Denote the given points:
First, find the unit vector orthogonal to (for a plane it is a constant vector). An orthogonal vector is
Its unit vector is
a)
Therefore the equation of the plane is
or
b) The parametrization of is
Therefore
c) To find the integral, find first:
Then compute the dot product
To finally find the surface integral, note that on the -plane under the variable is from to
and...
Denote the given points:
First, find the unit vector orthogonal to (for a plane it is a constant vector). An orthogonal vector is
Its unit vector is
a)
Therefore the equation of the plane is
or
b) The parametrization of is
Therefore
c) To find the integral, find first:
Then compute the dot product
To finally find the surface integral, note that on the -plane under the variable is from to
and the variable is from to
Also note that and the surface integral becomes
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