GATE ECE 2024 | GATE ECE Year Wise Previous Years Questions

GATE ECE 2024

MCQ (More than One Correct Answer)

-0.33

For a causal discrete-time LTI system with transfer function

$H(z) = \frac{2z^2 + 3}{\left(z + \frac{1}{3}\right)\left(z - \frac{1}{3}\right)}$

which of the following statements is/are true?

The system is stable.

The system is a minimum phase system.

The initial value of the impulse response is 2.

The final value of the impulse response is 0.

GATE ECE 2024

MCQ (Single Correct Answer)

-1.33

Consider two continuous time signals $x(t)$ and $y(t)$ as shown below

GATE ECE 2024 Signals and Systems - Fourier Transform Question 1 English

If $X(f)$ denotes the Fourier transform of $x(t)$, then the Fourier transform of $y(t)$ is ______.

$ -4X(4f)e^{-j\pi f}$

$ -4X(4f)e^{-j4\pi f}$

$ -\frac{1}{4}X(f/4)e^{-j\pi f}$

$ -\frac{1}{4}X(f/4)e^{-j4\pi f}$

GATE ECE 2024

MCQ (Single Correct Answer)

-1.33

A continuous time signal $x(t) = 2 \cos(8 \pi t + \frac{\pi}{3})$ is sampled at a rate of 15 Hz. The sampled signal $x_s(t)$ when passed through an LTI system with impulse response

$h(t) = \left( \frac{\sin 2 \pi t}{\pi t} \right) \cos(38 \pi t - \frac{\pi}{2})$

produces an output $x_o(t)$. The expression for $x_o(t)$ is ______.

$15 \sin(38 \pi t + \frac{\pi}{3})$

$15 \sin(38 \pi t - \frac{\pi}{3})$

$15 \cos(38 \pi t - \frac{\pi}{6})$

$15 \cos(38 \pi t + \frac{\pi}{6})$

GATE ECE 2024

MCQ (More than One Correct Answer)

-1.33

The radian frequency value(s) for which the discrete time sinusoidal signal $x[n] = A \cos(\Omega n + \pi/3)$ has a period of 40 is/are __.

0.15$\pi$

0.225$\pi$

0.3$\pi$

0.45$\pi$

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