagram shown below. Controller Process Sensor (a) (5%) Sketch the root locus of the closed-loop system. (b) (5%) Determine the range of K that the closed-loop system is stable. (c) (5%) Find the percentage of overshoot and the steady state error due to a unit step input of the open loop system process. (d) (5%) Find the steady-state error due to a unit step input of the closed-loop syste as a function of the design parameter...
Problem 4) (20 Pts.) A Proportional controller is simply a gain block. In figure below, it is the block with gain 2nd order underdamped plant as shown. Kc which is behind the a) Simplify below block diagram to obtain the overall feedback system transfer funion)R(G) b) Choose Kc so that the overall feedback system transfer function G(s) has 50% overshoot due to a step input (called quarter decay ratio tuning) d) The feedback system transfer function Gs)- is faster than...
For the first figure please draw the functional block diagram, please keep it simple no need to solve it with functions The second picture is an example of how the solution should look like We were unable to transcribe this imageSwer the Following Questions: uestion No. (1) in the past, control systems used a human operator as part of a closed-loop control system. Sketch the block diagram of the valve control system shown in Figure (1). Human Output operator Met...
4. Consider the block diagram shown below where D(s) is a step disturbance input. D(s) Controller Plant R(s) + E(s) C(s) G2(s) Ideally you want your controller design to reject a step disturbance input at D(s). This means that in the steady state for D(s)-1, the value of Y(s) is unchanged (a) Ignoring the input R(s), what is the transfer function器in terms of Gi(s) and G2(s)? (b) For G1(s)Ks 2) and G2(s)0419 what is the steady state error resulting from...
Consider three systems with the following input-output relationships 6. Consider three systems with the following input-output relationships: { 4 0, odd System 1: y[n n even r[n] 10ar(n 2]3r[n - 1 System 2: yn + + System 3: yn x[3n] The interconnection diagram is at follows: System 1 System 2 System 3 Find the input-output relationship of the interconnected system. State the properties of the system (linear, stable, time invariant, memoryless, and causal). 6. Consider three systems with the following...
Problem 3. Simply the diagram below to a single block with input of X(s) and output of Y(s) H2(s) Y(s) X(s) G,(s) G2(s) G,(s) G4(s) 1,(s)