Let
The curl is
where denotes the partial derivative operator with respect to . Recall that
and that for any two vectors and , , and .
The cross product reduces to
When you compute the partial derivatives, you'll find that all the components reduce to 0 and
which means is indeed conservative and we can find .
Integrate both sides of
with respect to and
Differentiate both sides with respect to and
Now
and differentiating with respect to gives
for some constant . So
Answer:
b
Step-by-step explanation:
The correct is going to be “Identify the Choices”.
Hope this helps! :))
Option B: Protect Slavery
-_-
2.1 or 2. Hopefully this is right.