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Test: BIBO Stability - Electrical Engineering (EE) MCQ


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10 Questions MCQ Test - Test: BIBO Stability

Test: BIBO Stability for Electrical Engineering (EE) 2024 is part of Electrical Engineering (EE) preparation. The Test: BIBO Stability questions and answers have been prepared according to the Electrical Engineering (EE) exam syllabus.The Test: BIBO Stability MCQs are made for Electrical Engineering (EE) 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for Test: BIBO Stability below.
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Test: BIBO Stability - Question 1

Which of the following systems is stable?

Detailed Solution for Test: BIBO Stability - Question 1

Stability implies that a bounded input should give a bounded output. In a,b,d there are regions of x, for which y reaches infinity/negative infinity. Thus the sin function always stays between -1 and 1, and is hence stable.

Test: BIBO Stability - Question 2

State whether the integrator system is stable or not.

Detailed Solution for Test: BIBO Stability - Question 2

The integrator system keep accumulating values and hence may become unbounded even for a bounded input in case of an impulse.

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Test: BIBO Stability - Question 3

 For what values of k is the following system stable, y = (k2 – 3k -4)log(x) + sin(x)?

Detailed Solution for Test: BIBO Stability - Question 3


Test: BIBO Stability - Question 4

For a bounded function, is the integral of the odd function from -infinity to +infinity defined and finite?

Detailed Solution for Test: BIBO Stability - Question 4

The odd function will have zero area over all real time space.

Test: BIBO Stability - Question 5

When a system is such that the square sum of its impulse response tends to infinity when summed over all real time space,

Detailed Solution for Test: BIBO Stability - Question 5

The system turns out to be unstable. Only if it is zero/finite it is stable.

Test: BIBO Stability - Question 6

Is the system h(t) = exp(-jwt) stable?

Detailed Solution for Test: BIBO Stability - Question 6

 If w is a complex number with Im(w) < 0, we could have an unstable situation as well. Hence, we cannot conclude [no constraints on w given].

Test: BIBO Stability - Question 7

Is the system h(t) = exp(-t) stable?

Detailed Solution for Test: BIBO Stability - Question 7

The integral of the system from -inf to +inf equals to a finite quantity, hence it will be a stable system.
If the ouput is constant, like: h(t) = exp(-jwt) than we can say w is a complex number with Im(w) < 0, we could have an unstable situation as well. Hence, we cannot conclude [no constraints on w given].

Test: BIBO Stability - Question 8

Comment on the stability of the following system, y[n] = n*x[n-1].

Detailed Solution for Test: BIBO Stability - Question 8

Even if we have a bounded input as n tends to inf, we will have an unbounded output. Hence, the system resolves to be an unstable one.

Test: BIBO Stability - Question 9

What is the consequence of marginally stable systems?

Detailed Solution for Test: BIBO Stability - Question 9

The system will be a purely oscillatory system with no damping involved.

Test: BIBO Stability - Question 10

A control system represent by differential equation  where r(t) is the input and c(t) is output. The system is excited with input of unit the step function. The response is similar to the waveform

Detailed Solution for Test: BIBO Stability - Question 10

Given system equation

Taking Laplace transform

16s2c(s) – 8s c(s) + 1c(s) = R(s)
Transfer function 
Since the poles are positive real, the system is unstable and the output tends towards x.
∴ Option 4 is the suitable response.

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