This expresses an integral throughout a volume in terms of an integral over its bounding service. Let P, Q, and R be three functions which with their first derivatives are continuous throughout a volume V and over its surface S then ,
where cos ,
cos ,
cos ,
are the direction cosines of the outward normal to the surface.
,
,
cos 
,
cos 
,
are the direction cosines of the outward normal to the surface.
