AP Calculus BC Summer Assignment School Year 018-019 Objective of the summer assignment: i. To build on students readiness in foundational skills and knowledge ii. To review prerequisites topics for the course Resources/Materials necessary for the summer assignment: Prior knowledge, old math notes Estimated length of time to complete: 4 hours Grade: graded for accuracy not to eceed 10% of the first quarter grade Due Date: handed in by the third class period Date of assessment: n/a Questions? Contact: Julia Varanavage javaranavage@fcps.edu
Rising AP Calculus BC Students Dear Calculus BC Student, I am ecited that you have decided to take the challenge of the AP Calculus BC curriculum. Now that your current year has ended, it is now time to think about net year. Although Calculus BC can be fun and eciting, it can also be challenging. To help prepare you for the upcoming school year I am requiring all prospective Calculus BC students to complete a summer packet, which is attached, and should be able to be completed within ten hours. Each of these topics should be a review, but all are critical to your success in Calculus BC. Please remember to keep in mind that the entire summer packet will be collected during the first days of school. It is graded for accuracy and will count approimately 10% of your first quarter grade. I hope that you will work on this assignment a little at a time over the summer break, not in one long session or before the end of this school year. You should feel free to collaborate with others, not copy from others. Should you have any questions, please feel free to contact me at the e-mail address below. Have a safe and wonderful summer. I look forward to seeing you in class net year, ready to learn. Ms. Varanavage javaranavage@fcps.edu P.S. Don't forget - Math is FUN!!!
Name _ Date For each function named: 1. give the parent equation (an equation that doesn t have any translations). graph the function For all non polar functions: 3. state the domain and range 4. state any and all types of symmetry, if none eist then so state 5. state whether the function is even, odd or neither 6. list any asymptotes, if none eist then so state For polar function state the requested information. Name Equation Graph Constant Linear
Name Equation Graph Quadratic Cubic Absolute Value
Name Equation Graph Greatest Integer Square Root Cube Root
Name Equation Graph Reciprocal Squared Reciprocal Rational Function constant function divided by a difference of squares function
Name Equation Graph Rational Function linear function divided by a difference of squares function Rational Function constant function divided by a sum of squares function Rational Function constant function divided by a difference of cubes function
Name Equation Graph Rational Function constant function divided by a sum of cubes function Eponential Natural Eponential
Name Equation Graph Logarithmic Natural Logarithmic Sine
Name Equation Graph Cosine Tangent Secant
Name Equation Graph Cosecant Cotangent Arcsine
Name Equation Graph Arccosine Arctangent Piece-wise containing at least: constant linear 1 asymptote 1 hole a break in the domain over 3 units _
Name Equation Graph Circle Semi-circle Polar Cosine Circle Domain for one complete graph
Name Equation Graph Polar Sine Circle Domain for one complete graph Polar Cosine Rose Domain for one complete graph Number of petals for even multiple of theta Number of petals for even multiple of theta Polar Sine Rose Domain for one complete graph Number of petals for even multiple of theta Number of petals for even multiple of theta
Name Equation Graph Polar Cosine Lemniscate Domain for one complete graph Polar Sine Lemniscate Domain for one complete graph Polar Cosine Cardiod Domain for one complete graph
Name Equation Graph Polar Sine Cardiod Domain for one complete graph Polar Cosine lima bean a > b Domain for one complete graph Polar Sine lima bean a > b Domain for one complete graph
Name Equation Graph Polar Cosine loopy a < b Domain for one complete graph Polar Sine loopy a < b Domain for one complete graph Domain of t Parametric with a limited domain Range of Range of y
Simplify using only positive eponents. Topic 1: Fractional and Negative Eponents 1. 3 3 3 1. 5 4 9 9 3. 4. 3 4 16 y 5. 1 sin 6. 4 16 4 7. 3 1 1 1 4 1 1 8. 1 5 3 3 9. 1 4 1 y y 1 1 1
Topic : Domain and Discontinuity Find the domain of the following functions and describe the discontinuity, if any, as removable or nonremovable. 1. 3 y 4 1. 4 y 4 3. y 56 318 4. y 5. y 3 3 6. y 9 9 7. y 81 4 5 8. y 5 14 9. y 3 6 30 10. y log 1 11. y tan 1. y cos
Topic 3: Solving Inequalities Write the following absolute value equations as piecewise equations. 1. y 1. y 1 3. y 4 4 Solve the following by factoring and making appropriate sign charts. 4. 16 0 5. 616 0 6. 3 10 7. 4 3 8. 3 4 4 9. 9 0
Topic 4: Special Factorization Factor completely. 1. 3 8. 3 64 3. 7 15y 3 3 4. 11 80 5. ac cd ab bd 6. 4 50 0 y y 7. 1 36 9y 8. 9. 3 1 3 1 3 3 y y y 3 3
If Topic 5: Function Transformation f 1, describe in words, using correct mathematical terminology, what the following would do to the graph of f. 1. f 4. f 4 3. f 4. 5f 3 5. f 6. f Using the following graph of y f, sketch the following graphs. 7. y f 8. y f 9. y f 1 10. y f 11. y f 1. y f
Topic 6: Even and Odd Functions Determine if the relation is even, odd or neither analytically. 3 1. f 7. f 4 3. f 4 4 4 1 4. f 5. f 1 6. 5 6y 1 7. y e e 8. 9. 3 y 3 3 3y 4 1
Topic 7: Solving Quadratic Equations Solve each equation. 1.. 7 3 0 4 5 1 3. 6 4 0 4. 5. 3 3 0 3 1 6. 1 13 6 7. 1 1 9 8 0 8. 10 9 0 9. 6 4
Topic 8: Asymptotes Find the equations for all asymptotes, if any eist, for each function. 1. 4 y. y 3 1 4 3. y 1 4. y 1 34 5. y 9 3 3 18 6. y 6 3 3 4 7. y 6 6 6 3 8. y 3 3 1 9. y 10
Topic 9: Comple Fractions Simplify the following. 1. 1. 1 4 1 3. 1 1 4. 3 4 y 4 3 y 5. 1 3 4 9 6. y y y y 7. 3 1 8. 1 1 9. 1 1 4 5 3 310
If f g h 1 Topic 10: Composition of Functions, 1, and, find the following. For 6-9 state the domain of the resulting function. 1. f g. g f 3. f h 1 4. 1 h f 5. 1 g f h 6. f g 7. g f 8. g g 9. g h
Topic 11: Solving Rational equations Solve each equation for. 1. 5 1. 3 6 6 5 3. 1 1 1 3 4. 5 3 1 5 5. 60 60 5 6. 1 16 5 5 5 5 7. 4 3 8. 6 6 9 3 9 3 10 3 9. 1 1 1
Topic 1: Logarithmic Function Write each epression as a sum and/or difference without eponents. 5 1. log ug. ln 3 3. log 5 37 Write each epression as a single logarithm. 4. log log 4 9 5. 3 1 1 log log3 log 3 6. ln 3 ln 1 Solve each equation for. 7. log 8 8. ln ln 4 9. 3 log 4 log 3 log1
Topic 13: Eponential Function Solve each of the following for. 1. 1 4 8. 500e 300 3. 3 14 4. 3 41 6 3 5. 1 0 6. e e 0 Solve each of the following. 7. Which rate would yield more after 1 year starting with $500? 5 ½ % compounded quarterly 6 ¼ % compounded monthly 9% compounded annually 8. If a population increased from 300,000 to 450,000 from 001 to 004, what will the population be in 007? 9. The half-life of carbon 14 is 5600 years. A piece of charcoal is found to contain 70% of the carbon 14 that it originally had. When did the tree from which the charcoal came die?
Topic 14: Trig Identities Establish each trig identity. 1. tan cos sin. tan (cot tan ) sec 3. cos 1 sin 1 sin 4. sin 1 sin cos 1cot sec 1 sin 5. 3 1 sin cos 6. 4sin cos 1sin sin 4
Topic 15: Trig equations Solve each equation for on the interval 0,. 1. 1 sin. sin 1 0 3. tan sin 4. 5. sin 1 sin cos cos 6. cos cos 7. sin cos 8. sin 1 9. sin 3 0
Topic 16: Polar Convert the given polar equation to a rectangular equation. 1. r 7. 3. r cos 6 4. r 6cos 5. r tan 6. r sin 7. 1 r sin cos 8. r 1 cos 9. sec
Topic 17: Parametric For problem 1-6: a) sketch the curve represented by the parametric equations b) find a rectangular equation. 1. t, y t 6. t, y t, t 4 3. t, y 1 t 4. 1, y t 1 5. sin t, y cos t, 0 t 6. cos t, y cost t 7. Find parametric equations for the line that has a slope of 1 and passing through the point 4, 1. 8. Find parametric equations for the line that and passing through the point 6,7 and the point 7,8. 9. Find parametric equations for the circle y a.
Topic 18: Limits Algebraically Find each limit analytically. 1. lim 3 7 3. lim 4 3. lim 1 1 1 4. sin lim 0 5. sec 1 lim 0 sec 6. 1 tan lim sin cos 6 7. 1 lim f ( ) if f ( ) 1 1 1 1 ( 1) 3 8. lim f ( ) if f ( ) 3 1 3 3 9. If lim f( ) and c 1 lim g ( ), find c a. lim4 f( ) b. lim f ( ) g( ) c. lim ( ) ( ) c c c f g d. f( ) lim c g ( ) 10. If lim f( ) 7 find c a. lim 3 f( ) b. c f( ) lim c 18 c. lim f( ) d. 3 lim f( ) c c
Topic 19: Limits at Infinity Solve each limit without a calculator. 1. lim 3. lim 3 9 3. lim 4 16 4. lim 3 3 6 5. 1 lim 1 4 4 3 6. 1 lim 1 0 7. lim 0 1 8. lim 0 sin 9. lim cos 10. 1 lim 3 1 1 11. 3 1 lim 1 1 1 1. lim 4 1 1 1 13. lim5 14. 1 lim 1 5 15. lim 3 1 16. 5 lim 3 17. 3 lim 4 1 18. 3 lim 4 1
Topic 0: Applications 1. Consider a ten-story building with a single elevator. From the point of view of a person on the sith floor, sketch a graph indicating the height of the elevator as a function of time as it travels from the ground floor to the third floor, then to the eighth floor and finally back to the ground floor.. Draw a graph which accurately represents the temperature of the contents of a cup left overnight in a room. Assume the room is at 70 F and the cup is originally filled with water slightly above the freezing point. 3. The table below defines three functions for 0 8. Identify which of the functions are linear, eponential or neither and eplain why. y 1 y y 3 0 4.5 4.5 4.5 6.80 5.11 3.39 4 10.88 5.97.53 6 17.408 9.55 1.67 8 7.858 15.83 0.81 4. A spherical cell takes in nutrients through its cell wall at a rate proportional to the area of the cell wall. The rate at which the cell uses nutrients is proportional to its volume. a. Write an epression for the rate at which nutrients enter the cell as a function of its radius, r. b. Write an epression for the rate at which the cell uses nutrients as a function of its radius, r. c. Sketch a graph showing the rate at which nutrients enter the cell against the radius r as well as a graph for the rate at which the cell uses nutrients on the same aes.