Description

From ordinary (Riemann) integrals, via scalar annd vector line integrals of scalar and vector functions, conservative fields, surface integrals of various types, the divergence (Gauss) theorem, Stokes theorem, derivatives of scalar and vector fields, generalisations of Gauss and Stokes theorems, to vector integration by parts, otherwise known as Green’s theorems (not to be confused with Green’s functions – see below under differential equations). This is regarded as more specialised material not covered in the revision sessions. The handwritten notes are available to help those who can convince me they need it. The generalisation of Gauss and Stokes theorem seems rarely to be covered in books, which is frustrating if you are unfortunate enough to discover you need it.