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Example

If a carrier (reference signal) has a power of C = 0 . 1 m W {\textstyle \mathrm {C} =0{.}1\,\mathrm {mW} } , and noise signal has power of S = 10 μ W {\textstyle \mathrm {S} =10\,\mathrm {\mu W} } .

Power of reference signal expressed in decibel is :

P C = 10 log 10 ⁡ ( 0 . 1 m W 1 m W ) = − 10 d B m {\displaystyle P_{\mathrm {C} }=10\log _{10}\left({\frac {0{.}1\,\mathrm {mW} }{1\,\mathrm {mW} }}\right)=-10\,\mathrm {dBm} }

Power of noise expressed in decibel is :

P S = 10 log 10 ⁡ ( 10 μ W 1 m W ) = − 20 d B m {\displaystyle P_{\mathrm {S} }=10\log _{10}\left({\frac {10\,\mathrm {\mu W} }{1\,\mathrm {mW} }}\right)=-20\,\mathrm {dBm} }

The calculation of dBc difference between noise signal and reference signal is then as follows:

P S − P C = − 20 d B m − ( − 10 d B m ) = − 10 d B c {\displaystyle P_{\mathrm {S} }-P_{\mathrm {C} }=-20\,\mathrm {dBm} -(-10\,\mathrm {dBm} )=-10\,\mathrm {dBc} }

It is also possible to compute the dBc power of noise signal with respect to reference signal directly as logarithm of their ratio as follows:

P S − P C = 10 log 10 ⁡ ( S C ) = 10 log 10 ⁡ ( 10 μ W 0 . 1 m W ) = − 10 d B c {\displaystyle P_{\mathrm {S} }-P_{\mathrm {C} }=10\log _{10}\left({\frac {\mathrm {S} }{\mathrm {C} }}\right)=10\log _{10}\left({\frac {10\,\mathrm {\mu W} }{0{.}1\,\mathrm {mW} }}\right)=-10\,\mathrm {dBc} } .

External links

• Encyclopedia of Laser Physics and Technology

References

1. Taylor 1995, Guide for the Use of the International System of Units (SI), NIST Special Publication SP811 http://physics.nist.gov/cuu/pdf/sp811.pdf ↩