Pre-Calc

Pre-Calculus provides students an honors-level study of trigonometry, 
advanced functions, analytic geometry, and data analysis in preparation for 
calculus.

Useful Websites and Assignments
  
Useful Websites
   Pre-Calculus Cliff Notes
   Trigonometry Help
   The Math Page

First Nine Weeks

Lesson
1.1  Functions
	pg 82 #20-68 ÷4, 93, 94
1.2/1.3  Graphs of functions
	pg 106 #12, 13, 16-52 ÷4, 75
1.4  Combinations of functions
	pg 116 #8-56 ÷4, 71, 72, 83 (skip #32)
1.5  Inverse functions
	pg 127 #8-60 ÷4, 80, 81, 85, 89
4.1  Radian and degree measure of angles
	pg 291 #16-64 ÷4
4.2  The Unit Circle
	pg 300 #8-52 ÷4, 57, 58
4.3  Right triangle trigonometry
	pg 310 #16-60 ÷4, 66, 68 (skip #40, 44, 56)
4.4  Trig functions of any angle
	pg 320 #32-96 ÷4, 103
4.5  Graphs of sine and consine functions
	pg 330 #40-64 ÷4 (graph #56 by hand)
4.6  Graphs of other trig functions
	pg 341 #16-24 ÷4, 29, 30
4.7  Inverse trig functions
	pg 351 #8-44 ÷4, (skip #24)
4.8  Applications and models
	pg 361 #14-34 even (skip #30)
5.1  Use fundamental identities
	pg 381 #28-72 ÷4, (skip #60)
5.2  Verifying trig identities
	pg 389 #27, 28, 30, 37, 38, 44, 70
5.3  Solving trig equations
	pg 400 #12-40 ÷4
5.4  Sum and difference formulas
	pg 408 #20-56 ÷4, (skip #24, 52)
5.5  Multiple-angle and product-sum formulas
	pg 418 #20-40 ÷4, (skip #28 and 36)
6.1  Law of Sines
	pg 434 #16-34 even, (skip #22)
6.2  Law of Cosines
	pg 441 #18-32 even
6.3  Vectors in the plane
	pg 453 #16-36 even, 44-60 even, 76
6.4  Vectors and dot products
	pg 464 #8-32 even (do #26, 28 by hand, skip #30)


Second Nine Weeks

Lesson 
2.1  Graphs of quadratic functions
	pg 143 #20-56 ÷4, 68
2.2  Graphs of polynomials functions
	pg 156 #28-76 ÷4, 95
2.3  Polynomial division and  the Rational Zero Test
	pg 170 #36-72 ÷4 (skip #52)
2.4  Complex Numbers
	pg 180 #1-4, 18-21, 55-58
2.5  The Fundamental Theorem of Algebra
	pg 187 #28-56 ÷4, 58, 65
2.6  Rational functions and asymptotes
	pg 195 #16-32 ÷4
2.7  Graphs of rational functions
	pg 204 #18-28 even
3.1  Exponential functions and their graphs
	pg 225 #28-68 ÷4, 74
3.2  Logarithmic functions and their graphs
	pg 236 #20-64 ÷4, 75
3.3  Properties of logs
	pg 244 #20-28 even, 53-60, 96
3.4  Solving exponential and log equations
	pg 254 #12-52 ÷4, 79-83
3.5  Exponential and log models
	pg 266 #8-44 ÷4 (skip #32)
9.1  Sequences and series
	pg 625 #20-32 even, 52, 54, 70, 72, 80-90 even, 106
9.2  Arithmetic sequences and partial sums
	pg 635 #16-44, ÷4, 66, 68, 84
9.3  Geometric sequences and series
	pg 644 #28-40 ÷4, 64-86 ÷4
9.6  Counting principles
	pg 671 #20-60 ÷4, (skip #32)
9.5  The Binomial Theorem
	pg 661 #36-56 ÷4, 66
9.7  Probability
	pg 682 #4-30 even, 38, 42
10.1  Parabolas
	pg 701 #20-52 ÷4
10.2  Ellipses 
	pg 710 #8-36 ÷4
10.3  Hyperbolas and Circles
	pg 720 #8-28 ÷4, 44-48
10.6  Polar Coordinates
	pg 743 #20-30 even, 52-60 ÷4
10.7  Graphs of polar equations
	pg 752 #22-36 even
12.1  Introduction to Limits
	pg 813 #12-52 ÷4
12.2  Techniques for evaluating limits
	pg 824 #16-56 ÷4
12.3  The tangent line problem
	pg 833 #10-28 (skip #26)
12.4  Limits at infinity and limits of sequences
	pg 841 #6-20 even, 28, 30