Is the below statement True or False? The vector field F(x,y) =<xy?, x?y) is conservative. True...
7. Is F(x, y) =< 2x, 6y? > a conservative vector field?
7. The vector field F =< 3x2z In y + ze+2 +20, - 3y?, x° In y + ce2 +423 > is conservative. Find a potential function f(x, y, z) such that F=Vf. Y
D Question 11 12 pts to Consider the vector field F (x, y, z) =< 2x – yz, 2y – az,2z – xy>. a) (3) Is this vector field conservative? Justify your answer. b) (9) Find the amount of work done by this vector field in moving a particle along the curve (t) =< 3cost, cos’t, cos” (2t) > from t = 0 tot = 1
Let F(x,y,z) = <2y2z, 4xyz, 2xy2> be a vector field. (a) Knowing that F is conservative, find a function f such that F = Vf and f(1,2,1)= 8. (b) Using the result of part(a), evaluate the line integral of F along the following curve C from (0, 0, 0) to (3.9, 1.4, 2.6). y2 + x4z3 + 2xy(x3 + y4 + 24)1/3 = K ; K is a constant Answer: Next page
(a)If F =< y2 + 2x22, 2xyz, xy² + 2x22 >, find the function f(2, y, z) such that F=Vf. (Hint: F is a conservative vector field) (b) A vector field F = Pi +Qj is conservative if Py = Qx. If F = Pi + Qj + Rk, how will you determine if F is conservative? Explain in detail your process and if any underlying conditions are required for your process to work.
6. (4) (a) Is F(x, y, z) = <e'siny, e cosx, esiny > a conservative vector field? Justify. (4) (b) Is F incompressible? Explain. Is it irrotational? Explain. (8) (c) The vector field F(x,y,z)= < 6xy+ e?, 6yx²+zcos(y), sin(y)+xe?> is conservative. Find the potential function f. That is, the function f such that Vf= F. Use a process. Don't guess and check.
Question 1 5 pts True or False. The vector field F(x, y) = {xy i + 1x2 j is conservative. True O False
3. Consider the vector field F(x,y) = (27x D = {(1,y): 0 < rº + y2 <2}. +ya) defined on the region D where a) Directly compute SF. Tds using the definition of the line integral, where C is the unit circle oriented counterclockwise. b). Use Theorem 3.3 (Test for Conservative Vector Fields) from the text to determine if F is conservative. Is your answer consistent with part a)? If not, what is the source of the discrepancy?
96. Consider a vector field F(x, y, z) =< x + x cos(yz), 2y - eyz, z- xy > and scalar function f(x, y, z) = xy3e2z. Find the following, or explain why it is impossible: a) gradF (also denoted VF) b) divF (also denoted .F) c) curl(f) (also denoted xf) d) curl(gradf) (also denoted V x (0f) e) div(curlF) (also denoted 7. (V x F))
9. Some TRUE/FALSE questions. The RVs X and Y must be independent if... (a) f(y|x) = fy(x) for all X. (b) Cov(X,Y) = 0. (c) f(x, y) = cx, for 0 < x < y2 < 1. (d) E[XY] = E[X] · E[Y]. (e) f (x, y) = cx- (1 + y2), for 0 < x <1,0 < y < 2.