Evaluating a Line Integral In Exercises 19-22, evaluate the line integral along the given path. ∫ C 3 ( x − y ) d s C : r ( t ) = t i + ( 2 − t ) j 0 ≤ t ≤ 2
Evaluating a Line Integral In Exercises 19-22, evaluate the line integral along the given path. ∫ C 3 ( x − y ) d s C : r ( t ) = t i + ( 2 − t ) j 0 ≤ t ≤ 2
Solution Summary: The author calculates the value of the line integral displaystyleundersetCint3(x-y)ds along the path.
Evaluating a Line Integral In Exercises 19-22, evaluate the line integral along the given path.
∫
C
3
(
x
−
y
)
d
s
C
:
r
(
t
)
=
t
i
+
(
2
−
t
)
j
0
≤
t
≤
2
With differentiation, one of the major concepts of calculus. Integration involves the calculation of an integral, which is useful to find many quantities such as areas, volumes, and displacement.
Linear Algebra
Calculate the distance from point P(1, 0, 2) to the x + y - z = 0 plane.
Linear Algebra question is attached.
Application of Green's theorem
Assume that u and u are continuously differentiable functions. Using Green's theorem,
prove that
JS
D
Ur
Vy
dA=
u dv,
where D is some domain enclosed by a simple closed curve C with positive orientation.
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