Consider the following equations:

(a) A₁v₁ = A₂v₂

(b) \(\frac{{\partial u}}{{\partial x}} + \frac{{\partial v}}{{\partial y}} = 0\)

(c) \(\mathop \smallint \limits_{\rm{s}} {\rm{pV}}.{\rm{dA}} + \frac{\partial }{{\partial {\rm{t}}}}\mathop \smallint \limits_{\rm{v}} {\rm{pdV}} = 0\)

(d) \(\frac{1}{r}\;\frac{\partial }{{\partial r}}\left( {r{v_r}} \right) + \frac{\partial }{{\partial z}}\left( {{v_z}} \right) = 0\)

Which of the above equations are forms of continuity equations? (Where u, v are velocities and V is volume)