1. Further Applications of Green’s Theorem Ex. 2 Ex. 2) Area of a plane region -for ellipse: -in polar coordinates: Ex. 4 Ex. 4) Double integral of the Laplacian of a function s: arc length of C n: unit normal vector to C perpendicular to unit tangent r’ x y R C r’r’ n

2. 9.5. Surfaces for Surface Integrals Representations of Surfaces Surface S: z=f(x,y) or g(x,y,z)=0 Parametric representations: Ex. 1 Ex. 1) Circular cylinder Ex. 2 Ex. 2) Sphere Ex. 3 Ex. 3) Circular cone a b x y z r(t) R u v x y z r(u,v) t

3. Tangent Plane and Surface Normal  - Normal vector of S at point P  tangent vector of S at P - Normal vector N of S at P: - Unit normal vector n: Ex. 4 Ex. 4) Unit normal vector of a sphere 9.6. Surface Integrals - Surface integral over S: (e.g., F=  v: mass flux across S)  “Flux integral” P n ruru rvrv (r u ’ and r u ’: tangent to S at P) Normal component of F

4. Ex. 1 Ex. 1) Parabolic cylinder S: y=x 2, 0  x  2, 0  z  3 v = F = (3z 2, 6, 6xz) - Integral depends on the choice of the unit normal vector n.  Integral over an oriented surface S Theorem 1 Theorem 1: Change of orientation The replacement of n by –n corresponds to the multiplication of the integral by –1.

5. Another Way of Writing Surface Integrals Ex. 4 Ex. 4) Parabolic cylinder S: y=x 2, 0  x  2, 0  z  3, v = F = (3z 2, 6, 6xz) Surface Integrals Without Regard to Orientation Area of A(S) of S:

6. Ex. 5~7 Ex. 5~7) Representation z=f(x,y). Representation z=f(x,y). S: z=f(x,y)  r = (x,y,z) = (u,v,f) (R*: projection of S into xy plane)