Calculate the derivative of f(x,y) = tan^-1(x/y) in the direction (sqrt3,1)

Find the directional derivative of the function  f (x, y) = tan−1(xy)   at the point (1, ...

Find the directional derivative of the function  f (x, y) = tan−1(xy)   at the point (1, 3) in the direction of the unit vector parallel to the vector v = 4i + j.

Calculate the directional derivative at point p in the direction a. 1) f (x, y) =...

Calculate the directional derivative at point p in the direction a. 1) f (x, y) = (x ^ 2)*(y); p = (1,2); a ⃗ = 3i-4j 2) f (x, y, z) = (x ^ 3)*(y) - (y ^ 2)*(z ^ 2); p = (- 2,1,3); a ⃗ = i-2j + 2k

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)=

find the directional derivative of f(x,y) = x^2y^3 +2x^4y at the point (3,-1) in the direction...

find the directional derivative of f(x,y) = x^2y^3 +2x^4y at the point (3,-1) in the direction theta= 5pi/6 the gradient of f is f(x,y)= the gradient of f (3,-1)= the directional derivative is:

Let f(x y z)=x4y4+z5, P=(4, 4, 1). Calculate the directional derivative in the direction pointing to...

Let f(x y z)=x4y4+z5, P=(4, 4, 1). Calculate the directional derivative in the direction pointing to the origin. Remember to normalize the direction vector. (Use symbolic notation and fractions where needed.) Duf(4, 4, 1)

Let f(x y z)=x4y4+z5, P=(4, 4, 1). Calculate the directional derivative in the direction pointing to...

Let f(x y z)=x4y4+z5, P=(4, 4, 1). Calculate the directional derivative in the direction pointing to the origin. Remember to normalize the direction vector. (Use symbolic notation and fractions where needed.) Duf(4, 4, 1)

Calculate the higher derivatives. y = tan(x) y'' =    y''' = If f(x) = sin(x)...

Calculate the higher derivatives. y = tan(x) y'' =    y''' = If f(x) = sin(x) and g(x) = cos(x), determine the following.      f (4n + 1)(x) =      g(4n + 1)(x) =      f (4n + 2)(x) = g(4n + 2)(x) =      f (4n + 3)(x) = g(4n + 3)(x) =      f (4n + 4)(x) = g(4n + 4)(x) = Now, use your answers to calculate F(159)(x) when F(x) = 4 sin(x) + 3 cos(x). F(159)(x)...

find the directional derivative of f (x, y) = x ^ 2 in the direction of...

find the directional derivative of f (x, y) = x ^ 2 in the direction of v = i-j for the point (-1,2).

Consider the function f(x, y) = 3e^(2y)cos x. (a) Find the value of the direction derivative...

Consider the function f(x, y) = 3e^(2y)cos x. (a) Find the value of the direction derivative of f at the point (1, 0) in the direction of the point (2, 1). (b) Find the direction of maximum increase of f from the point (π, 1). Find the rate of that max increase.

Let f(x,y) be a function of x and y. The partial derivative of f(x,y) with respect...

Let f(x,y) be a function of x and y. The partial derivative of f(x,y) with respect to y is equivalent to the directional derivative of f(x,y) in the direction of the unit vector Select one: a. 〈0,1〉 b. 〈1,0〉 c. 〈1,1,1〉 d. 〈0,5〉