## Phase Angle of Low Pass RC Filter Solution

STEP 0: Pre-Calculation Summary
Formula Used
Phase Angle = 2*arctan(2*pi*Frequency*Resistance*Capacitance)
θ = 2*arctan(2*pi*f*R*C)
This formula uses 1 Constants, 3 Functions, 4 Variables
Constants Used
pi - Archimedes' constant Value Taken As 3.14159265358979323846264338327950288
Functions Used
tan - Trigonometric tangent function, tan(Angle)
ctan - Trigonometric cotangent function, ctan(Angle)
arctan - Inverse trigonometric tangent function, arctan(Number)
Variables Used
Phase Angle - (Measured in Radian) - Phase Angle is the angular displacement of a sinusoidal waveform from a reference point or time.
Frequency - (Measured in Hertz) - Frequency is the rate at which an event occurs or is repeated over a period of time.
Resistance - (Measured in Ohm) - Resistance is the opposition to current flow in an electrical circuit.
Capacitance - (Measured in Farad) - Capacitance is the ability of a material object or device to store electric charge.
STEP 1: Convert Input(s) to Base Unit
Frequency: 60 Hertz --> 60 Hertz No Conversion Required
Resistance: 149.9 Ohm --> 149.9 Ohm No Conversion Required
STEP 2: Evaluate Formula
Substituting Input Values in Formula
θ = 2*arctan(2*pi*f*R*C) --> 2*arctan(2*pi*60*149.9*80)
Evaluating ... ...
θ = 3.1415922111978
STEP 3: Convert Result to Output's Unit
3.1415922111978 Radian -->179.99997465284 Degree (Check conversion here)
179.99997465284 180 Degree <-- Phase Angle
(Calculation completed in 00.004 seconds)
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## < 15 Power Filters Calculators

Cut-off Frequency in Bandpass Filter for Parallel RLC Circuit
Cutoff Frequency = (1/(2*Resistance*Capacitance))+(sqrt((1/(2*Resistance*Capacitance))^2+1/(Inductance*Capacitance)))
Corner Frequency in Bandpass Filter for Series RLC Circuit
Corner Frequency = (Resistance/(2*Inductance))+(sqrt((Resistance/(2*Inductance))^2+1/(Inductance*Capacitance)))
Phase Angle of Low Pass RC Filter
Phase Angle = 2*arctan(2*pi*Frequency*Resistance*Capacitance)
Keying Parameter of Parallel RLC Bandpass Filter
Keying Parameter = ((Inductance+Leakage Inductance)*Cutoff Frequency)/(2*DC Voltage)
Resonant Frequency of Passive Filter
Resonant Frequency = 1/(2*pi*sqrt(Inductance*Capacitance))
Tuned Factor of Hybrid Filter
Tuned Factor = (Angular Frequency-Angular Resonant Frequency)/Angular Resonant Frequency
Voltage across Passive Filter Capacitor
Voltage across the Passive Filter Capacitor = Filter Transfer Function*Fundamental Frequency Component
Angular Resonant Frequency of Passive Filter
Angular Resonant Frequency = (Resistance*Quality Factor)/Inductance
Quality Factor of Passive Filter
Quality Factor = (Angular Resonant Frequency*Inductance)/Resistance
Resistance of Passive Filter
Resistance = (Angular Resonant Frequency*Inductance)/Quality Factor
Slope of Triangular Waveform of Active Power Filter
Triangular Waveform Slope = 4*Triangular Waveform Amplitude*Triangular Waveform Frequency
Gain of Active Power Filter
Active Power Filter Gain = Voltage Harmonic Waveform/Harmonic Current Component
Gain of Converter of Active Power Filter
Gain of Converter = DC Voltage/(2*Triangular Waveform Amplitude)
Amplitude of Active Power Filter
Triangular Waveform Amplitude = DC Voltage/(2*Gain of Converter)
Keying Index of Parallel RLC Bandpass Filter
Keying Index = Cutoff Frequency*Keying Parameter

## Phase Angle of Low Pass RC Filter Formula

Phase Angle = 2*arctan(2*pi*Frequency*Resistance*Capacitance)
θ = 2*arctan(2*pi*f*R*C)

## What is the purpose of a low-pass RC filter?

A low-pass RC filter is a type of electronic filter that allows low-frequency signals to pass through while blocking high-frequency signals. It is commonly used in various applications, including audio processing, signal conditioning, and power electronics.

The purpose of a low-pass RC filter can be summarized as follows:

Eliminating Noise and Interference: Low-pass RC filters are effective in removing unwanted high-frequency noise and interference from a signal. This is particularly useful in audio applications where high-frequency components can cause distortions and unpleasant sounds.

## How to Calculate Phase Angle of Low Pass RC Filter?

Phase Angle of Low Pass RC Filter calculator uses Phase Angle = 2*arctan(2*pi*Frequency*Resistance*Capacitance) to calculate the Phase Angle, The Phase Angle of Low Pass RC Filter formula is defined as the angle between the voltage across the capacitor and the voltage across the resistor at a particular frequency. Phase Angle is denoted by θ symbol.

How to calculate Phase Angle of Low Pass RC Filter using this online calculator? To use this online calculator for Phase Angle of Low Pass RC Filter, enter Frequency (f), Resistance (R) & Capacitance (C) and hit the calculate button. Here is how the Phase Angle of Low Pass RC Filter calculation can be explained with given input values -> 10313.24 = 2*arctan(2*pi*60*149.9*80).

### FAQ

What is Phase Angle of Low Pass RC Filter?
The Phase Angle of Low Pass RC Filter formula is defined as the angle between the voltage across the capacitor and the voltage across the resistor at a particular frequency and is represented as θ = 2*arctan(2*pi*f*R*C) or Phase Angle = 2*arctan(2*pi*Frequency*Resistance*Capacitance). Frequency is the rate at which an event occurs or is repeated over a period of time, Resistance is the opposition to current flow in an electrical circuit & Capacitance is the ability of a material object or device to store electric charge.
How to calculate Phase Angle of Low Pass RC Filter?
The Phase Angle of Low Pass RC Filter formula is defined as the angle between the voltage across the capacitor and the voltage across the resistor at a particular frequency is calculated using Phase Angle = 2*arctan(2*pi*Frequency*Resistance*Capacitance). To calculate Phase Angle of Low Pass RC Filter, you need Frequency (f), Resistance (R) & Capacitance (C). With our tool, you need to enter the respective value for Frequency, Resistance & Capacitance and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well. Let Others Know