Parameterize the paraboloidal part by
and the planar part by
both with and .
For the paraboloidal part, take the normal vector to be
and for the planar part,
The flux over the paraboloidal part (call it ) is
and over the planar part (call it ),
but this integral vanishes because the dot product is 0. So the total flux over (the boundary of the given region ) is
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Confirming with the divergence theorem: the divergence of the given vector field is
By the divergence theorem, the flux is equivalent to the volume integral
(where the integral was set up with cylindrical coordinates)
Answer:
4 and -3 i think
Step-by-step explanation:
the dot is on 4 and -3
Answer:
idkdsadsa
Step-by-step explanation:
Answer:
How to do algebraic equations
Step 1: Write Down the Problem. ...
Step 2: PEMDAS. ...
Step 3: Solve the Parenthesis. ...
Step 4: Handle the Exponents/ Square Roots. ...
Step 5: Multiply. ...
Step 6: Divide. ...
Step 7: Add/ Subtract (aka, Combine Like Terms) ...
Step 8: Find X by Division.
Alegraic expressions
1.Here are the basic steps to follow to simplify an algebraic expression:
2.remove parentheses by multiplying factors.
3.use exponent rules to remove parentheses in terms with exponents.
4.combine like terms by adding coefficients.
combine the constants.
Hope u have a nice day :)
2/3 here you go! Good luck