GATE-2012 ECE Q34 (signals)

Question 34 on signals from GATE (Graduate Aptitude Test in Engineering) 2012 Electronics and Communication Engineering paper.

Q34. Consider the differential equation

${\frac{d^2y(t)}{dt}+2\frac{dy(t)}{dt}+y(t) = \delta(t)}$ with ${y(t)|}_{t=0^{-}}=-2$ and ${\frac{dy}{dt}\|_{t=0^{-}}=0}$

The numerical value of

${\frac{dy}{dt}|}_{t=0^{+}}$ is

(A) -2

(B) -1

(C) 0

(D) 1

Solution

Let us Laplace transform to find $y(t)$ and later

The Laplace transform of function’s derivative is

$F(s) = L\{f(t)\}(s) = \int_{0^-}^{\infty}e^{-st}f(t)dt$ , where $s=\sigma + j\omega$ with real numbers $\sigma$ and $\omega$ .

Using integration by parts,

$\begin{array}{lll}F(s)&=&\int_{0^-}^{\infty}e^{-st}f(t)dt&\\&=&\[f(t)\frac{e^{-st}}{-s}\]_{0^-}^{\infty}\mbox{ }-\int_{0^-}^{\infty}\frac{df(t)}{dt}\frac{e^{-st}}{-s}dt\\&=&\frac{f(0^-)}{s}\mbox{ }+\frac{1}{s}\underbrace{\int_{0^-}^{\infty}e^{-st}f'(t)dt}_{L\{f'(t)\}}\end{array}$ .

Rearranging,

${\begin{array}{lll}L\{f'(t)\}&=&sF(s)-f$0^-$\end{array}}$ .

Extending this to find the Laplace Transform of the second derivative of the function,

${{\begin{array}{lll}L\{f''(t)\}&=&sL\{f'(t)\}-f'$0^-$\\&=&s$F(s)-f\(0^-$\)-f'$0^-$\\&=&sF(s)-sf$0^-$-f'$0^-$\end{array}}$ .

Coming back to the problem,

${\frac{d^2y(t)}{dt}+2\frac{dy(t)}{dt}+y(t) = \delta(t)}$

Taking Laplace transform,

$\begin{array}{lll}s^2Y(s)-sy(0^-)-y'(0^-)+2\[sY(s)-y(0^-)\]+Y(s)&=&1\\[s^2+2s+1\]Y(s)-\[s+2\]y(0^-)-y'(0^-)&=&1\\[s^2+2s+1\]Y(s)-(\[s+2\]*-2)-0&=&1\\[s^2+2s+1\]Y(s)+2s+4&=&1\\Y(s)&=&\frac{-2s-3}{s^2+2s+1}\end{array}$ .

To find the inverse Laplace transform, let us revisit the Laplace transform for some simple functions.

For $f(t) = e^{-t}$ , the Laplace transform is,
$\begin{array}{lll}F(s)&=&\int_0^{\infty}e^{-st}e^{-t}u(t)dt\\&=&\int_0^{\infty}e^{-(s+1)t}dt\\&=&\frac{1}{s+1}\end{array}$ .

From the discussion in the post on Q11 in GATE 2012,

$\begin{array}{lll}L\{te^{-t}\}(s)=L\{tf(t)\}(s)&=&-F'(s)\\&=&-\frac{d}{ds}$\frac{1}{s+1}$\\&=&\frac{1}{(s+1)^2}\end{array}$ .

Also from the earlier discussion in this post,

${\begin{array}{lll}L\{\frac{d}{dt}te^{-t}\}(s)&=&sF(s)-f$0^-$\\&=&\frac{s}{(s+1)^2}\end{array}}$

Applying the above equations to find the inverse Laplace transform

$\begin{array}{lll}Y(s)&=&\frac{-2s}{(s+1)^2}+\frac{-3}{(s+1)^2}\\y(t)&=&-2\frac{d}{dt}\[te^{-t}\] + -3te^{-t}\\&=&+2te^{-t}-2e^{-t}-3te^{-t}\\&=&-2e^{-t}-te^{-t}\end{array}$ .

Taking the differential,

$\begin{array}{lll}\frac{dy(t)}{dt}&=&\frac{d}{dt}\(-2e^{-t}-te^{-t})\\&=&2e^{-t}+te^{-t}-e^{-t}\\&=&e^{-t}+te^{-t}\end{array}$ .

Plugging in ${t=0^{+}}$ ,

$\begin{array}{lll}\frac{dy}{dt}|_{t=0^{+}}&=&e^{-t}+te^{-t}|_{t=0^+}&=&1\end{array}$

Based on the above, the right choice is (D) 1

References

[1] GATE Examination Question Papers [Previous Years] from Indian Institute of Technology, Madras http://gate.iitm.ac.in/gateqps/2012/ec.pdf

[2] Wiki entry on Laplace transform of function’s derivative

[3] post on Q11 in GATE 2012

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GATE-2012 ECE Q34 (signals)

Q34. Consider the differential equation

${\frac{d^2y(t)}{dt}+2\frac{dy(t)}{dt}+y(t) = \delta(t)}$ with ${y(t)|}_{t=0^{-}}=-2$ and ${\frac{dy}{dt}\|_{t=0^{-}}=0}$

The numerical value of

${\frac{dy}{dt}|}_{t=0^{+}}$ is

(A) -2

(B) -1

(C) 0

(D) 1

Solution

References

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Q34. Consider the differential equation

with and

The numerical value of

is

(A) -2

(B) -1

(C) 0

(D) 1

Solution

References

Leave a Reply Cancel reply

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${\frac{d^2y(t)}{dt}+2\frac{dy(t)}{dt}+y(t) = \delta(t)}$ with ${y(t)|}_{t=0^{-}}=-2$ and ${\frac{dy}{dt}\|_{t=0^{-}}=0}$

${\frac{dy}{dt}|}_{t=0^{+}}$ is