Suppose that a region R has area A and lies above the x-axis. When R is rotated about the x-axis, it sweeps out a solid with volume V1. When R is rotated about the line y = -k (where k is a positive number), it sweeps out a solid with volume V2. Express V2 in terms of V1, k, and A.
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. In x dx
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. *2 (2' In z dz Jo
> Find the area under the curve y = 1/x3 from x = 1 to x = t and evaluate it for t = 10, 100, and 1000. Then find the total area under this curve for x > 1.
> Find the minimum value of the area of the region under the curve y = x + 1/x from x = a to x = a + 1.5, for all a > 0.
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. 33 " (x – 1)-1/5 dx
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. хр (х — 6)° J6 4.
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. *14 dx -2 x + 2
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. 3 dx
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. dx. e2* + 3
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. Je x(In x)
> If x is measured in meters and f (x) is measured in newtons, what are the units for f0100 f (x) dx?
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. In x dx .3
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. x? dx 9 + x*
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. x'e dx
> The line y = mx + b intersects the parabola y = x2 in points A and B. (See the figure.) Find the point P on the arc AOB of the parabola that maximizes the area of the triangle PAB. y y =x B y = mx +b P
> (a). The base of a solid is a square with vertices located at (1, 0), (0, 1) and (0, -1). Each cross-section perpendicular to the x-axis is a semicircle. Find the volume of the solid. (b). Show that by cutting the solid of part (a), we can rearrange it t
> Which of the following integrals are improper? Why? (a) f dx. 2x - 1 (b) Jo 2x 1 dx :- 1 sin x dx -1+x* (d) * In(x – 1) dx
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. In x dx
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. 9. re dr
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. se-* ds -5s Jo
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. * cos at dt
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. x +1 - dx x? + 2x
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. dx
> Since raindrops grow as they fall, their surface area increases and therefore the resistance to their falling increases. A raindrop has an initial downward velocity of 10 m/s and its downward acceleration is If the raindrop is initially 500 m above the
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. xedx
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. L – 3y°) dy
> Use an integral to estimate the sum ∑(i=1)^1000 √i.
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. sin e de
> Determine whether each integral is convergent or divergent. Evaluate those that are convergent. -1 -21 dt
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. | tan'(7x) dx TX
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) In x -dx, п 3D 10 dx, n= 1 +х
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) *1/2 sin(r*) dx, n= 4
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) 1 + x² dx, n = 8
> A bacteria population starts with 400 bacteria and grows at a rate of r (t) = (450.268) e1.12567t bacteria per hour. How many bacteria will there be after three hours?
> An oil storage tank ruptures at time t = 0 and oil leaks from the tank at a rate of r (t) = 100e-0.01t liters per minute. How much oil leaks out during the first hour?
> A manufacturer of lightbulbs wants to produce bulbs that last about 700 hours but, of course, some bulbs burn out faster than others. Let F (t) be the fraction of the company’s bulbs that burn out before t hours, so F (t) always lies be
> (a). If f (x) = ln x, 1 < x < 4, use the commands discussed in Exercise 9 to find the left and right sums for n = 10, 30, and 50. Exercise 9: Some computer algebra systems have commands that will draw approximating rectangles and evaluate the sums of t
> If P (a, a2) is any point on the parabola y = x2, except for the origin, let Q be the point where the normal line intersects the parabola again. Show that the line segment PQ has the shortest possible length when a = 1/√2. y P
> A model for the basal metabolism rate, in kcal/h, of a young man is R (t) = 85 – 0.18 cos (πt/12), where t is the time in hours measured from 5:00 AM. What is the total basal metabolism of this man, f240 R (t) dt, over a 24-hour time period?
> Which of the following areas are equal? Why? yA y y = 2xe" y y= ein x sin 2.r
> Evaluate f10 x√1 – x4, dx by making a substitution and interpreting the resulting integral in terms of an area.
> Use (a) the Midpoint Rule and (b) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) Compare your results to the actual value to determine the error in each approx
> Evaluate f2-2 (x + 3) √4 – x2, dx by writing it as a sum of two integrals and interpreting one of those integrals in terms of an area.
> Verify that f (x) = sin 3√x is an odd function and use that fact to show that <L, sin ī dx < 1
> Evaluate the definite integral. f10 dx/ (1 + √x)4
> Evaluate the definite integral. fπ/20 sin (2πt/T – a) dt
> Evaluate the definite integral. f1/20 sin-1 x/√1 – x2, dx
> Evaluate the definite integral. f10 ez + 1/ez – 1, dz
> Sketch the set of all points (x, y) such that |x + y| < ex.
> Evaluate the definite integral. f21 x √x – 1, dx
> Evaluate the definite integral. fπ/2-π/2 x2 sin x/1 + x6, dx
> Use (a) the Midpoint Rule and (b) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) Compare your results to the actual value to determine the error in each approx
> Evaluate the definite integral. fπ/4-π/4 (x3 + x4 tan x) dx
> Evaluate the definite integral. fπ/20 cos x sin (sin x) dx
> If f (0) = g (0) = 0 and f" and g" are continuous, show that fWg"(x) dx = f(a)g'(a) – f'(a)gla) + {" f"()g(1) dx
> (a). Use integration by parts to show that f f (x) dx = xf (x) – f xf'(x) dx (b). If f and g are inverse functions and f' is continuous, prove that [Hint: Use part (a) and make the substitution y = f (x)] (c). In the case where f and
> Suppose that f (1) = 2, f (4) = 7, f'(1) = 5, f'(4) = 3, and f" is continuous. Find the value of f41 x f"(x) dx.
> A rocket accelerates by burning its onboard fuel, so its mass decreases with time. Suppose the initial mass of the rocket at liftoff (including its fuel) is m, the fuel is consumed at rate r, and the exhaust gases are ejected with constant velocity ve (r
> Solve Exercise 20 if the tank is half full of oil that has a density of 900 kg/m3. Exercise 20: A tank is full of water. Find the work required to pump the water out of the spout. In Exercises 21 and 22 use the fact that water weighs 62.5 lb/ft3.
> A particle that moves along a straight line has velocity v (t) = t2e-t meters per second after seconds. How far will it travel during the first seconds?
> Some of the pioneers of calculus, such as Kepler and Newton, were inspired by the problem of finding the volumes of wine barrels. (In fact, Kepler published a book Stereometria doliorum in 1615 devoted to methods for finding the volumes of barrels.) They
> Use integration by parts to prove the reduction formula. f xn ex dx = xn ex – n f xn-1 ex dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. 1 dx x?/4x? – 7
> Use integration by parts to prove the reduction formula. f (ln x) n dx = x (ln x) n – n f (ln x) n-1 dx
> Use the Trapezoidal Rule with n = 10 to approximate f200 cos (πx) dx. Compare your result to the actual value. Can you explain the discrepancy?
> Sketch the graph of a continuous function on [0, 2] for which the Trapezoidal Rule with n = 2 is more accurate than the Midpoint Rule.
> Sketch the graph of a continuous function on [0, 2] for which the right endpoint approximation with n = 2 is more accurate than Simpson’s Rule.
> The intensity of light with wavelength traveling through a diffraction grating with N slits at an angle θ is given by I (θ) = N2 sin2k/k2, where k = (πNd sin θ)/λ and d is the distance between adjacent slits. A helium-neon laser with wavelength λ = 632.8
> The figure shows a pendulum with length L that makes a maximum angle θ0 with the vertical. Using Newton’s Second Law, it can be shown that the period T (the time for one complete swing) is given by where k = sin (1/2&Icir
> A uniform disk with radius 1 m is to be cut by a line so that the center of mass of the smaller piece lies halfway along a radius. How close to the center of the disk should the cut be made? (Express your answer correct to two decimal places.)
> (a). Use the table of integrals to evaluate F (x) = f f (x) dx, where f (x) = 1/x√1 – x2 What is the domain of f and F? (b). Use a CAS to evaluate F (x). What is the domain of the function F that the CAS produces? Is there a discrepancy between this doma
> Shown is the graph of traffic on an Internet service provider’s T1 data line from midnight to 8:00 AM. D is the data throughput, measured in megabits per second. Use Simpson’s Rule to estimate the total amount of data
> Let R be the region that lies between the curves y = xm and y = xn, 0 < x < 1, where m and n are integers with 0 < n < m. (a). Sketch the region R. (b). Find the coordinates of the centroid of R. (c). Try to find values of m and n such that the centroid
> The table (supplied by San Diego Gas and Electric) gives the power consumption P in megawatts in San Diego County from midnight to 6:00 AM on a day in December. Use Simpson’s Rule to estimate the energy used during that time period. (Us
> Water leaked from a tank at a rate of r (t) liters per hour, where the graph of is as shown. Use Simpson’s Rule to estimate the total amount of water that leaked out during the first 6 hours. 4 2 4 6 1 (seconds) 2.
> Estimate f10cos (x2) dx using (a) the Trapezoidal Rule and (b) the Midpoint Rule, each with n = 4. From a graph of the integrand, decide whether your answers are underestimates or overestimates. What can you conclude about the true value of the integral?
> The graph of the acceleration a (t) of a car measured in ft/s2 is shown. Use Simpson’s Rule to estimate the increase in the velocity of the car during the 6-second time interval. a. 12 8 4 6 t (seconds) 4)
> A radar gun was used to record the speed of a runner during the first 5 seconds of a race (see the table). Use Simpson’s Rule to estimate the distance the runner covered during those 5 seconds. t (s) v (m/s) t (s) v (m/s) 3.0 10.51
> Estimate the area under the graph in the figure by using (a). the Trapezoidal Rule, (b). the Midpoint Rule, and (c). Simpson’s Rule, each with n = 6. у. 1 1 2 3 4 5 6 í
> Use a computer algebra system to evaluate the integral. Compare the answer with the result of using tables. If the answers are not the same, show that they are equivalent. |x*(1 + x')*dx
> A cow is tied to a silo with radius by a rope just long enough to reach the opposite side of the silo, as shown in the figure. Find the area available for grazing by the cow.
> Use a computer algebra system to evaluate the integral. Compare the answer with the result of using tables. If the answers are not the same, show that they are equivalent. sec" dx
> Verify Formula 31 (a) by differentiation and (b) by substituting u = a sin θ.
> Verify Formula 53 in the Table of Integrals (a) by differentiation and (b) by using the substitution t = a + bt.
> (a). Let R be the region that lies between two curves y = f (x) and y = g (x), where f (x) > g (x) and a (b). Find the centroid of the region bounded by the line y = x and the parabola y = x2. x[f(x) – g(x)] dx A A
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. Se' sin(at – 3) dt
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. Ver – I dx
> How large should n be to guarantee that the Simpson’s Rule approximation to f10ex2 dx is accurate to within 0.00001?
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. | 20 sin 30 de
> (a). Find the approximations T10, M10, and S10 for fπ0 sin x dx and the corresponding errors Et, EM, and Es. (b). Compare the actual errors in part (a) with the error estimates given by (3) and (4). (c). How large do we have to choose so that the approxi
> (a). Find the approximations T10 and M10 for f21 e1/x dx. (b). Estimate the errors in the approximations of part (a). (c). How large do we have to choose so that the approximations Tn and Mn to the integral in part (a) are accurate to within 0.0001?
> Find a function f such that f (1) = -1, f (4) = 7, and f'(x) > 3 for all x, or prove that such a function cannot exist.
> (a). Find the approximations T8 and M8 for the integral f10 cos (x2) dx. (b). Estimate the errors in the approximations of part (a). (c). How large do we have to choose n so that the approximations Tn and Mn to the integral in part (a) are accurate to wi
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) Г In(x + 2) dx, п%3 10
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) cos x -dx, n= 8 rs
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) cos Vi dx, Vī dx, n = 10
> A bowl is shaped like a hemisphere with diameter 30 cm. A heavy ball with diameter 10 cm is placed in the bowl and water is poured into the bowl to a depth of h centimeters. Find the volume of water in the bowl.
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) sin t dt, n = 8
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) VI+ Vĩ dx, n= 8
> Use (a) the Trapezoidal Rule, (b) the Midpoint Rule, and (c) Simpson’s Rule to approximate the given integral with the specified value of n. (Round your answers to six decimal places.) *1/2 sin(e"2) dt, n= 8