anand said:Problem : Evaluate [double integral]f.n ds where f=xi+yj-2zk and S is the surface of the sphere x^2+y^2+z^2=a^2 above x-y plane.
My effort:: I know that the sphere's orthogonal projection has to be taken on the x-y plane,but I'm having trouble with the integration.Please help!
A surface integral is a mathematical concept used to calculate the flux or flow of a vector field over a curved surface. It is a type of multiple integral, similar to the double integrals used to calculate the area under a curve in two dimensions.
The formula for evaluating a surface integral for a sphere is ∫∫S f.n ds = ∫∫D f(x,y,z) √(1+(fx)^2+(fy)^2) dA, where S represents the surface of the sphere, D represents the projection of the surface onto the xy-plane, and f(x,y,z) is the function being integrated.
The normal vector for a sphere can be found by taking the gradient of the equation for the sphere, which is given by f(x,y,z) = x^2+y^2+z^2-a^2. This results in the normal vector n = (2x, 2y, 2z).
In the surface integral formula, f.n represents the dot product of the function f(x,y,z) and the normal vector n. This is used to account for the direction in which the flux is flowing over the surface.
The limits of integration for a surface integral on a sphere depend on the projection of the surface onto the xy-plane, which is represented by the region D. The limits of integration for D can be found by setting the equation of the sphere equal to z and solving for x and y. These values will then be used as the limits of integration for the double integral.