Devyaani Garg
Shiv Nadar University (SNU), Greater Noida
Devyaani Garg has created this Calculator and 50+ more calculators!
Nikita Suryawanshi
Vellore Institute of Technology (VIT), Vellore
Nikita Suryawanshi has verified this Calculator and 25+ more calculators!

11 Other formulas that you can solve using the same Inputs

RMS output voltage of single phase semi-converter with highly inductive load
RMS output voltage=(Peak input voltage/(2^0.5))*((180-Delay angle of thyristor)/180+(0.5/pi)*sin(2*Delay angle of thyristor))^0.5 GO
RMS output voltage of single phase thyristor converter with resistive load
RMS output voltage=(Peak input voltage/2)*((180-Delay angle of thyristor)/180+(0.5/pi)*sin(2*Delay angle of thyristor))^0.5 GO
Real power for constant load current in terms of V<sub>m</sub>
Real power=2*Peak input voltage*Constant load current*(cos(Delay angle of thyristor))/pi GO
Average output voltage of single phase thyristor converter with resistive load
Average output voltage=(Peak input voltage/(2*pi))*(1+cos(Delay angle of thyristor)) GO
DC output voltage for first converter
Average output voltage=2*Peak input voltage*(cos(Delay angle of first converter))/pi GO
Average output voltage of a single phase full converter with highly inductive load
Average output voltage=(2*Peak input voltage/(pi))*(cos(Delay angle of thyristor)) GO
Average output voltage of single phase semi-converter with highly inductive load
Average output voltage=(Peak input voltage/pi)*(1+cos(Delay angle of thyristor)) GO
Apparent power for constant load current in terms of V<sub>m</sub>
Apparent power=Constant load current*Peak input voltage/(2^0.5) GO
Maximum output voltage of a single phase semi-converter with highly inductive load
Maximum output voltage=2*Peak input voltage/pi GO
Maximum output voltage of a single phase full converter with highly inductive load
Maximum output voltage=2*Peak input voltage/pi GO
Maximum output voltage of single phase thyristor converter with resistive load
Maximum output voltage=Peak input voltage/pi GO

6 Other formulas that calculate the same Output

RMS output voltage
RMS output voltage=((3)^0.5)*Peak input voltage*((0.75-(3*Delay angle of thyristor/720)+(0.5*(sin(2*Delay angle of thyristor))))^0.5) GO
RMS output voltage of single phase semi-converter with highly inductive load
RMS output voltage=(Peak input voltage/(2^0.5))*((180-Delay angle of thyristor)/180+(0.5/pi)*sin(2*Delay angle of thyristor))^0.5 GO
RMS output voltage of single phase thyristor converter with resistive load
RMS output voltage=(Peak input voltage/2)*((180-Delay angle of thyristor)/180+(0.5/pi)*sin(2*Delay angle of thyristor))^0.5 GO
RMS output voltage for continuous load current
RMS output voltage=((3)^0.5)*Peak input voltage*(((1/6)+(0.216/pi)*(cos(2*Delay angle of thyristor)))^0.5) GO
RMS output voltage
RMS output voltage=((6)^0.5)*Peak input voltage*((0.25+0.65*(cos(2*Delay angle of thyristor))/pi)^0.5) GO
RMS output voltage
RMS output voltage=((Input voltage/2)) GO

RMS output voltage of a single phase full converter with highly inductive load Formula

RMS output voltage=(Peak input voltage/(2^0.5))
V<sub>rms</sub>=(V<sub>m</sub>/(2^0.5))
More formulas
Average output voltage of single phase thyristor converter with resistive load GO
Maximum output voltage of single phase thyristor converter with resistive load GO
Normalized voltage of a single phase thyristor converter with resistive load GO
RMS output voltage of single phase thyristor converter with resistive load GO
Average output voltage of single phase semi-converter with highly inductive load GO
Maximum output voltage of a single phase semi-converter with highly inductive load GO
Normalized output voltage of a single phase semi-converter with highly inductive load GO
RMS output voltage of single phase semi-converter with highly inductive load GO
Average output voltage of a single phase full converter with highly inductive load GO
Maximum output voltage of a single phase full converter with highly inductive load GO
Normalized output voltage of single phase full converter with highly inductive load GO

What is meaning of root mean square?

The root mean square value of a quantity is the square root of the mean value of the squared values of the quantity taken over an interval. AC voltages are always given as RMS values because this allows a sensible comparison to be made with steady DC voltages.

How to Calculate RMS output voltage of a single phase full converter with highly inductive load?

RMS output voltage of a single phase full converter with highly inductive load calculator uses RMS output voltage=(Peak input voltage/(2^0.5)) to calculate the RMS output voltage, The RMS output voltage of a single phase full converter with highly inductive load formula is the root mean square value of the average output voltage of the converter. RMS output voltage and is denoted by Vrms symbol.

How to calculate RMS output voltage of a single phase full converter with highly inductive load using this online calculator? To use this online calculator for RMS output voltage of a single phase full converter with highly inductive load, enter Peak input voltage (Vm) and hit the calculate button. Here is how the RMS output voltage of a single phase full converter with highly inductive load calculation can be explained with given input values -> 7.071068 = (10/(2^0.5)).

FAQ

What is RMS output voltage of a single phase full converter with highly inductive load?
The RMS output voltage of a single phase full converter with highly inductive load formula is the root mean square value of the average output voltage of the converter and is represented as Vrms=(Vm/(2^0.5)) or RMS output voltage=(Peak input voltage/(2^0.5)). Peak input voltage is the peak value of the sinusoidal input voltage Vmsin(wt) to the converter.
How to calculate RMS output voltage of a single phase full converter with highly inductive load?
The RMS output voltage of a single phase full converter with highly inductive load formula is the root mean square value of the average output voltage of the converter is calculated using RMS output voltage=(Peak input voltage/(2^0.5)). To calculate RMS output voltage of a single phase full converter with highly inductive load, you need Peak input voltage (Vm). With our tool, you need to enter the respective value for Peak input voltage and hit the calculate button. You can also select the units (if any) for Input(s) and the Output as well.
How many ways are there to calculate RMS output voltage?
In this formula, RMS output voltage uses Peak input voltage. We can use 6 other way(s) to calculate the same, which is/are as follows -
  • RMS output voltage=(Peak input voltage/2)*((180-Delay angle of thyristor)/180+(0.5/pi)*sin(2*Delay angle of thyristor))^0.5
  • RMS output voltage=(Peak input voltage/(2^0.5))*((180-Delay angle of thyristor)/180+(0.5/pi)*sin(2*Delay angle of thyristor))^0.5
  • RMS output voltage=((3)^0.5)*Peak input voltage*(((1/6)+(0.216/pi)*(cos(2*Delay angle of thyristor)))^0.5)
  • RMS output voltage=((3)^0.5)*Peak input voltage*((0.75-(3*Delay angle of thyristor/720)+(0.5*(sin(2*Delay angle of thyristor))))^0.5)
  • RMS output voltage=((6)^0.5)*Peak input voltage*((0.25+0.65*(cos(2*Delay angle of thyristor))/pi)^0.5)
  • RMS output voltage=((Input voltage/2))
Share Image
Let Others Know
Facebook
Twitter
Reddit
LinkedIn
Email
WhatsApp
Copied!