Theory[edit]

The left impedance is the signal generator which is generating enough power for 1 ampere.

This 1Amp. generates ${\displaystyle P=I^{2}*R=50\ Watt}$ in the right impedance.

The current sensor has 1 ohm transfer impedance, this means 1 ampere generates 1 Volt on the measuring part below.

The power in the lower 50 ohm impedance is ${\displaystyle P={\frac {U^{2}}{R}}=20\ mWatt}$

So 1 ohm: ${\displaystyle 10*^{10}log({\frac {0,02}{50}})\approx -33,98dB=-20*^{10}log(50)}$

Reference measurement[edit]

Probe measurement[edit]

Calculation[edit]

${\displaystyle Correction\ factor($dB)=P_{Measured}-P_{Reference}+33.98}

${\displaystyle P_{Measured}}$ and ${\displaystyle P_{Reference}}$ in dBm.

Example[edit]

On 10 MHz we have the following information:

• Calibration: 0 dBm.
• Measurement: -27,96 dBm.

So: ${\displaystyle Imp.=-27,96-0.00+33.98=6,02dBOhm}$

${\displaystyle Imp.\approx 2\ Ohm}$

Verification[edit]

The left impedance is the signal generator which is generating enough power for 1 ampere.

This 1 Ampere generates ${\displaystyle P=I^{2}*R=50\ Watt}$ in the right impedance.

The current sensor has 2 ohm transfer impedance, this means 1 ampere generates 2 Volt on the measuring part below.

The power in the lower 50 ohm impedance is ${\displaystyle P={\frac {U^{2}}{R}}=80\ mWatt}$

So 2 ohm: ${\displaystyle 10*^{10}log({\frac {0,08}{50}})\approx -27,96dB}$

The difference to a 1 Ohm impedance is ${\displaystyle -27,96-(-33,98)=6,02dB}$

Conclusion[edit]

Correction to a 1 ohm impedance is ${\displaystyle 20*^{10}log(R_{probe})}$

Note:

This method is not a replacement for a real calibration as it may be performed by a none traceable device