Instructions: Make sure all problems are numbered in order. (Level : If the problem had an *please skip that number) All work is in pencil, and is shown completely. Graphs are drawn out by hand. If you use your calculator for some steps, intermediate work should be shown. There are no problems here that should be done solely on the calculator. Assignment is to be handed in on the first day of school, regardless of whether or not you have class. You will receive only ½ credit if the assignment is handed in a day late. If it is more than two days late you will receive no credit. There will be a test covering this material on the second day class meets. No calculators will be allowed for half of this test. You are responsible for knowing all the material covered by this assignment as it is a review of past courses. If you do happen to have any questions on the assigned material, I will be available at school the two days before classes start. You will not have time to ask questions on the day the assignment is due. Other information you should know: Calculus is performed in radians only. Therefore you should know the unit circle in radians. A copy is attached for review. A list of trigonometric identities is also attached, these should also be known, as we use substitutions to perform some problems. You should be comfortable solving equations of various forms: linear, quadratic, polynomial, rational, radical, eponential or trigonometric. (Quadratics you should be comfortable solving by factoring and the quadratic formula) You should be able to graph the following, and identify important points (origin, zeros, intercepts, period, asymptotes) without a calculator. y = sin y = log y = cos y = e y = tan y = a piecewise functions all lines y = ln You should also have an understanding of the transformations that can be applied along y = af b + h ) with their resulting effects on parent function (i.e. ( ( )) k On your calculator you should be able to find ma/min, zeros, and intersections, along with graphing parametrically, editing/inputting lists, graph using STAT PLOT, understand the different zoom features, and VARS button In eercises -, let L be the line determined by points A and. (a) Plot A and. (b) Find the slope of L. (c) Draw the graph of L.. A (, ), (, ). A (, ), (,). A(,), (, ) In eercises 4-5, write an equation for (a) the vertical line and (b) the horizontal line through the point P. 4. (,) P 5. P ( 0, ) In eercises 6-8, write a general linear equation for the line through the two points. 6. (,), (,) 7. (,0), (, ) 8. (, ), (, )
In eercise 9, the line contains the origin and the point in the upper right corner of the graph. Write an equation for the line. 9. [-5,5] by [-,] In eercises 0-, find the (a) slope and (b) y-intercept, and (c) graph the line. 0. + 4y =. + y 4 = In eercises -, write an equation for the line through P that is parallel to L, (b) perpendicular to L.. P (,), L : + y = 4. P (,4), L : = 5 In eercise 4, find the value of or y for which the line through A and has the given slope m. 4. A (, ), ( 4, y), m = In eercises 5-: (a) Find the domain. (b) Find the range. (c) Draw its graph. (d) Determine any symmetries that are characteristics of the graph. 5. 8. y = +. y = 4 6. y = + 7. y = 9. y = 0. y = 4 In eercises -7, determine whether the function is even, odd or neither.. y = 5. 7. y. 4. y = + y = + 6. y = y = y = + For problems 8-0, (a) draw the graph of the function. Then find its (b) domain and (c) range. f = + 8. ( ) 9. f ( ), < 0 =, 0 = 0. f ( ) = ( ) 4, < +, +, >
For problems -4, use the vertical line test to determine whether the curve is the graph of a function.... 4. In eercises 5-7, write the piecewise formula for the function, scale on the graph is for each hash mark on the ais. 5. 7. 6. In eercise 8, find: (a) f ( g( ) ), (b) g ( f ( ) ), (c) f ( g( 0) ), (d) g ( f ( 0) ),(e) g ( g( ) ), (f) f ( f ( ) ) 8. f ( ) = + 5, g( ) = In eercise 9, graph the function. State its domain, range, and intercepts. 9. y = e
In eercises 40-5, solve the equations. 40. e = 4 # 4. = 0 # 4. log = 6 4. ln( + ) ln0 = 0 # 44. 5 + 4 7 = 0 (rational root theorem) 6 4 = (factor) 5 7 = (factor) 45. 0 46. 0 47. 9 + 4 + 8 = 48. ( 7 ) 4 = 0 49. 6 = + 4 + = 50. ( ) 0 5. ( ) + 7 = 5 5. 5. + y = 5 y = 9 y 5 + = y 4 y y + In eercise 54, find f = + 54. ( ) ( ) ( ) f, and verify that f ( ) = f f ( ) f =. In eercise 55, draw the graph and determine the domain and range of the function. y = 55. ln( ) 4 In eercises 56-57, solve for y. 56. ln = + 4 y 57. ln ( y ) ln = + ln In eercises 58-59, specify (a) the period, (b) the amplitude, and (c) identify the viewing window shown. 58. y = cos( ) π 59. y = 4sin In eercises 60-6, determine (a) the period, (b) the domain, (c) the range, and (d) draw the graph of the function. 60. y = sin( 4 + π ) + 6. y = tan( + π ) + In eercises 6-64, solve the equation in the specified interval. Will need a calculator. 6. tan =.5,0 < π # 6. cos = 0.7,π < 4π # 64. sec =, π < π #
Trigonometric Identities sin tan = cot = sin sec = csc = sin cot = tan sec csc ( ) = cos ( ) = sin ( A + ) = sin Acos cos Asin sin + sin cos ( A ) = sin Acos cos Asin ( A + ) = cos Acos sin Asin ( A ) = cos Acos sin Asin cos + cos = cos sin sin = sin cos = sin cos = cos + cos cos = cos sin = cot cot ( ) = tan ( ) tan ( ) = π sin + cos = tan + = sec + cot = csc