Question:
A function \( x(t) \) is said to have half-wave odd symmetry if
A function \( x(t) \) is said to have half-wave odd symmetry if
Show Hint
Half-wave odd symmetry means that the function is an odd function when shifted by half of its period.
Updated On: May 5, 2025
- \( x(t) = -x\left[t \pm \frac{T}{2}\right] \)
- \( x(t) = x\left[t - \frac{T}{4}\right] \)
- \( x(t) = x\left[t - \frac{T}{2}\right] \)
- \( x(t) = -x\left[t + \frac{T}{4}\right] \)
Hide Solution
Verified By Collegedunia
The Correct Option is A
Solution and Explanation
A function \( x(t) \) has half-wave odd symmetry if it satisfies the condition \( x(t) = -x\left[t \pm \frac{T}{2}\right] \), where \( T \) is the period of the function. This symmetry indicates that the function is odd with respect to a half-period shift. Therefore, the correct answer is option (1).
Was this answer helpful?
0
0
Top Questions on Digital Signal Processing
- The continuous-time unit impulse signal is applied as an input to a continuous-time linear time-invariant system \( \mathcal{S} \). The output is observed to be the continuous-time unit step signal \( u(t) \). Which one of the following statements is true?
- GATE EE - 2025
- Signals and Systems
- Digital Signal Processing
Let \( G(s) = \frac{1}{(s+1)(s+2)} \). Then the closed-loop system shown in the figure below is:
- GATE EE - 2025
- Signals and Systems
- Digital Signal Processing
- Let continuous-time signals \( x_1(t) \) and \( x_2(t) \) be defined as:
\[ x_1(t) = \begin{cases} 1, & t \in [0, 1] \\ 2 - t, & t \in [1, 2] \\ 0, & \text{otherwise} \end{cases} \quad \text{and} \quad x_2(t) = \begin{cases} t, & t \in [0, 1] \\ 2 - t, & t \in [1, 2] \\ 0, & \text{otherwise} \end{cases} \]
Consider the convolution \( y(t) = x_1(t) * x_2(t) \). Then
\[ \int_{-\infty}^{\infty} y(t)\,dt =\ ? \]- GATE EE - 2025
- Signals and Systems
- Digital Signal Processing
- A continuous time periodic signal \( x(t) \) is given by: \[ x(t) = 1 + 2\cos(2\pi t) + 2\cos(4\pi t) + 2\cos(6\pi t) \] If \( T \) is the period of \( x(t) \), then evaluate: \[ \frac{1}{T} \int_0^T |x(t)|^2 \, dt \quad \text{(round off to the nearest integer).} \]
- GATE EE - 2025
- Signals and Systems
- Digital Signal Processing
The open-loop transfer function of the system shown in the figure is: \[ G(s) = \frac{K s (s + 2)}{(s + 5)(s + 7)} \] For \( K \geq 0 \), which of the following real axis point(s) is/are on the root locus?
- GATE EE - 2025
- Signals and Systems
- Digital Signal Processing
View More Questions
Questions Asked in AP PGECET exam
The variance for continuous probability function \(f(x) = x^2 e^{-x}\) when \(x \ge 0\) is
- AP PGECET - 2024
- Probability and Statistics
Consider the loop transfer function \(\frac {K(s+6)}{(s+3)(s+5)}\). In the root locus diagram the centroid will be located at:
- AP PGECET - 2024
- Transfer function
When nuclear radiations pass through, gas ionization is produced. This is the principle of which of the following detectors?
- AP PGECET - 2024
- Instrumentation
If \(f = \text{Tan}^{-1}(xy)\) then \((\frac{\partial f}{\partial x})_{(1,2)}\) = _____ .
- AP PGECET - 2024
- Calculus
- Line of Regression of y on x
- AP PGECET - 2024
- Linear regression
View More Questions