[SOLVED] Use the four-step process to find ( = (

> Refer to functions f and g that satisfy ï¦â (2) = 3 and gâ (2) = -1. In each problem, find hâ (2) for the indicated function h.

> Find the indicated derivatives.

> In a three-way race for the U.S. Senate, polls indicate that the two leading candidates are running neck-and-neck, while the third candidate is receiving half the support of either of the others. Registered voters are chosen at random and asked which of

> Find the indicated derivatives.

> Find the indicated derivatives. g′(x) for g(x) = x9

> Find the indicated derivatives. y′ for y = x8

> Find the indicated derivatives.

> Write the expression in the form a + b1n where a and b are reduced fractions and n is an integer

> Find the slope of the line through the given points. Write the slope as a reduced fraction, and also give its decimal form. Answer:

> Find the slope of the line through the given points. Write the slope as a reduced fraction, and also give its decimal form.

> The body temperature (in degrees Fahrenheit) of a patient t hours after taking a fever-reducing drug is given by (A) Use the four-step process to find F= (t). (B) Find F(3) and F= (3). Write a brief verbal interpretation of these results.

> Refer to the data in Table 1. (A) Let x represent time (in years) with x = 0 corresponding to 2000, and let y represent the corresponding commercial sales. Enter the appropriate data set in a graphing calculator and find a quadratic regression equation

> Use the equally likely sample space in Example 2 to compute the probability of the following events: The number on the first die is even or the number on the second die is even.

> The U.S. consumption of refined copper (in thousands of metric tons) is given approximately by P(t) = 48t2 - 37t + 1,698 where t is time in years and t = 0 corresponds to 2010. (A) Use the four-step process to find p′(t). (B) Find the annual consumptio

> A company’s total sales (in millions of dollars) t months from now are given by S(t) = √t + 8 (A) Use the four-step process to find S′1t2. (B) Find S(9) and S′(9). Write a brief verbal interpretation of these results. (C) Use the results in part (B)

> The profit (in dollars) from the sale of x infant car seats is given by P(x) = 45x - 0.025x2 - 5,000 0 ≤ x ≤ 2,400 (A) Find the average change in profit if production is changed from 800 car seats to 850 car seats. (B) Use the four-step process to fin

> Repeat Problem 79 if the balloon is 1,024 feet above the ground when the ball is dropped. Data from Problem 79: A ball dropped from a balloon falls y = 16x2 feet in x seconds. If the balloon is 576 feet above the ground when the ball is dropped, when do

> Determine whether ï¦ is differentiable at x = 0 by considering

> Determine whether ï¦ is differentiable at x = 0 by considering ï¦(x) = x2/3

> Determine whether ï¦ is differentiable at x = 0 by considering ï¦(x) = 1 - | x |

> sketch the graph of ï¦ and determine where ï¦ is nondifferentiable.

> Discuss the validity of each statement. If the statement is always true, explain why. If not, give a counterexample. If the graph of f has a sharp corner at x = a, then f is not continuous at x = a

> Refer to the description of a standard deck of 52 cards and Figure 4 on page 384. An experiment consists of dealing 5 cards from a standard 52-card deck. In Problems what is the probability of being dealt. Figure 4: 5 nonface cards.

> Discuss the validity of each statement. If the statement is always true, explain why. If not, give a counterexample. if a function f is differentiable on the interval (a, b), then f is continuous on (a, b)

> Discuss the validity of each statement. If the statement is always true, explain why. If not, give a counterexample. If (x) = mx + b is a linear function, then ’(x) = m.

> Let (x) = -x2 , g(x) = -x2 - 1, and h(x) = -x2 + 2. (A) How are the graphs of these functions related? How would you expect the derivatives of these functions to be related? (B) Use the four-step process to find the derivative of m(x) = -x2 + C, whe

> Repeat Problem 59 with (x) = 8x2 - 4x. Data from Problem 59: If an object moves along a line so that it is at y = (x) = 4x2 - 2x at time x (in seconds), find the instantaneous velocity function v = (x) and find the velocity at times x = 1, 3, and 5

> (A) Find  = (x). (B) Find the slopes of the lines tangent to the graph of  at x = 0, 2, and 4. (C) Graph  and sketch in the tangent lines at x = 0, 2, and 4.  (x) = 4x - x2 + 1

> Refer to the function F in the graph shown. Use the graph to determine whether Fâ(x) exists at each indicated value of x x = h

> Refer to the function F in the graph shown. Use the graph to determine whether Fâ(x) exists at each indicated value of x x = ï¦.

> Refer to the function F in the graph shown. Use the graph to determine whether Fâ(x) exists at each indicated value of x x = d

> Refer to the function F in the graph shown. Use the graph to determine whether Fâ(x) exists at each indicated value of x x = b

> suppose an object moves along the y axis so that its location is y = (x) = x2 + x at time x (y is in meters and x is in seconds). Find (A) The average velocity (the average rate of change of y with respect to x) for x changing from 2 to 4 seconds (B) T

> Use the equally likely sample space in Example 2 to compute the probability of the following events: A sum that is greater than 9.

> Refer to the graph of y = ( (x) = x2 + x shown. (A) Find the slope of the secant line joining (2, ï¦(2)) and (4, ï¦(4)). (B) Find the slope of the secant line joining (2, ï¦(2)) and (2 + h, ï&#

> Use the four-step process to find ( = (x) and then find ( = (1) , ( = (2), and ( = (3).

> Refer to the description of a standard deck of 52 cards and Figure 4 on page 384. An experiment consists of dealing 5 cards from a standard 52-card deck. what is the probability of being dealt. Figure 4: 5 Hearts?/

> Use the four-step process to find ( = (x) and then find ( = (1) , ( = (2), and ( = (3).

> For ((x) = x4 , the instantaneous rate of change is known to be -4 at x = -1. Find the equation of the tangent line to the graph of y = ((x) at the point with x coordinate -1.

> For( (x) = 1 / + x2, the slope of the graph of y = ( (x) is known to be -0.16 at the point with x coordinate 2. Find the equation of the tangent line at that point.

> Four hours after the start of a 600-mile auto race, a driverâs velocity is 150 miles per hour as she completes the 352nd lap on a 1.5-mile track.

> Find the indicated quantities for f(x) = 3x2 .

>

> Use interval notation to specify the given interval.

> If the probability is .03 that an automobile tire fails in less than 50,000 miles, what is the probability that the tire does not fail in 50,000 miles?

> Use interval notation to specify the given interval.

> Use interval notation to specify the given interval. The set of all real numbers from -8 to -4, excluding -8 but including -4

> The graph shown represents the history of a person learning the material on limits and continuity in this book. At time t2, the studentâs mind goes blank during a quiz. At time t4, the instructor explains a concept particularly well, th

> An office equipment rental and leasing company rents copiers for $10 per day (and any fraction thereof) or for $50 per 7-day week. Let C1x2 be the cost of renting a copier for x days.

> Table 2 shows the rates for natural gas charged by the Middle Tennessee Natural Gas Utility District during winter months. The base charge is a fixed monthly charge, independent of the amount of gas used per month. (A) Write a piecewise definition of t

> Discuss the differences between the function S(x) = 15 + 10 [x] and R(x) defined in Problem 90. (The symbol [x] is defined in problems 75 and 76.)

> A bike rental service charges $15 for the first hour (or any fraction thereof) and $10 for each additional hour (or fraction thereof) up to a maximum of 8 hours. (A) Write a piecewise definition of the charge R(x) for a rental lasting x hours. (B) Grap

> The function ((x) = 6 / (x – 4) satisfies ((2) = -3 and ((7) = 2. Is ( equal to 0 anywhere on the interval (0, 9)? Does this contradict Theorem 2? Explain.

> Sketch a possible graph of a function ( that is continuous for all real numbers and satisfies the given conditions. Find the x intercepts of (. ((x) > 0 on (1 - ∞, -3) and (2, 7); ( (x) < 0 on (-3, 2) and ( 7 , ∞)

> A keypad at the entrance of a building has 10 buttons labeled 0 through 9. What is the probability of a person correctly guessing a 4-digit entry code if they know that no digits repeat

> Sketch a possible graph of a function ( that is continuous for all real numbers and satisfies the given conditions. Find the x intercepts of (. ((x) > 0 on (- ∞, -4) and (3, ∞); ( (x) 6 0 on (-4, 3)

> Discuss the validity of each statement. If the statement is always true, explain why. If not, give a counterexample. The greatest integer function is a rational function.

> Discuss the validity of each statement. If the statement is always true, explain why. If not, give a counterexample. If ( is a function that is continuous on the open interval (0, 2), then f is continuous at x = 1.

> Discuss the validity of each statement. If the statement is always true, explain why. If not, give a counterexample. A rational function is continuous for all but finitely many real numbers.

> Refer to the greatest integer function, which is denoted by (x) and is defined as A) Is f continuous from the right at x = 2? (B) Is f continuous from the left at x = 2? (C) Is f continuous on the open interval (1, 2)? (D) Is f continuous on the clo

> Graph f, locate all points of discontinuity, and discuss the behavior of f at these points.

> Use Theorem 1 to determine where each function Express the answer in interval notation.

> In a lottery game, a single ball is drawn at random from a container that contains 25 identical balls numbered from 1 through 25. Compute the probability that the number drawn is: Prime or less than 14.

> Use Theorem 1 to determine where each function Express the answer in interval notation.

> Use a graphing calculator to approximate the partition numbers of each function f(x) to four decimal places. Then solve the following inequalities: (A) f (x) (B) f (x) Express answers in interval notation.

> Use the graph of g to determine where (A) g(x) 7 0 (B) g(x) 6 0 Express answers in interval notation.

> Use a sign chart to solve each inequality. Express answers in inequality and interval notation.

> Find all partition numbers of the function.

> In a family with 3 children, excluding multiple births, what is the probability of having 2 boys and 1 girl, in any order? Assume that a boy is as likely as a girl at each birth.

> Find all partition numbers of the function.

> Use Theorem 1 to determine where each function.

> use the four-step process to find f = (x) and then find ï¦ = 112, ï¦= 122, and ï¦ = 132.

Question: Use the four-step process to find ( = (