Q3 Given the conservative vector field, F = (x +y²)i +(2xy +5)j , evaluate the integral F•ds where C is the path, from (1,2), to (3,4) along any curve.

Advanced Engineering Mathematics
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ISBN:9780470458365
Author:Erwin Kreyszig
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Chapter2: Second-order Linear Odes
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Q3
Given the conservative vector field, F =(x +y²)i +(2 xy +5)j , evaluate the
integral fF•ds
F•ds where C is the path, from (1,2), to (3,4) along any curve.
C
Q4
Use Stoke's theorem to evaluate the integral xydx+x*dy – 4x'ydz where C
is the boundary of the square surface z =1, oriented positively, with vertices
(1,0,1), (1,1,1), and (0,1,1), and (0,0,1).
Q5
Use Green's theorem to evaluate the line integral |(cosx+2y)dx+(x – sin y)dy
C
2
where C is the path along y =x
from (0, 0) to (1, 1) and y =x from (1, 1) to
(0, 0).
Transcribed Image Text:Q3 Given the conservative vector field, F =(x +y²)i +(2 xy +5)j , evaluate the integral fF•ds F•ds where C is the path, from (1,2), to (3,4) along any curve. C Q4 Use Stoke's theorem to evaluate the integral xydx+x*dy – 4x'ydz where C is the boundary of the square surface z =1, oriented positively, with vertices (1,0,1), (1,1,1), and (0,1,1), and (0,0,1). Q5 Use Green's theorem to evaluate the line integral |(cosx+2y)dx+(x – sin y)dy C 2 where C is the path along y =x from (0, 0) to (1, 1) and y =x from (1, 1) to (0, 0).
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