In what direction does f(x,y)=ln(7x^2+8y^2) increase most rapidly at (4,5)? Answer with a unit vector

In what direction does ?(?,?)= ln(9?^2+6?^2) increase most rapidly at (2,5)? (Enter a unit vector.)

In what direction does ?(?,?)= ln(9?^2+6?^2) increase most rapidly at (2,5)? (Enter a unit vector.)

Let f(x, y) = x^2 ln(x^3 + y). (a) Find the gradient of f. (b) Find...

Let f(x, y) = x^2 ln(x^3 + y). (a) Find the gradient of f. (b) Find the direction in which the function decreases most rapidly at the point P(2, 1). (Give the direction as a unit vector.) (c) Find the directions of zero change of f at the point P(2, 1). (Give both directions as a unit vector.)

(a) Show that a differentiable function f decreases most rapidly at x in the direction opposite...

(a) Show that a differentiable function f decreases most rapidly at x in the direction opposite the gradient vector, that is, in the direction of −∇f(x). Let θ be the angle between ∇f(x) and unit vector u. Then Du f = |∇f| Correct: Your answer is correct. . Since the minimum value of Correct: Your answer is correct. is -1 Correct: Your answer is correct. occurring, for 0 ≤ θ < 2π, when θ = Correct: Your answer is correct....

] Consider the function f : R 2 → R defined by f(x, y) = x...

] Consider the function f : R 2 → R defined by f(x, y) = x ln(x + 2y). (a) Find the gradient of f(x, y) at the point P(e/3, e/3). (b) Use the gradient to find the directional derivative of f at P(e/3, e/3) in the direction of the vector ~u = h−4, 3i. (c) Find a unit vector (based at P) pointing in the direction in which f increases most rapidly at P.

Find the critical point of the function f(x,y)=-6-7x+x^2+8y-7y^2 This critical point is a ?

Find the critical point of the function f(x,y)=-6-7x+x^2+8y-7y^2 This critical point is a ?

s] Consider the function f : R 2 → R defined by f(x, y) = x...

s] Consider the function f : R 2 → R defined by f(x, y) = x ln(x + 2y). (a) Find the gradient of f(x, y) at the point P(e/3, e/3). (b) Use the gradient to find the directional derivative of f at P(e/3, e/3) in the direction of the vector ~u = h−4, 3i. (c) Find a unit vector (based at P) pointing in the direction in which f increases most rapidly at P.

Suppose f(x,y)=sqrt(tan(x)+y) and u is the unit vector in the direction of 〈2,−1〉. Then, (a) ∇f(x,y)=∇f(x,y)=...

Suppose f(x,y)=sqrt(tan(x)+y) and u is the unit vector in the direction of 〈2,−1〉. Then, (a) ∇f(x,y)=∇f(x,y)= (b) ∇f(0.4,9)=∇f(0.4,9)= (c) fu(0.4,9)=Duf(0.4,9)=

Compute the directional derivative of the function f(x,y)=(√1+3x^2+8y^2) at the point (0,−3) in the direction of...

Compute the directional derivative of the function f(x,y)=(√1+3x^2+8y^2) at the point (0,−3) in the direction of the vector →v=2ˆi−3ˆj. Enter an exact answer involving radicals as necessary.   

For the function f(x, y)=ln(1+xy) a.Find the value of the directional derivative of f at the...

For the function f(x, y)=ln(1+xy) a.Find the value of the directional derivative of f at the point (-1, -2) in the direction <3,4>. b.Find the unit vector that gives the direction of steepest increase of f at the point (2,3).

6. (5 marks) Consider the function f defined by f (x, y) = ln(x − y)....

6. Consider the function f defined by f (x, y) = ln(x − y). (a) Determine the natural domain of f. (b) Sketch the level curves of f for the values k = −2, 0, 2. (c) Find the gradient of f at the point (2,1), that is ∇f(2,1). (d) In which unit vector direction, at the point (2,1), is the directional derivative of f the smallest and what is the directional derivative in that direction?