Use long division to evaluate the integral. f x/x – 6, dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. x' sin x dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. 2y² – 3 dy
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. e2* arctan(e*) dx
> Use Exercise 40 to find f x4 ex dx. Exercise 40: f xn ex dx = xn ex – n f xn-1 ex dx
> Find the volume common to two spheres, each with radius r, if the center of each sphere lies on the surface of the other sphere.
> Use Exercise 39 to find f (ln x)3 dx. Exercise 39: f (ln x) n dx = x (ln x) n – n f (ln x) n-1 dx
> Prove that, for even powers of sine, 'm/2 1.3.5. . 3-5. (2n – 1) T sin2"x dx 2.4. 6. .... 2n 2
> (a). Use the reduction formula in Example 6 to show that fπ/20 sinnx dx = n – 1/n, fπ/20 sinn-2x dx where n > 2 is an integer. (b). Use part (a) to evaluate fπ/20 sin3x dx and fπ/20 sin5x d
> By completing the square in the quadratic 3 – 2x – x2 and making a trigonometric substitution, evaluate. dx V3 – 2x – x2
> If a, b, c, and d are constants such that find the value of the sum a + b + c + d. ax? + sin bx + sin cx + sin dx lim 8 3x? + 5x* + 7x6
> By completing the square in the quadratic x2 + x + 1 and making a substitution, evaluate dx x? + x+ 1
> Computer algebra systems sometimes need a helping hand from human beings. Try to evaluate f (1+ ln x) √1 + (x ln x)2, dx with a computer algebra system. If it doesn’t return an answer, make a substitution that changes the integral into one that the CAS c
> 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. 1 dx VI +
> 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. tan'x dx
> 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. | sin'x dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. dx x/4x2 + 9
> Let In = fπ/20 sinnx dx. (a). Show that I2n+2 (b). Use Exercise 38 to show that Exercise 38: Prove that, for even powers of sine, fπ/20 sin2nx dx = 1.3.5…. (2n – 1) π/ 2.4.6. . . 2n
> 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. +2x хр
> 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. dx Je-(3e* + 2)
> 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. Sr Vx? + 4 dx
> The figure shows a semicircle with radius 1, horizontal diameter PQ, and tangent lines at P and Q. At what height above the diameter should the horizontal line be placed so as to minimize the shaded area? P.
> 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. 6 ft 8 ft -3 ft frustum of a cone
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. sec?0 tan?0 de 9 – tan20
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. V4 + (In x)² dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. x'e-* dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. x*dx 10 – 2
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. r/4x? – x* dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. dx 3 - e2x
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. sin 20 de 5 - sin 0
> For the function f whose graph is shown, list the following quantities in increasing order, from smallest to largest, and explain your reasoning. -2 5 (A) f f(x) dx (C) § f(x) dx (E) f'(1) (B) § f(x) dx (D) f(x) dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. | sin'x cos x In(sin x) dx
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. x sin(x?) cos(3x?) dx
> Let P be a pyramid with a square base of side 2b and suppose that is a sphere with its center on the base of P and S is tangent to all eight edges of P. Find the height of P. Then find the volume of the intersection of S and P.
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. f v6 + 4y – 4y² dy
> Use the Table of Integrals on Reference Pages 6–10 to evaluate the integral. ( sin-'VI dx
> Use the substitution u = tan x to evaluate the integral. n/4 tan'x sec'r dx
> Use the substitution u = sec x to evaluate the integral. ( tan'x sec'x dx
> Use the substitution u = sec x to evaluate the integral. | tan'x sec x dx
> Evaluate the integral. fπ/20 sin2x cos2x dx
> Evaluate the integral. f2π0 cos2 (6θ) dθ
> Evaluate the integral. f sin3 (mx) dx
> A wedge is cut out of a circular cylinder of radius 4 by two planes. One plane is perpendicular to the axis of the cylinder. The other intersects the first at an angle of 300 along a diameter of the cylinder. Find the volume of the wedge.
> Make a substitution to express the integrand as a rational function and then evaluate the integral. dx 2Vx + 3 + x
> A sphere of radius 1 overlaps a smaller sphere of radius in such a way that their intersection is a circle of radius r. (In other words, they intersect in a great circle of the small sphere.) Find r so that the volume inside the small sphere and outside
> Make a substitution to express the integrand as a rational function and then evaluate the integral. 16 x, -dx У9 х — 4
> Use long division to evaluate the integral. f10 x3 – 4x -10/ x2 – x – 6, dx
> Use long division to evaluate the integral. f x3 + 4/x2 + 4, dx
> Use long division to evaluate the integral. f r2/r + 4, dr
> Evaluate the integral. F3π/4π/2 sin5x cos3x dx
> Evaluate the integral. f x2 – x + 6/ x3 + 3x, dx
> Evaluate the integral. f x3 + x2 + 2x + 1/ (x2 + 1) (x2 + 2), dx
> Evaluate the integral. f 2x2 + 5/ (x2 + 1) (x2 + 4), dx
> (a). Set up an integral for the volume of a solid torus (the donut-shaped solid shown in the figure) with radii r and R. (b). By interpreting the integral as an area, find the volume of the torus. -R-
> Water in an open bowl evaporates at a rate proportional to the area of the surface of the water. (This means that the rate of decrease of the volume is proportional to the area of the surface.) Show that the depth of the water decreases at a constant rat
> Some computer algebra systems have commands that will draw approximating rectangles and evaluate the sums of their areas, at least if is a left or right endpoint. (For instance, in Maple use leftbox, rightbox, leftsum, and rightsum.) (a). If f (x) = 1/ (
> First make a substitution and then use integration by parts to evaluate the integral. S cos Jī dx
> Evaluate the integral. f x2 + 2x – 1/ x3 – x, dx
> Evaluate the integral. f32 1/x2 – 1, dx
> Evaluate the integral. f10 x – 4/ x2 – 5x + 6, dx
> Evaluate the integral. f 5x + 1/ (2x + 1) (x – 1), dx
> Write out the form of the partial fraction expansion of the function. Do not determine the numerical values of the coefficients. x? (a) x? + x - 2 (b) x? + x + 2
> Evaluate the integral. fπ/20 cos5x dx
> Write out the form of the partial fraction expansion of the function. Do not determine the numerical values of the coefficients. 2x 1 (a) (x + 3)(3x + 1) (b) x' + 2x? + x
> Evaluate the integral. fx3/√x2 + 1, dx
> Archimedes’ Principle states that the buoyant force on an object partially or fully submerged in a fluid is equal to the weight of the fluid that the object displaces. Thus, for an object of density p0 floating partly submerged in a flu
> Evaluate the integral. f dx/x2√4 – x2
> Suppose that 0 < c < π/2. For what value of is the area of the region enclosed by the curves y = cos x, y = cos (x – c), and x = 0 equal to the area of the region enclosed by the curves y = cos (x – c), x = π, and y = 0?
> Evaluate the integral. f2√30 x3/√16 – x2, dx
> Evaluate the integral. f2√2 1/t3√t2 - 1
> (a). Verify, by differentiation, that f sec3θ dθ = 1/2 (sec θ tan θ+ ln |sec θ + tan θ|) + C (b). Evaluate f10 √x2 + 1, dx.
> Use the substitution x = 2 tan θ, -π/2 1 dx x'Vx? + 4
> Use the substitution x = sec θ, where 0 :- 1 di
> Evaluate the integral. f arctan 4t dt
> Use the substitution u = tan x to evaluate the integral. tan'x secéx dx
> Evaluate the integral. f sin3x cos2x dx
> Suppose that for the tank in Exercise 19 the pump breaks down after 4.7 × 105 J of work has been done. What is the depth of the water remaining in the tank? Exercise 19: A tank is full of water. Find the work required to pump the water out
> Evaluate the integral. f ln 3√x dx
> Evaluate the integral. f x2 cos mx dx
> Find a positive continuous function f such that the area under the graph of f from 0 to t is A (t) = t3 for all t > 0.
> Evaluate the integral. f x2 sin πx dx
> Evaluate the integral. f t sin 2t dt
> Evaluate the integral. f rer/2 dr
> Evaluate the integral. f xe-x dx
> (a). Prove the reduction formula f cosnx dx = 1/n cosn-1 x sin x + n – 1/n f cosn-2x dx (b). Use part (a) to evaluate f cos2 x dx. (c). Use parts (a) and (b) to evaluate f cos4x dx.
> (a). Use the reduction formula in Example 6 to show that f sin2x x dx = x/2 – sin2x/4 + C. (b). Use part (a) and the reduction formula to evaluate f sin4x dx.
> Evaluate the indefinite integral. Illustrate, and check that your answer is reasonable, by graphing both the function and its antiderivative (take C = 0). (x? sin 2x dx
> (a). Show that the volume of a segment of height of a sphere of radius r is (See the figure.) (b). Show that if a sphere of radius 1 is sliced by a plane at a distance from the center in such a way that the volume of one segment is twice the volume of
> Evaluate the indefinite integral. Illustrate, and check that your answer is reasonable, by graphing both the function and its antiderivative (take C = 0). VI +x² dx
> Evaluate the indefinite integral. Illustrate, and check that your answer is reasonable, by graphing both the function and its antiderivative (take C = 0). x3/2 In x dx
> Evaluate the indefinite integral. Illustrate, and check that your answer is reasonable, by graphing both the function and its antiderivative (take C = 0).
> (a). Find the number such that the line x = a bisects the area under the curve y = 1/x2, 1 < x < 4. (b). Find the number such that the line y = b bisects the area in part (a).
> First make a substitution and then use integration by parts to evaluate the integral.
> Evaluate the integral. f x cox x dx
> First make a substitution and then use integration by parts to evaluate the integral.
> First make a substitution and then use integration by parts to evaluate the integral.
> First make a substitution and then use integration by parts to evaluate the integral.
> First make a substitution and then use integration by parts to evaluate the integral.
> (a). Graph several members of the family of functions f (x) = (2cx – x2)/c3 for c > 0 and look at the regions enclosed by these curves and the -axis. Make a conjecture about how the areas of these regions are related. (b). Prove your conjecture in part (
> Evaluate the integral. ft0 ex sin (t – s) ds
> Evaluate the integral. f21 (ln x)2 dx
