Deck 11: Partial Derivatives

Find the point at which the function $f ( x , y , z ) = 2 x + y - 2 z$ has the maximum value subject to the constraint that $x ^ { 2 } + y ^ { 2 } + z ^ { 2 } = 4$ .

Find the maximum value of the function $f ( x , y ) = x y$ subject to the constraint that $x ^ { 2 } + y ^ { 2 } = 2$ .

Optimize subject to .

Use the method of Lagrange multipliers to find points on the surface of where the function has
(a) a minimum
(b) a maximum.

Find two positive numbers who sum is eighteen and whose product is a maximum, using the method of Lagrange multipliers

Find the greatest product three numbers can have if the sum of their squares must be 48.

Compute the minimum value of subject to the condition that .

What is the shortest distance from the origin to the surface ?

Find the point at which the function $f ( x , y , z ) = 2 x + y - 2 z$ has the minimum value subject to the constraint that $x ^ { 2 } + y ^ { 2 } + z ^ { 2 } = 4$ .

In using Lagrange multipliers to minimize the function $f ( x , y ) = x ^ { 2 } + y ^ { 2 }$ subject to the constraint that $x + y = 3$ , what is the value of the multiplier $\lambda$ ?

Solve completely, using Lagrange multipliers: Find the dimension of a box with volume 1000 which minimizes the total length of the 12 edges.

Find the extreme values of on the circle .

Find the maximum value of the function $f ( x , y , z ) = 2 x + y - 2 z$ subject to the constraint that $x ^ { 2 } + y ^ { 2 } + z ^ { 2 } = 4$ .

Find the point on the plane where is minimum.

In using Lagrange multipliers to minimize the function $f ( x , y ) = x ^ { 2 } + y ^ { 2 }$ subject to the constraint that $x y = 2$ , what is the value of the multiplier $\lambda$ ?

Find the minimum value of the function $f ( x , y ) = x ^ { 2 } + y ^ { 2 }$ subject to the constraint that $x y = 2$ .

Find the maximum and minimum values of the function on the ellipse given by the equation .

Find the minimum value of the function $f ( x , y , z ) = 2 x + y - 2 z$ subject to the constraint that $x ^ { 2 } + y ^ { 2 } + z ^ { 2 } = 4$ .

Find the minimum value of the function $f ( x , y ) = x y$ subject to the constraint that $x ^ { 2 } + y ^ { 2 } = 2$ .

The quality of a good produced by a company is given by , where is the quantity of capital and is the quantity of labor used. Capital costs are $20 per unit, labor costs are $10 per unit, and the company wants to keep costs for capital and labor combined to $150.(a) What combination of labor and capital should be used to produce maximum quantity? What is the maximum value?
(b) Draw the level curves of and the graph of the budget constraint on the same set of axes.(c) Complete the value of . What does represent?

Determine how many critical points the function $f ( x , y ) = x ^ { 2 } + y ^ { 2 } + 2 x ^ { 2 } y + 3$ has.

The function $f ( x , y ) = x ^ { 2 } + y ^ { 2 } + 3 x y$ has one critical point. Determine its location and type.

A rancher with 300 ft of fence intends to enclose a rectangular corral, dividing it in half by a fence parallel to the short sides of the corral. What is the maximum area he can enclose? Compute the value of . What does represent?

Find the maximum value of the function $f ( x , y ) = 10 x + 30 y - x ^ { 2 } - y ^ { 2 } - 160$

The function $f ( x , y ) = 4 - x ^ { 2 } - y ^ { 2 } - x y - x$ has one critical point. Determine its location and type.

The function $f ( x , y ) = x ^ { 2 } + y ^ { 2 } + x y$ has one critical point. Determine its location and type.

The level curves of a function and a curve with equation ( constant) are given below. Estimate the point where has a maximum value and the point where has a minimum value, subject to the constraint that . Indicate your answer in the figure.

Suppose that the quantity produced of a certain good depends on the number of units of labor and the quantity of capital according to the function . Suppose also that labor costs $100 per unit and that capital costs $200 per unit.(a) What combination of labor and capital should be used to produce 36,000 units of the goods at minimum cost? What is that minimum cost?
(b) Draw the level curves of , the cost function, and the graph of the constraint on the same set of axes.(c) Complete the value of . What does represent?

What point on the surface , , , is closest to the origin?

Determine how many critical points the function $f ( x , y ) = x ^ { 2 } + y ^ { 2 } + x ^ { 2 } y + 10$ has.

A package in the shape of a cylindrical box can be mailed by the U.S. Postal Service if the sum of its height and girth (the circumference of the circular base) is at most 108 in. Find the dimension of the package with largest volume that can be mailed.

Find the minimum value of the function $f ( x , y ) = x ^ { 2 } + \frac { 9 } { 2 } y ^ { 2 } - 9 y - 4 x y + 50$

A rectangular area of 3200 ft is to be fenced off. Two opposite sides will use fencing costing $1 per foot and the remaining sides will use fencing costing $2 per foot. Find the dimensions of the rectangle of least cost. Compute the value of . What does represent?

The function $f ( x , y ) = x ^ { 2 } - 2 y ^ { 2 }$ has one critical point. Determine its location and type.

A rancher intends to fence off a rectangular region along a river (which serves as a natural boundary requiring no fence). If the enclosed area is to be 1800 square yards, what is the least amount of fence needed? Compute the value of . What does represent?

Determine how many critical points the function $f ( x , y ) = x ^ { 2 } - 2 x + y ^ { 3 } + y$ has.

Determine how many critical points the function $f ( x , y ) = x y - x ^ { 2 } y + x y ^ { 2 }$ has.

Find the maximum and minimum values of on the circle .

Determine how many critical points the function $f ( x , y ) = x ^ { 4 } - 2 x ^ { 2 } + 3 y - y ^ { 3 }$ has.

Find the local maximum and minimum values and saddle points of the function .

Find the local maximum and minimum values and saddle points of the function .

Find the point at which the function $f ( x , y ) = x y - x ^ { 2 } y - x y ^ { 2 }$ has a local maximum.

For each of the following functions, find the critical point, if there is one, and determine if it is a local maximum, local minimum, saddle point, or otherwise.(a) (b) (c) (d)

Use the level curves of shown below to estimate the critical points of . Indicate whether has a saddle point or a local maximum or minimum at each of those points.

A cardboard box without a lid is to have volume 100 cubic inches, with total area of cardboard as small as possible. Find its height in inches.

Find the local maximum and minimum values and saddle points of the function .

Find the local maximum and minimum values and saddle points of the function .

The function has a maximum. Find the values of and at which it occurs.

Use the level curves of shown below to estimate the critical points of . Indicate whether has a saddle point or a local maximum or minimum at each of those points.

Find the local maximum and minimum values and saddle points of the function .

Compare the minimum value of and sketch a portion of the graph of near its lowest point.

Find the absolute maximum and minimum values of over the region , where is a closed triangular region with vertices , , and .

Find three positive numbers , , and whose sum is 48 and product is maximum.

Find the shortest distance from the origin to the surface $z ^ { 2 } = 2 x y + 2$ .

Find the critical points (if any) for and determine if each is a local extreme value or a saddle point.

Find the local maximum and minimum values and saddle points of the function .

Find the absolute maximum and minimum value of on the square region with vertices , , , and .

Find the absolute maximum and minimum value of on the square region with vertices , , , and .

A company estimates that its annual profits for next year will be , where represents investment in research and represents investment in labor. All units are in tens of thousands of dollars. Determine the amount the company should spend on research and on labor to maximize its profit. What is maximum profit?

Find an equation of the tangent plane to the surface $\sqrt { x } + \sqrt { y } + \sqrt { z } = 4$ at the point $( 4,1,1 )$ .

Let $f ( x , y , z ) = x e ^ { y \sin z }$ . Find the gradient vector $\nabla f ( 1,1,0 )$ at the point $( x , y , z ) = ( 1,1,0 )$ .

Find the directional derivative of the function $f ( x , y , z ) = x e ^ { x y / z }$ at the point $P$ $( 3,0,1 )$ in the direction from $P$ toward the point $( 2,2,3 )$ ..

Find the largest value of the directional derivative of the function $f ( x , y ) = \frac { y } { x + y }$ at the point $( x , y ) = ( 1,2 )$ .

Let $f ( x , y ) = 3 x + 2 y$ . Find the gradient vector $\nabla f$ .

Find a normal vector to the surface $x y z = 8$ at the point $( 1,2,4 )$ .

Let $f ( x , y ) = \frac { x } { y } + \frac { y } { x }$ . Find the gradient vector $\nabla f$ .

Find the directional derivative of the function $f ( x , y ) = y ^ { 2 } \ln x$ at the point $( 1,2 )$ in the direction $( 3,4 )$ .

Find the direction of maximum increase of the function $f ( x , y , z ) = x ^ { 2 } - 2 x y + z ^ { 2 }$ at the point $( 1,1,2 )$ .

Find the second directional derivative of $f ( x , y ) = x ^ { 2 } y$ at the point $( - 1,1 )$ in the direction $( 3,4 )$ .

Find three positive numbers , , and whose product is 343 and sum is minimum.

Let $f ( x , y ) = \frac { 1 } { x + y ^ { 2 } }$ . Find the gradient vector $\nabla f ( 1,1 )$ at the point $( x , y ) = ( 1,1 )$ .

Find an equation of the tangent plane to the hyperboloid $x ^ { 2 } + y ^ { 2 } - z ^ { 2 } - 2 x y + 4 x z = 4$ at the point $( 1,0,1 )$ .

Find the directional derivative of the function $f ( x , y ) = x ^ { 2 } + y ^ { 2 }$ at the point $( 1,1 )$ in the direction $\theta = \frac { \pi } { 4 }$ .

Find the second directional derivative of $f ( x , y ) = x ^ { 2 } e ^ { y }$ at the point $( 2,0 )$ in the direction $(3 , - 4 )$ .

Find the direction $\theta$ in which the directional derivative of the function $f ( x , y ) = x y + y ^ { 2 }$ at the point $( 1,1 )$ is maximum.

Find the direction of maximum increase of the function $f ( x , y , z ) = x e ^ { - y } + 3 z$ at the point $( 1,0,4 )$ .

Find an equation of the tangent plane to the surface $x ^ { 2 } + y ^ { 2 } + z ^ { 2 } = 9$ at the point $( 1,2,2 )$ .

Find the directional derivative of the function $f ( x , y , z ) = \sqrt { x y z }$ at the point $( 2,4,2 )$ in the direction of the vector $\{ 4,2 , - 4 \}$ .

Find the directional derivative of the function $f ( x , y ) = x ^ { 2 } + y ^ { 2 }$ at the point $( 1,2 )$ in the direction $\theta = \frac { \pi } { 2 }$ .