Find the direction in which the function is increasing most rapidly at the point P 0....

Find the directions in which the function increases and decreases most rapidly at Upper P 0....

Find the directions in which the function increases and decreases most rapidly at Upper P 0. Then find the derivatives of the function in those directions. f(x,y,z)=3ln(xy)+ln (yz)+2ln(xz) P0(1,1,1) 1. In which direction does the function increase most​ rapidly? u=____i+_____j+____k 2. In which direction does the function decrease most​ rapidly? -u=____i+____j+____k 3. What is the value of the derivative in the direction of u? 4. What is the value of the derivative in the direction of minus−u​?

Find the gradient ∇f and the directional derivative at the point P (1,−1,2) in the direction...

Find the gradient ∇f and the directional derivative at the point P (1,−1,2) in the direction a = (2,−1,1) for the function f (x,y,z) = x^3z − y(x^2) + z^2. In which direction is the directional derivative at P decreasing most rapidly and what is its value?

Find the directions in which the function increases and decreases most rapidly at p0.Then find the...

Find the directions in which the function increases and decreases most rapidly at p0.Then find the derivatives of the function in these directions f(x,y,z)=(x/y)-yz p0(2,1,-3) The direction in which the given function f(x,y,z)=(x/y)-yz increases most rapidly at p0(2,1,-3) is u=?? i ??j ??k

(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(x,y)=−2x^2−y^2. Find the the directional derivative of ff at the point (1,−3)(1,−3)...

) Consider the function f(x,y)=−2x^2−y^2. Find the the directional derivative of ff at the point (1,−3)(1,−3) in the direction given by the angle θ=π/2. Find the unit vector which describes the direction in which ff is increasing most rapidly at (1,−3).

Please write down the details of reasons for your solutions. Thanks. Questions 2 a) Let f(x,y)...

Please write down the details of reasons for your solutions. Thanks. Questions 2 a) Let f(x,y) = sin (y^2 + e^(2x)). Find f(xy) and f(yx) and verify their equality. b) Find the equation of the tangent plane to the surface z=e^(2x)*cos(3y) at P (0, pi/3, -1) c) Find the direction in which the function f(x,y) = ((x-2y)/(2x+y))^(1/3) increases most rapidly at (1,0).

find the derivative of the function f at the given point P in the given direction...

find the derivative of the function f at the given point P in the given direction u. f(x,y,z)=zarctan(y/z) P(3,-3,1) u=4i-j+3k

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.)

Find the maximum rate of change of f at the given point and the direction in...

Find the maximum rate of change of f at the given point and the direction in which it occurs. f(x, y) = 2 sin(xy), (0, 5) direction of maximum rate of change (in unit vector) = maximum rate of change =

Find the maximum rate of change of f at the given point and the direction in...

Find the maximum rate of change of f at the given point and the direction in which it occurs. f(x, y) = 9 sin(xy),    (0, 5)