1 Limits And Continuity 2 The Derivative 3 Topics In Differentiation 4 The Derivative In Graphing And Applications 5 Integration 6 Applications Of The Definite Integral In Geometry, Science, And Engineering 7 Principles Of Integral Evaluation 8 Mathematical Modeling With Differential Equations 9 Infinite Series 10 Parametric And Polar Curves; Conic Sections 11 Three-dimensional Space; Vectors 12 Vector-valued Functions 13 Partial Derivatives 14 Multiple Integrals 15 Topics In Vector Calculus expand_more
5.1 An Overview Of The Area Problem 5.2 The Indefinite Integral 5.3 Integration By Substitution 5.4 The Definition Of Area As A Limit; Sigma Notation 5.5 The Definite Integral 5.6 The Fundamental Theorem Of Calculus 5.7 Rectilinear Motion Revisited Using Integration 5.8 Average Value Of A Function And Its Applications 5.9 Evaluating Definite Integrals By Substitution 5.10 Logarithmic And Other Functions Defined By Integrals Chapter Questions expand_more
Problem 1QCE: A function is an antiderivative of a function on an interval if for all in the interval.
Problem 2QCE: Write an equivalent integration formula for each given derivative formula. (a) ddxx=12x (b)... Problem 3QCE: Evaluate the integrals.
(a)
(b)
Problem 4QCE: The graph of y=x2+x is an integral curve for the function fx= .If G is a function whose graph is... Problem 5QCE: A slope field for the differential equation dydx=2xx24 has a line segment with slope through the... Problem 1ES: In each part, confirm that the formula is correct, and state a corresponding integration formula.... Problem 2ES Problem 3ES: What is a constant of integration? Why does an answer to an integration problem involve a constant... Problem 4ES: What is an integral curve of a function f ? How are two integral curves of a function f related? Problem 5ES: Find the derivative and state a corresponding integration formula. 5. ddx2x3+3 Problem 6ES Problem 7ES Problem 8ES: Find the derivative and state a corresponding integration formula. ddxsinxxcosx Problem 9ES: Evaluate the integral by rewriting the integrand appropriately, if required, and applying the power... Problem 10ES: Evaluate the integral by rewriting the integrand appropriately, if required, and applying the power... Problem 11ES: Evaluate each integral by applying Theorem 5.2.3 and Formula 2 in Table 5.2.1 appropriately.... Problem 12ES Problem 13ES: Evaluate each integral by applying Theorem 5.2.3 and Formula 2 in Table 5.2.1 appropriately.... Problem 14ES: Evaluate each integral by applying Theorem 5.2.3 and Formula 2 in Table 5.2.1 appropriately.... Problem 15ES: Evaluate the integral and check your answer by differentiating. x1+x3dx Problem 16ES: Evaluate the integral and check your answer by differentiating. 2+y22dy Problem 17ES: Evaluate the integral and check your answer by differentiating. x1/32x2dx Problem 18ES Problem 19ES: Evaluate the integral and check your answer by differentiating. x5+2x21x4dx Problem 20ES Problem 21ES: Evaluate the integral and check your answer by differentiating. 2x+3exdx Problem 22ES: Evaluate the integral and check your answer by differentiating. 12t2etdt Problem 23ES: Evaluate the integral and check your answer by differentiating. 3sinx2sec2xdx Problem 24ES: Evaluate the integral and check your answer by differentiating. csc2tsecttantdt Problem 25ES: Evaluate the integral and check your answer by differentiating. secxsecx+tanxdx Problem 26ES: Evaluate the integral and check your answer by differentiating. cscxsinx+cotxdx Problem 27ES: Evaluate the integral and check your answer by differentiating. seccosd Problem 28ES Problem 29ES: Evaluate the integral and check your answer by differentiating. sinxcos2xdx Problem 30ES: Evaluate the integral and check your answer by differentiating. +2sin2d Problem 31ES: Evaluate the integral and check your answer by differentiating. 1+sin2cscd Problem 32ES: Evaluate the integral and check your answer by differentiating. secx+cosx2cosxdx Problem 33ES: Evaluate the integral and check your answer by differentiating. 121x231+x2dx Problem 34ES: Evaluate the integral and check your answer by differentiating. 4xx21+1+x+x31+x2dx Problem 35ES: Evaluate the integral 11+sinxdx by multiplying the numerator and denominator by an appropriate... Problem 36ES: Use the double-angle formula cos2x=2cos2x1 to evaluate the integral 11+cos2dx Problem 37ES: True-False Determine whether the statement is true or false. Explain your answer. If Fx is an... Problem 38ES: True-False Determine whether the statement is true or false. Explain your answer. If C denotes a... Problem 39ES: True-False Determine whether the statement is true or false. Explain your answer. The function... Problem 40ES: True-False Determine whether the statement is true or false. Explain your answer. Every integral... Problem 41ES: Use a graphing utility to generate some representative integral curves of the function fx=5x4sec2x... Problem 42ES: Use a graphing utility to generate some representative integral curves of the function fx=x1/x over... Problem 43ES: Solve the initial-value problems. (a) dydx=x3,y1=2 (b) dydt=sint+1,y3=12 (c) dydx=x+1x,y1=0 Problem 44ES: Solve the initial-value problems. (a) dydx=12x3,y1=0 (b) dydt=sec2tsint,y4=1 (c) dydx=x2x3,y0=0 Problem 45ES: Solve the initial-value problems. (a) dydx=4ex,y0=1 (b) dydt=1t,y1=5 Problem 46ES: Solve the initial-value problems. (a) dydt=31t2,y32=0 (b) dydt=x21x2+1,y1=2 Problem 47ES: A particle moves along an s-axis with position function s=st and velocity function t=st . Use the... Problem 48ES: A particle moves along an s-axis with position function s=st and velocity function t=st . Use the... Problem 49ES: A particle moves along an s-axis with position function s=st and velocity function t=st . Use the... Problem 50ES: A particle moves along an s-axis with position function s=st and velocity function t=st . Use the... Problem 51ES: Find the general form of a function whose second derivative is x . Problem 52ES: Find a function f such that fx=x+cosx and such that f0=1 and f0=2 . Problem 53ES: Find an equation of the curve that satisfies the given conditions. At each point x,y on the curve... Problem 54ES: Find an equation of the curve that satisfies the given conditions. At each point x,y on the curve... Problem 55ES: Find an equation of the curve that satisfies the given conditions. At each point x,y on the curve... Problem 56ES: Find an equation of the curve that satisfies the given conditions. At each point x,y on the curve... Problem 57ES: Find an equation of the curve that satisfies the given conditions. At each point x,y on the curve, y... Problem 58ES: In each part, use a CAS to solve the initial-value problem. (a) dydx=x2cos3x,y/2=1 (b)... Problem 59ES: (a) Use a graphing utility to generate a slope field for the differential equation dy/dx=x in the... Problem 60ES: (a) Use a graphing utility to generate a slope field for the differential equation dy/dx=ex/2 in the... Problem 61ES: The given slope field figure corresponds to one of the differential equations below. Identify the... Problem 62ES: The given slope field figure corresponds to one of the differential equations below. Identify the... Problem 63ES: The given slope field figure corresponds to one of the differential equations below. Identify the... Problem 64ES: The given slope field figure corresponds to one of the differential equations below. Identify the... Problem 65ES: (a) Show that Fx=tan1x and Gx=tan11/x differ by a constant on the interval 0,+ by showing that they... Problem 66ES: Let F and G be the functions defined by Fx=x2+3xxandGx=x+3,x0x,x0 (a) Show that F and G have the... Problem 67ES: Use a trigonometric identity to evaluate the integral. tan2xdx Problem 68ES: Use a trigonometric identity to evaluate the integral. cot2xdx Problem 69ES: Use the identities cos2=12sin2=2cos21 to help evaluate the integrals (a) sin2x/2dx (b) cos2x/2dx Problem 70ES: Recall that ddxsec1x=1xx21 Use this to verify Formula 14 in Table 5.2.1 . Problem 71ES: The speed of sound in air at 0C (or 273K on the Kelvin scale) is 1087ft/s , but the speed increases... Problem 72ES: The time t between tosses of a juggling ball is a function of the height h of the toss. Suppose that... Problem 73ES: Suppose that a uniform metal rod 50cm long is insulated laterally, and the temperatures at the... Problem 74ES Problem 75ES: Writing What is an initial-value problem? Describe the sequence of steps for solving an... Problem 76ES: Writing What is a slope field? How are slope fields and integral curves related? format_list_bulleted