Functions,statistics, and trigonometry / Rheta N Rubenstein .. .et al.
Publication details: Glenview, UCSMP Production and evaluation: c 1992.Description: x,937 p.: ill,col .: 24 cmISBN:- 0673331997
- 22 516 FUN
| Item type | Current library | Call number | Copy number | Status | Date due | Barcode |
|---|---|---|---|---|---|---|
Book Open Access
|
Engineering Library | 516 FUN (Browse shelf(Opens below)) | 1 | Available | BUML23111782 |
CONTENT
Chapter 1 Making sense of data
1-1 : Collecting data
1-2 : Tables and graphs
1-3 : Other displays
1-4 : Measures of center
1-5 :Quatiles,percentiles and box plots
Chapter 2 Functions and Models
2-1 : The language of functions
2-1 : Linear models
2-3 : The line of best Fit
2-4 : Step functions
2-5 : Correlation
Chapter 3 Transformations of functions and data
3-1 ; Using an automatic graphs
3-2 : The graph translation theorem
3-3 : Translations of data
3-4 ; Symmetries of graphs
3-5 : The graph scale theorem
Chapter 4 Power, Exponential and logarithmic functions
4-1 : nth Root functions
4-2 : Rational power functions
4-3 : Exponential functions
4-4 : Finding exponential models
4-5 : Logarithmic function
Chapter 5 Trigonometric functions
5-1 : Measures of angles and rotations
5-2 : Lengths of Arcs and Areas of sectors
5-3 : Trigonometric ratios of acute angles
5-4 : The sine, cosine and tangent functions
5-5 : Exact values of trigonometric functions
etc.
Chapter 6 Graphs of circular functions
6-1: Scale change images of circular functions
6-2: Translation images of circular functions
6.3: Linear changes of circular functions
6-4: Modeling with circular functions
6-5: Inverse circular functions
etc.
Chapter 7 Probability and simulation
7-1: Fundamental properties of probability
7-2: Addition counting principles
7-3: Multiplication counting principles
7-4: Independent events
7-5; Permutations
etc.
Chapter 8 Sequences,series and combinations
8-1: Formulas for sequences
8-2: Limits of sequences
8-3: Arithmetic series
8-4: Geometric series
8-5: Infinite series
etc.
Chapter 9 Polynomial functions
9-1:Polynomial models
9-2: Finding polynomial models
9-3: Graphs of polynomial functions
9-4: Division and the remainder theorem
9-5; The factor theorem
etc.
Chapter 10 Binomial and normal distributions
10-1; Binomial probability distributions
10-2; Mean and standard deviation of a binomial distribution
10-3: Representing probabilities by areas
10-4: The parent of the normal curve
10-5; The standard normal distribution
etc.
Chapter 11 Matrices and trigonometry
11-1: Matrix multiplication
11-2: Matrices for transformations
11-3: Matrices for composites of transformations
11-4: The general rotation matrix
11-5; Identities for cos (a+b )and sin ( a + b)
etc.
Chapter 12 Quadratic relations
12-1; The geometry of the ellipse
12-2: The algebra of the ellipse
12-3: The hyperbola
12-4; Rotating relations
12-5: The general quadratic
etc.
Chapter 13 Further work with trigonometry
13-1: Proving trigonometric identities
13-2: Restrictions on identities
13-3: Polar coordinates
13-4; Polar graphs
13-5: The geometry of complex numbers
etc.
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