A company manufactures 10- and 3-speed bicycles. The weekly demand and cost equations are
p = 230 - 9x + y
q = 130 + x - 4y
C(x, y) = 200 + 80x + 30y
where $p is the price of a 10-speed bicycle, $q is the price of a 3-speed bicycle, x is the weekly demand for 10-speed bicycles, y is the weekly demand for 3-speed bicycles, and C(x, y) is the cost function. Find the weekly revenue function R(x, y) and the weekly profit function P(x, y). Evaluate R(10, 15) and P(10, 15).
> Let ((x, y) = 5 - 2x + 4y - 3x2 - y2 . (A) Find the maximum value of ( (x, y) when x = 2. (B) Explain why the answer to part (A) is not the maximum value of the function ( (x, y).
> For G(x, y) = x2 ln y - 3x - 2y + 1 find all values of x and y such that Gx(x, y) = 0 and Gy(x, y) = 0 simultaneously.
> For C(x, y) = 2x2 + 2xy + 3y2 - 16x - 18y + 54 find all values of x and y such that Cx(x, y) = 0 and Cy(x, y) = 0 simultaneously.
> Find (xx(x, y),(xy (x, y), (yx(x, y), and (yy(x, y) for each function (.
> Find (xx(x, y),(xy (x, y), (yx(x, y), and (yy(x, y) for each function (.
> Find each indefinite integral. Check by differentiating.
> Find (xx(x, y),(xy (x, y), (yx(x, y), and (yy(x, y) for each function (.
> (A) Find an example of a function ((x, y) such that ∂(/∂x = 3 and ∂(/∂y = 2. (B) How many such functions are there? Explain.
> S(T, r) = 50(T – 40)(5 – r) gives an ice cream shop’s daily sale as a function of temperature T (in °F) and rain r (in inches). Find the indicated quantity (include the appropriate units) and explain what it means. Srt(90, 1)
> S(T, r) = 50(T – 40)(5 – r) gives an ice cream shop’s daily sale as a function of temperature T (in °F) and rain r (in inches). Find the indicated quantity (include the appropriate units) and explain what it means. ST(90, 1)
> S(T, r) = 50(T – 40)(5 – r) gives an ice cream shop’s daily sale as a function of temperature T (in °F) and rain r (in inches). Find the indicated quantity (include the appropriate units) and explain what it means. S(80, 0)
> Find the indicated function or value if C(x, y) = 3x2 + 10xy - 8y2 + 4x - 15y - 120. Cyy(3, -2)
> Find the indicated function or value if C(x, y) = 3x2 + 10xy - 8y2 + 4x - 15y - 120. Cyx(x, y)
> Find the indicated function or value if C(x, y) = 3x2 + 10xy - 8y2 + 4x - 15y - 120. Cyy(x, y)
> Find the indicated function or value if C(x, y) = 3x2 + 10xy - 8y2 + 4x - 15y - 120. Cy(3, -2)
> Find the indicated function or value if C(x, y) = 3x2 + 10xy - 8y2 + 4x - 15y - 120.
> Find each indefinite integral and check the result by differentiating.
> could the given matrix be the transition matrix of an absorbing Markov chain?
> Find the indicated second-order partial derivative for each function ((x, y).
> Find the indicated second-order partial derivative for each function ((x, y).
> Find the indicated second-order partial derivative for each function ((x, y).
> Find the indicated second-order partial derivative for each function ((x, y).
> Find the indicated second-order partial derivative for each function ((x, y).
> Find the indicated second-order partial derivative for each function ((x, y).
> M(x, y) = 68 + 0.3x - 0.8y gives the mileage (in mpg) of a new car as a function of tire pressure x (in psi) and speed (in mph). Find the indicated quantity (include the appropriate units) and explain what it means. My(32, 50)
> M(x, y) = 68 + 0.3x - 0.8y gives the mileage (in mpg) of a new car as a function of tire pressure x (in psi) and speed (in mph). Find the indicated quantity (include the appropriate units) and explain what it means. M(22, 50)
> M(x, y) = 68 + 0.3x - 0.8y gives the mileage (in mpg) of a new car as a function of tire pressure x (in psi) and speed (in mph). Find the indicated quantity (include the appropriate units) and explain what it means. M(22, 40)
> find the indicated value.
> Find each indefinite integral. Check by differentiating.
> find the indicated value.
> find the indicated value.
> find the indicated value.
> Find the indicated first-order partial derivative for each function z = ((x, y)
> Find the indicated first-order partial derivative for each function z = ((x, y)
> Find the indicated first-order partial derivative for each function z = ((x, y)
> Find the indicated first-order partial derivative for each function z = ((x, y)
> Find the indicated derivative.
> Find the indicated derivative.
> Find the indicated derivative.
> Find each indefinite integral and check the result by differentiating.
> Find the indicated derivative.
> find the indicated value of the function of two or three variables. The height of a right circular cylinder is 6 feet and the diameter is also 6 feet. Find the total surface area.?
> find the indicated value of the function of two or three variables. The length, width, and height of a rectangular box are 30 centimeters, 15 centimeters, and 10 centimeters, respectively. Find the volume.
> find the indicated value of the function of two or three variables. The height of a trapezoid is 4 meters and the lengths of its parallel sides are 25 meters and 32 meters. Find the area.
> The force F of attraction between two masses m1 and m2 at distance r is given by Newton’s law of universal gravitation where G is a constant. Evaluate F(50, 100, 20) and F(50, 100, 40).
> Under ideal conditions, if a person driving a car slam on the brakes and skids to a stop, the length of the skid marks (in feet) is given by the formula For k = 0.000 013 3, find L(2,000, 40) and L(3,000, 60).
> Poiseuille’s law states that the resistance R for blood flowing in a blood vessel varies directly as the length L of the vessel and inversely as the fourth power of its radius r. Stated as an equation, Find R(8, 1) and R(4, 0.2).
> The packaging department in a company has been asked to design a rectangular box with no top and a partition down the middle (see the figure). Let x, y, and z be the dimensions of the box (in inches). Ignore the thickness of the material from which the b
> The petroleum company in Problem 69 is taken over by another company that decides to double both the units of labor and the units of capital utilized in the production of petroleum. Use the Cobb–Douglas production function given in Problem 69 to find the
> Find each indefinite integral. Check by differentiating.
> A company spends $x thousand per week on online advertising and $y thousand per week on TV advertising. Its weekly sales are found to be given by S(x, y) = 5x2 y3 Find S(3, 2) and S(2, 3)
> Let f1x, y2 = 4 - √x2 + y2 . (A) Explain why f1a, b2 = f1c, d2 whenever 1a, b2 and 1c, d2 are points on the same circle with center at the origin in the xy plane. (B) Describe the cross sections of the surface z = ((x, y) produced by cutting it with th
> Let ((x, y) = 100 + 10x + 25y - x2 - 5y2 . (A) Describe the cross sections of the surface z = ((x, y) produced by cutting it with the planes y = 0, y = 1, y = 2, and y = 3. (B) Describe the cross sections of the surface in the planes x = 0, x = 1, x =
> Let ((x, y) = √4 - y2 . (A) Explain why the cross sections of the surface z = ((x, y) produced by cutting it with planes parallel to x = 0 are semicircles of radius 2. (B) Describe the cross sections of the surface in the planes y = 0, y = 2, and y = 3
> Find the coordinates of B and H in the figure for Matched Problem 6 on page 807.
> For the function ((x, y) = 2xy2 , find
> For the function ((x, y) = x2 + 2y2 , find
> Let G(a, b, c) = a3 + b3 + c3 – (ab + ac + bc) - 6. Find all values of b such that G(2, b, 1) = 0.
> Let F(x, y) = xy + 2x2 + y2 - 25. Find all values of y such that F(y, y) = 0.
> Let F(x, y) = 5x - 4y + 12. Find all values of x such that F(x, 0) = 0.
> Find each indefinite integral and check the result by differentiating.
> Find a formula for the function K(C, h) of two variables that gives the volume of a right circular cone of circumference C and height h.
> Find a formula for the function T(x, y, z) of three variables that gives the square of the distance from the point (x, y, z) to the origin (0, 0, 0).
> Find a formula for the function W(x1, x2, x3, x4) of four variables that gives the total volume of oil that can be carried in four oil tankers of capacities x1, x2, x3, and x4, respectively.
> Find a formula for the function N( p, r) of two variables that gives the number of hot dogs sold at a baseball game, if p is the price per hot dog and r is the total amount received from the sale of hot dogs.
> Find a formula for the function V(d, h) of two variables that gives the volume of a right circular cylinder of diameter d and height h.
> find the indicated function f of a single variable.
> find the indicated function f of a single variable.
> find the indicated function f of a single variable.
> find the indicated value of the given function.
> find the indicated value of the given function.
> Find each indefinite integral. Check by differentiating.
> find the indicated value of the given function.
> find the indicated value of the given function.
> find the indicated value of the given function.
> find the indicated values of ((x, y, z) = 2x - 3y2 + 5z3 – 1 ((-10, 4, -3)
> find the indicated values of ((x, y, z) = 2x - 3y2 + 5z3 – 1 ((0, 0, 2)
> Find the indicated values of the functions g(0, 0)
> Find the indicated values of the functions g (-2, 0)
> Find the indicated values of the functions
> Find the indicated values of the functions
> find the indicated value of the function of two or three variables. The height of a right circular cone is 42 inches and the radius is 7 inches. Find the volume.
> Find each indefinite integral and check the result by differentiating.
> Use Table 1 in Appendix C to find each indefinite integral //
> Round function values to four decimal places and the final answer to two decimal places. Use Simpson’s rule with n = 2 (so there are 2n = 4 subintervals) to approximate
> Round function values to four decimal places and the final answer to two decimal places. Use Simpson’s rule with n = 1 (so there are 2n = 2 subintervals) to approximate.
> Round function values to four decimal places and the final answer to two decimal places. Use the trapezoidal rule with n = 4 to approximate
> Round function values to four decimal places and the final answer to two decimal places.
> For the voters of Problem 92, graph y = ((t) and the line representing the average number of voters over the interval [0, 10] in the same coordinate system. Describe how the areas under the two curves over the interval [0, 10] are related. Data from Pro
> The number of voters (in thousands) in a metropolitan area is given approximately by where t is time in years. Find the average number of voters during the period from t = 0 to t = 10.
> The concentration of particulate matter (in parts per million) during a 24-hour period is given approximately by where t is time in hours. Find the average concentration during the period from t = 0 to t = 24.
> The marginal revenue for a company that manufactures and sells x graphing calculators per week is given by where R(x) is the revenue in dollars. Find the revenue function and the number of calculators that must be sold (to the nearest unit) to produce
> For the motor oil of Problem 84, graph the price–demand equation and the line representing the average price in the same coordinate system over the interval [50, 250]. Describe how the areas under the two curves over the int
> Find each indefinite integral. Check by differentiating.
> At a discount department store, the price– demand equation for premium motor oil is given by where x is the number of cans of oil that can be sold at a price of $p. Find the average price over the demand interval [50, 250].
> Graph y = x and the Lorenz curve of Problem 80 over the interval [0, 1]. Discuss the effect of the area bounded by y = x and the Lorenz curve getting larger relative to the equitable distribution of income.
> Find the Gini index of income concentration for the Lorenz curve with equation.
> Find the interest earned at 3.7%, compounded continuously, for 5 years for the continuous income stream with rate of flow ((t) = 200t.
> A company manufactures a portable DVD player. It has fixed costs of $11,000 per week and a marginal cost given by where C(x) is the total cost per week at an output of x players per week. Find the cost function C(x) and determine the production level (
> Graph the price–supply equation and the price-level equation p = 20 of Problem 72 in the same coordinate system. What region represents the producers’ surplus?