Process Dynamics and Control, 4e
Process Dynamics and Control, 4e
4th Edition
ISBN: 9781119285915
Author: Seborg
Publisher: WILEY
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Chapter 3, Problem 3.13E
Interpretation Introduction

(a)

Interpretation:

The response of the given system is to be estimated to be oscillatory or not for an arbitrary change in u.

Concept introduction:

For a function f(t), the Laplace transform is given by,

F(s)=L[f(t)]=0f(f)estdt   ....... (1)

Here, F(s) represents the Laplace transform, s is a variable that is complex and independent, f(t) is any function of time which is being transformed, and L is the operator which is defined by an integral.

f(t) is calculated by taking inverse Laplace transform of the function F(s).

PFE is the partial fraction expansion is the method of expanding the denominator of a fraction into simpler terms.

Laplace transform of higher-order derivatives is given by:

L(dnfdtn)=snF(s)sn1f(0)sn2f(1)(0)sf(n2)(0)f(n1)(0)   ....... (2)

For the general form of the transfer function;

Y(s)X(s)=1τ2s2+2τζs+1

The response of the transfer will be underdamped or oscillatory if ζ<1, critically damped if ζ=1, and overdamped or nonoscillatory if ζ>1.

Interpretation Introduction

(b)

Interpretation:

The steady-state value of yis to be calculated when

u(t2)=1.

Concept introduction:

The value of Kp, steady-state value is calculated by s=0 in the transfer function for the unit step disturbance, that is,

lims0[sY(s)]=Kp

Interpretation Introduction

(c)

Interpretation:

The value of y(t) for a step-change in u is to be calculated.

Concept introduction:

For a function f(t), the Laplace transform is given by,

F(s)=L[f(t)]=0f(f)estdt   ....... (1)

Here, F(s) represents the Laplace transform, s is a variable that is complex and independent, f(t) is any function of time which is being transformed, and L is the operator which is defined by an integral.

f(t) is calculated by taking inverse Laplace transform of the function F(s).

PFE is the partial fraction expansion is the method of expanding the denominator of a fraction into simpler terms.

Laplace transform of higher-order derivatives is given by:

L(dnfdtn)=snF(s)sn1f(0)sn2f(1)(0)sf(n2)(0)f(n1)(0)   ....... (2)

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Q1: Consider the following transfer function G(s) 5e-s 15s +1 1. What is the study state gain 2. What is the time constant 3. What is the value of the output at the end if the input is a unit step 4. What is the output value if the input is an impulse function with amplitude equals to 3, at t=7 5. When the output will be 3.5 if the input is a unit step
give me solution math not explin
give me solution math not explin
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