Practice Sampling Of Continuous-time Signals (4.6.1) - Fourier Transform Analysis of Continuous-Time Aperiodic Signals
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Sampling of Continuous-Time Signals

Practice - Sampling of Continuous-Time Signals

Learning

Practice Questions

Test your understanding with targeted questions

Question 1 Easy

What does the sampling period (Ts) represent?

💡 Hint: Think about the time taken for one sample.

Question 2 Easy

How is the sampling frequency (fs) calculated?

💡 Hint: How many samples are taken per second?

4 more questions available

Interactive Quizzes

Quick quizzes to reinforce your learning

Question 1

What does the sampling period (Ts) define?

Time interval between samples
Frequency of sampling
Amplitude of the signal

💡 Hint: Think of it as the duration for one sample.

Question 2

True or False: The sampling frequency (fs) is the inverse of the sampling period (Ts).

True
False

💡 Hint: How are these two terms related?

1 more question available

Challenge Problems

Push your limits with advanced challenges

Challenge 1 Hard

A continuous-time signal x(t) has frequency components up to 800 Hz. What is the minimum sampling frequency required to avoid aliasing?

💡 Hint: Recall the Nyquist Sampling Theorem.

Challenge 2 Hard

If a signal is sampled at 1000 Hz, calculate the maximum frequency that can be accurately represented.

💡 Hint: Think about the definition of Nyquist frequency.

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Reference links

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