Bode Diagram & Frequency Response Calculator
Analyze Magnitude and Phase Shift for First-Order Systems
Frequency Response Results:
Magnitude (Linear)
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Magnitude (dB)
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Phase Shift (Degrees)
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Phase Lag (Radians)
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Understanding the Bode Diagram
A Bode Diagram is a powerful tool used in control systems and electronic engineering to represent the frequency response of a system. It consists of two separate plots: the Magnitude Plot (expressed in decibels) and the Phase Plot (expressed in degrees), both plotted against a logarithmic frequency scale.
Key Concepts of this Calculator:
- Gain (K): The DC gain of the system at zero frequency.
- Cut-off Frequency (fc): The frequency where the power drops to half its maximum value (the -3dB point).
- Magnitude (dB): Calculated as 20 × log10(A), where A is the ratio of output to input amplitude.
- Phase Shift: Indicates the time delay between the input and output signal, measured in degrees or radians.
The Mathematical Model
This calculator assumes a standard first-order low-pass transfer function:
H(s) = K / (1 + s/ωc).
When you input a specific operating frequency, the tool calculates exactly where on the Bode plot that point would fall.
Example Calculation:
If you have a system with a gain of 1 and a cut-off frequency of 1,000 Hz, and you test it at 1,000 Hz:
- The magnitude will be approximately -3.01 dB.
- The phase shift will be exactly -45 degrees.
- This confirms the definition of the corner (cut-off) frequency for a first-order system.