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This article provides an in-depth analysis of key concepts in the Matlab FFT example, focusing on why the frequency axis ends at 500Hz, the importance of the Nyquist frequency, and the relationship between FFT output and frequency mapping. Using a signal example with a sampling frequency of 1000Hz, it explains frequency folding phenomena, single-sided spectrum plotting principles, and clarifies common misconceptions about FFT return values. The article combines code examples and theoretical explanations to offer a clear guide for beginners.

This article provides a comprehensive guide to designing and implementing digital lowpass filters using the SciPy library. Through a practical case study of heart rate signal filtering, it delves into key concepts including Nyquist frequency, digital vs. analog filters, and frequency unit conversion. Complete code implementations and frequency response analysis are provided to help readers master the core principles and practical techniques of filter design.

This article explores methods for computing power spectral density (PSD) of signals using Fast Fourier Transform (FFT) in Python. Through a case study of a video frame signal with 301 data points, it explains how to correctly set frequency axes, calculate PSD, and visualize results. Focusing on NumPy's fft module and matplotlib for visualization, it provides complete code implementations and theoretical insights, helping readers understand key concepts like sampling rate and Nyquist frequency in practical signal processing applications.

This article provides a comprehensive guide to implementing Butterworth bandpass filters using Python's Scipy library. Starting from fundamental filter principles, it systematically explains parameter selection, coefficient calculation methods, and practical applications. Complete code examples demonstrate designing filters of different orders, analyzing frequency response characteristics, and processing real signals. Special emphasis is placed on using second-order sections (SOS) format to enhance numerical stability and avoid common issues in high-order filter design.