Asked by Lucy
Consider the function f(x,y)=xy+xz+yz+4 at the point P=(2,-1,1)
Find the unit vector in direction of maximum increase of f in the direction of p.
I know the magnitude of p=sqrt6
how do i find this???
Find the unit vector in direction of maximum increase of f in the direction of p.
I know the magnitude of p=sqrt6
how do i find this???
Answers
Answered by
Steve
as noted at math dot stackechange,
the rate of change in a function f in the direction of the unit vector η is ∇f⋅η (This is simply the chain rule.). This quantity reaches its maximum when η shares the same direction as ∇f (to maximize the cosine of the angle that's part of the dot product formula). Thus the magnitude of ∇f gives the rate of change in that direction, as well.
∇f = (y+z)<b>i</b> + (x+z)<b>j</b> + (x+y)<b>k</b>
∇f•<b>p</b> = (0,3,1)•(2,-1,1) = (0,-3,1)
divide by magnitude to find the unit vector.
Hope I understood the question right.
the rate of change in a function f in the direction of the unit vector η is ∇f⋅η (This is simply the chain rule.). This quantity reaches its maximum when η shares the same direction as ∇f (to maximize the cosine of the angle that's part of the dot product formula). Thus the magnitude of ∇f gives the rate of change in that direction, as well.
∇f = (y+z)<b>i</b> + (x+z)<b>j</b> + (x+y)<b>k</b>
∇f•<b>p</b> = (0,3,1)•(2,-1,1) = (0,-3,1)
divide by magnitude to find the unit vector.
Hope I understood the question right.
Answered by
Steve
a search on vector analysis gradient will turn up lots of articles.
oops - stackexchange
oops - stackexchange
Answered by
lucy
I believe its actually (0,3,1) not negative 3, right?
Answered by
lucy
Nevermind about that last comment!!
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