Cavitation Number

\(\large{ Ca = \frac { 2\; \left(p \;-\;p_v \right)   } {\rho\; U^2}  }\)         

\(\large{Ca = \frac { \left(p \;-\;p_v \right)   } { \frac {1}{2} \; \rho\; U^2}  }\)        

Where:

\(\large{ Ca }\) = Cavitation number

\(\large{ U }\) = characteristic velocity

\(\large{ \rho }\)  (Greek symbol rho) = density of the fluid

\(\large{ p }\) = local pressure

\(\large{ p_v }\) = vapor pressure

Solve for:

\(\large{ p =  \frac {Ca\; \rho\; U^2} {2}  + p_v   }\)

\(\large{ p_v =  p  \;-\;  \frac {Ca \;\rho\; U^2} {2}  }\)

\(\large{ \rho =  \frac { 2\; \left (p \;-\;p_v \right)}  {Ca\; U^2}  }\)

\(\large{ v =  \sqrt {      \frac { 2\; \left (p \;-\;p_v \right)}  {Ca\; U^2}      }    }\)