1
GATE ECE 2006
MCQ (Single Correct Answer)
+1
-0.3
Consider the function $$f(t)$$ having laplace transform
$$F\left( s \right) = {{{\omega _0}} \over {{s^2} + \omega _0^2}},\,\,{\mathop{\rm Re}\nolimits} \left( s \right) > 0.$$ The final value of $$f(t)$$ would be ____________.
A
$$0$$
B
$$1$$
C
$$ - 1 - f\left( \infty \right) \le 1$$
D
$$\infty $$
2
GATE ECE 2006
MCQ (Single Correct Answer)
+1
-0.3
For the function of a complex variable w = lnz (where w = u + jv and z = x + jy) the u = constant lines get mapped in the z-plane as
A
set of radial straight lines
B
set of concentric circles
C
set of confocal hyperbola
D
set of confocal ellipses
3
GATE ECE 2006
MCQ (Single Correct Answer)
+1
-0.3
The value of the counter integral $$$\int\limits_{\left| {z - j} \right| = 2} {{1 \over {{z^2} + 4}}\,} dz\,\,in\,the\,positive\,sense\,is$$$
A
$${{j\pi } \over 2}$$
B
$${{ - \pi } \over 2}$$
C
$${{ - j\pi } \over 2}$$
D
$${\pi \over 2}$$
4
GATE ECE 2006
MCQ (Single Correct Answer)
+2
-0.6
For the differential equation $${{{d^2}y} \over {d{x^2}}} + {k^2}y = 0,$$ the boundary conditions are
(i) $$y=0$$ for $$x=0$$ and
(ii) $$y=0$$ for $$x=a$$
The form of non-zero solution of $$y$$ (where $$m$$ varies over all integrals ) are
A
$$y = \sum\limits_m {{A_m}\sin \left( {{{m\pi x} \over a}} \right)} $$
B
$$y = \sum\limits_m {{A_m}\cos \left( {{{m\pi x} \over a}} \right)} $$
C
$$y = \sum\limits_m {{A_m}\,\,{X^{{{m\pi x} \over a}}}} $$
D
$$y = \sum\limits_m {{A_m}\,\,{e^{{{m\pi x} \over a}}}} $$
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