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Coffeyville Community College #MATH-120 COURSE SYLLABUS FOR CALCULUS WITH ANALYTIC GEOMETRY II Ryan Willis Instructor COURSE NUMBER: MATH-120 COURSE TITLE: CREDIT HOURS: 5 INSTRUCTOR: R. Willis OFFICE LOCATION: Math/Science Office Area, Arts and Sciences Building PHONE: Extension 2164 OFFICE HOURS: See schedule posted on office door PREREQUISITE(S): Trigonometry and Calculus with Analytic Geometry I REQUIRED TEXT AND MATERIALS: Calculus by Larson/Hostetler/Edwards 8th edition COURSE DESCRIPTION: EXPECTED LEARNER OUTCOMES: This course treats integration techniques, series, polar coordinates and vector applications. 1. 2. 3. 4. 5. 6. 7. 8. 9. 10. 11. 12. 13. LEARNING TASKS & ACTIVITIES: calculusii_rwillis Calculus with Analytic Geometry II Apply calculus concepts to trigonometric functions. Apply calculus concepts to the inverse trigonometric functions. Apply calculus concepts to the Hyperbolic Functions Use a variety of methods of integration. Apply the definite integral Use indeterminate forms and improper integrals Work with various series Use Taylor’s formula and power series Apply polar coordinates and parametric equations Work with two dimensional vectors Work with three dimensional geometry Work with surfaces Work with vector valued functions Unit I: Trigonometric Functions Unit II: Inverse Trigonometric Functions; Chapter 5 Unit III: Hyperbolic Functions; Chapter 5 Unit IV: Methods of Integration; Chapter 7/8 Unit V: Application of the Definite Integral; Chapter 7 Unit VI: Indeterminate Forms and Improper Integrals; Chapter 8 Unit VII: Series; Chapter 9 2 Unit VIII: Taylor’s Formula and Power Series; Chapter 9 Unit IX: Polar Coordinates and Parametric Equations; Chapter 10 Unit X: Two Dimensional Vectors; Chapter 11 Unit XI: Three Dimensional Geometry; Chapter 11 Unit XII: Surfaces; Chapter 11 Unit XIII: Vector Valued Functions; Chapter 12 ASSESSMENT OF OUTCOMES: Grades will be based on quizzes, tests, and homework. GRADE A B C D F TESTING: 1. 2. HOMEWORK: 1. 2. ATTENDANCE: 1. 2. 3. 4. calculusii_rwillis % 90 - 100 80 - 89 70 - 79 60 - 69 < 59 Students demonstrate the required behaviors on written examinations over the objectives No "retests" will be given. Homework will be assigned to help students learn the objectives. Homework is due at the time specified by the instructor. Late homework will not be accepted. Students are expected to attend all class sessions. Work missed due to absences must be made up in advance. Exams missed due to absences may be made up at the discretion of the instructor. Students in attendance are expected to demonstrate appropriate behavior. 3 COMPETENCIES: UNIT I: TRIGONOMETRIC FUNCTIONS APPLY CALCULUS CONCEPTS TO TRIGONOMETRIC FUNCTIONS 1. Sketch the graphs of sin(x) and cos(x). 2. State lim cos 3. State and prove: lim sin( x) a) =1 x→0 x b) ( x) = 1 x→0 1 − cos( x) =0 x x→0 lim c) d (sin x) = cos x dx d) df df du (Chain rule). (u ) = (u ) dx du dx e) d (cox) = − sin x dx f) d du sin u − cos u dx dx g) d du cos u = − sin u dx dx h) d du tan u − sec 2 u dx dx i) d du cot u = − csc 2 u dx dx j) d du sec u − sec u tan u dx dx k) du d csc u = − csc u cot u dx dx calculusii_rwillis 4 4. l) ∫ cos xdx = sin x + c m) ∫ sin xdx = − cos x + c n) ∫ sec o) ∫ csc p) ∫ sec x tan xdx = sec x + c q) ∫ csc x cot xdx = − csc x + c 2 xdx = tan x + c 2 xdx = − cot x + c Use the above rules to take the derivatives or integrals of given functions. TEXT: Chapter 2 UNIT II - INVERSE TRIGONOMETRIC FUNCTIONS APPLY CALCULUS CONCEPTS TO THE INVERSE TRIGONOMETRIC FUNCTIONS 1. 2. 3. 4. 5. 6. Define Inverse Function Define the inverse trigonometric functions. Sketch the graphs of the inverse trigonometric functions. Evaluate the inverse trigonometric functions at given numbers. State and prove the derivative rules and the corresponding integral rules for the inverse trigonometric functions. Use #5 above to take given derivatives and integrals. TEXT: 5 UNIT III: HYPERBOLIC FUNCTIONS APPLY CALCULUS CONCEPTS TO THE HYPERBOLIC FUNCTIONS 1. 2. 3. Define the six hyperbolic functions. Sketch the graphs of the six hyperbolic functions. State and prove: d du a. sinh u − cosh u dx dx b. d du cosh u − sinh u dx dx c. cosh 2 u − sinh 2 u = 1 calculusii_rwillis 5 d. d du tanh u = sec h 2u dx dx e. d du coth u = − csc h 2u dx dx f. d du sec hu = − sec hu tanh u dx dx d du csc hu = − csc hu coth u dx dx Take given derivatives using #3. State and prove: a. ∫ cosh udu = sinh u + c g. 4. 5. 6. 7. 8. 9. b. ∫ sinh udu = cosh u + c c. ∫ sec h udu = tanh u + c d. ∫ csc h udu = − coth u + c e. ∫ sec hu tanh udu = − sec hu + c f. ∫ csc hu coth udu = − csc hu + c 2 2 Take given integrals using #5. Define the six inverse hyperbolic functions. Sketch the graphs of the six inverse hyperbolic functions. State and prove: a. u' d sinh −1 u = dx u2 +1 b. d u' cosh −1 u = ,u >1 dx u 2 −1 c. d u' tanh −1 u = , u <1 dx 1− u2 calculusii_rwillis 6 d. 10. 11. d u' coth −1 u = , u >1 dx 1− u2 Take given derivatives using #9. State and prove: du a. ∫ b. ∫ c. ∫ 1− u d. ∫1− u u +1 2 du u −1 2 du = sinh −1 u + C = cosh −1 u + C , u > 1 2 = tanh −1 u + C , u < 1 2 = tanh −1 u + C , u > 1 du TEXT 5 UNIT IV METHODS OF INTEGRATION USE A VARIETY OF METHODS OF INTEGRATION 1. Given a list of integral rules evaluate ∫ f (u)du where the proper choice for u gives a problem workable directly from the list. ∫ udv = uv − ∫ vdu 2. State and prove: 3. Evaluate integrals with terms a 2 − u 2 , a 2 + u 2 , u 2 − a 2 by using trig substitution. 4. Evaluate integrals with terms of the form ax 2 + bx + c . 5. Evaluate integrals with rational functions. 6. Use the substitution z = tan x to evaluate integrals containing sin x and cos x . 2 TEXT: 7/8 UNIT V: APPLICATIONS OF THE DEFINITE INTEGRAL APPLY THE DEFINITE INTEGRAL 1. Find the area between two given curves. calculusii_rwillis 7 2. 3. 4. 5. 6. 7. 8. 9. Given the velocity of a moving body, find the distance traveled by the body over a given interval of time. Do #2 given the acceleration function. Find the volume of given solids of revolution. Find the arc length of given curves. Find the surface area of given surfaces of revolution. Find moments and centers of mass. Find the force due to hydrostatic pressure. Find work using integrals. TEXT Chapter 7 UNIT VI: INDETERMINATE FORMS, IMPROPER INTEGRALS USE INDETERMINATE FORMSAND IMPROPER INTEGRALS 1. 2. 3. 4. List the symbolic representations of the indeterminate forms. State L’Hospital's Rule. Find limits of indeterminate forms. Evaluate given improper integrals if they converge. TEXT 8 UNIT VII: SERIES WORK WITH VARIOUS SERIES 1. 2. 3. 4. 5. 6. 7. Define sequence. Define limit of a sequence. lim an = ∞ Define n→∞ Find the limit of a sequence if it exists. Define: (a) infinite series (b) sum of a series (c) converge and diverge (d) geometric series State the following tests for convergence: a. geometric series test b. general term test c. comparison test d. limit e. BASIC f. p-series g. integral test h. alternating series test i. ratio test j. root test Prove that a given series converges or diverges by using the tests in #6. TEXT 9 calculusii_rwillis 8 UNIT VIII: TAYLOR'S FORMULA AND POWER SERIES USE TAYLOR'S FORMULA AND POWER SERIES 1. 2. 3. 4. 5. 6. 7. 8. Write Taylor's Formula with the Remainder for f (x ) at a. Write Taylor's Formula with the Remainder for a given f (x ) , a, and n. Use Taylor's Formula to approximate to a given accuracy. Estimate the error for a given Taylor's Formula approximation. Define power series. for a given power series: a. Find its interval of convergence. b. Find its radius of convergence. Find a power series representation for a given function and specify its radius of convergence. Use infinite series to approximate given definite integrals to a given degree of accuracy. TAYLOR'S FORMULA WITH REMAINDER AT a. n f ( x) = ∑ k =0 Note: 1. f ( k ) (a)( x = a) k f ( n +1) ( z ) + ( x − c) n +1 = Pn ( x) + Rn ( x), z ∈ ( x, a ) k! (n + 1)! f ( k ) (a) = d k f ( x) at x = a dx k 2. 0! = 1 3. When a = 0 Taylor's Formula is called Maclaurin's Formula. 4. When Rn (x) is "small" f ( x) = Pn ( x) TEXT 9 UNIT IX: POLAR COORDINATES AND PARAMETRIC EQUATIONS APPLY POLAR COORDINATES AND PARAMETRIC EQUATIONS 1. 2. 3. 4. 5. 6. 7. 8. 9. 10. 11. Develop the relationship between rectangular coordinates and polar coordinates Find all the ways to name a given polar point. Graph given polar statements. Find the polar coordinates of given rectangular points. Show that a given point is on a given curve. Find the points of intersection of two given polar equations. Change a given polar equation to a rectangular equation. Change a given rectangular equation to polar equation. Fine the angle between the radius vector and the tangent line for a given point on a given curve. Find the areas in given polar regions. Find the arc length of a polar curve. TEXT Chapter 10 calculusii_rwillis 9 UNIT X: TWO DIMENSIONAL VECTORS WORK WITH TWO DIMENSIONAL VECTORS 1. 2. 3. 4. 5. 6. 7. 8. 9. 10. 11. 12. 13. 14. 15. 16. 17. 18. 19. Define two dimensional vectors. Give a geometrical interpretation of two dimensional vectors. Define: (a) length of a vector, (b) unit vector (c) Zero vector Define addition of vectors. Give a geometrical interpretation of 4. Define the product of a real number and a vector. Give a geometrical interpretation of 6. Define subtraction of vectors. Give a geometrical interpretation of 9. Prove: The vector from ( x1 , y1 ) to ( x2 , y2 ) is 〈 x2 − x1 , y2 − y1 〉 < a, b > Prove: is a unit vector in the same direction as <a, b> < a, b > Work problems like those on pages 717-719 of the text Define the dot product of two vectors. Prove: <a, b> . <c, d> = ac + bd V ⋅W Prove: The projection of V on W is W Find the dot product of two vectors. Find the projection of a vector on a vector. Find the angle between two given vectors. Prove: V and W are orthogonal ⇔ V ⋅ W = 0 TEXT 11 UNIT XI: THREE DIMENSIONAL GEOMETRY WORK WITH THREE DIMENSIONAL GEOMETRY 1. 2. 3. 4. 5. 6. 7. 8. 9. 10. 11. 12. 13. Plot given points. Define three dimensional vector. Give a geometrical interpretation of a three dimensional vector. Define: (a) length of a vector (b) unit vector (c) Zero vector. Define addition of vectors. Give a geometrical interpretation of #5. Define the product of a real number (scalar) and a vector. Give a geometrical interpretation of #7. Prove: The vector from ( x1 , y1 , z1 ) to ( x 2 , y 2 , z 2 ) is 〈 x2 − x1 , y2 − y1 , z 2 − z1 〉 Define subtraction of vectors. Give a geometrical interpretation of 10. < a , b, c > is a unit vector in the same direction as <a,b,c>. Prove: < a , b, c , > Work problems like those on pages 725-727 of the text. calculusii_rwillis 10 15. 16. 17. 18. 19. 20. 21. 22. Prove: the distance between ( x1 , y1 , z1 ) and ( x 2 , y 2 , z 2 ) is ( x2 − x1 ) 2 + ( y2 − y1 ) 2 + ( z 2 − z1 ) 2 . Describe geometrically a set of points for which information is given. Write the equation for a given set of points. Define: (a) direction angles (b) direction cosines (c) direction numbers. Find the direction angles, cosines, and numbers for a given line. Find the angle between two given lines. Work problems like those on pages 735-736. Define the dot produce of two vectors. Prove: 〈 a1 , a2 , a3 〉 ⋅ 〈b1 , b2 , b3 〉 = a1b1 + a2b2 + a3b3 23. Prove: The projection of V on W is 24. 25. 26. 27. 28. 29. 30. Find the dot product of two vectors. Find the projection of a vector on another given vector. Find the angle between two given vectors. Prove: V and W are orthogonal ⇔ V ⋅ W = 0 Write the equation of a line given information about it. Determine if two given lines are perpendicular. Define the cross product of two vectors. 14. V ⋅W W i 31. 32. 33. 34. 35. 36. 37. 38. 39. 40. j k State: < a1 , a 2 , a3 > X < b1 , b2 , b3 >=< a1 , a 2 , a 3 > x < b1 , b2 , b3 >= a1 a 2 a3 b1 b2 b3 Find the cross product of given vectors. Write the equation of a plane for which information is given. Find the angle between two given planes. Find the distance between a point and a plane. Sketch given lines or planes. Prove: The area of the parallelogram determined by A and B is AxB . Find the area of the parallelogram determined by two given vectors. Prove: The volume of the parallelepiped determined by vectors, A B and C is A⋅ BxC . Find the volume of a parallelepiped determined by three given vectors. TEXT 11 UNIT XII: SURFACES WORK WITH SURFACES 1. 2. 3. 4. 5. 6. Write the equation of a sphere given information about it. Find the center and radius of a sphere given information about it. Define cylinder. Describe and sketch a cylinder whose equation is given. Name and sketch a quadratic surface whose equation is given. Write the relationship among cartesian, cylindrical, and spherical coordinates. calculusii_rwillis 11 7. 8. Given a point in one coordinate system, write the point in the two other coordinate systems. Given an equation in one coordinate system, write the equation in the other two coordinate systems. TEXT 11 UNIT XIII WORK WITH VECTOR VALUED FUNCTIONS 1. 2. 3. 4. 5. 6. 7. 8. Define vector valued function. Graph the range of given vector valued functions. Define r ′(t ) for a given vector valued function r(t). Find r ′ and r ′′ for a given r. For a given r (t ) and c find r ′(c), r ′′(c) . Plot r (c) and sketch r ′(c) and r ′′(c) at r (c) . For a given r (t ) find the x-y equation a portion of whose graph is the graph of the range of r (t ) . Find the length of a given curve. For a given r (t ) find: v, a, v , T , k , k , N , B, R , osculating plane, normal and tangential 9. components of a. Graph all the vectors in #8 at a given point. TEXT Chapter 12 This syllabus is subject to revision with prior notification to the student by the instructor. calculusii_rwillis 12