- Chapter 9: Circles and Parabolas
- Chapter 9: Circles and Parabolas
- Chapter 1: Lines in the Plane
- Chapter 1.1: Lines in the Plane
- Chapter 1.2: Functions
- Chapter 1.3: Graphs of Functions
- Chapter 1.4: Shifting, Reflecting, and Stretching Graphs
- Chapter 1.5: Combinations of Functions
- Chapter 1.6: Inverse Functions
- Chapter 1.7: Linear Models and Scatter Plots
- Chapter 10: Analytic Geometry in Three Dimensions
- Chapter 10.1: The Three-Dimensional Coordinate System
- Chapter 10.2: Vectors in Space
- Chapter 10.3: The Cross Product of Two Vectors
- Chapter 10.4: Lines and Planes in Space
- Chapter 11: Limits and an Introduction to Calculus
- Chapter 11.1: Introduction to Limits
- Chapter 11.2: Techniques for Evaluating Limits
- Chapter 11.3: The Tangent Line Problem
- Chapter 11.4: Limits at Infinity and Limits of Sequences
- Chapter 11.5: The Area Problem
- Chapter 2: Polynomial and Rational Functions
- Chapter 2.1: Quadratic Functions
- Chapter 2.2: Polynomial Functions of Higher Degree
- Chapter 2.3: Real Zeros of Polynomial Functions
- Chapter 2.4: Complex Numbers
- Chapter 2.5: The Fundamental Theorem of Algebra
- Chapter 2.6: Rational Functions and Asymptotes
- Chapter 2.7: Graphs of Rational Functions
- Chapter 2.8: Quadratic Models
- Chapter 3: Exponential and Logarithmic Functions
- Chapter 3.1: Exponential Functions and Their Graphs
- Chapter 3.2: Logarithmic Functions and Their Graphs
- Chapter 3.3: Properties of Logarithms
- Chapter 3.4: Solving Exponential and Logarithmic Equations
- Chapter 3.5: Exponential and Logarithmic Models
- Chapter 3.6: Nonlinear Models
- Chapter 4: Trigonometric Functions
- Chapter 4.1: Radian and Degree Measure
- Chapter 4.2: Trigonometric Functions: The Unit Circle
- Chapter 4.3: Right Triangle Trigonometry
- Chapter 4.4: Trigonometric Functions of Any Angle
- Chapter 4.5: Graphs of Sine and Cosine Functions
- Chapter 4.6: Graphs of Other Trigonometric Functions
- Chapter 4.7: Inverse Trigonometric Functions
- Chapter 4.8: Applications and Models
- Chapter 5: Analytic Trigonometry
- Chapter 5.1: Using Fundamental Identities
- Chapter 5.2: Verifying Trigonometric Identities
- Chapter 5.3: Solving Trigonometric Equations
- Chapter 5.4: Sum and Difference Formulas
- Chapter 5.5: Multiple-Angle and Product-to-Sum Formulas
- Chapter 6: Additional Topics in Trigonometry
- Chapter 6.1: Law of Sines
- Chapter 6.2: Law of Cosines
- Chapter 6.3: Vectors in the Plane
- Chapter 6.4: Vectors and Dot Products
- Chapter 6.5: Trigonometric Form of a Complex Number
- Chapter 7: Linear Systems and Matrices
- Chapter 7.1: Solving Systems of Equations
- Chapter 7.2: Systems of Linear Equations in Two Variables
- Chapter 7.3: Multivariable Linear Systems
- Chapter 7.4: Matrices and Systems of Equations
- Chapter 7.5: Operations with Matrices
- Chapter 7.6: The Inverse of a Square Matrix
- Chapter 7.7: The Determinant of a Square Matrix
- Chapter 7.8: Phase Shift; Sinusoidal Curve Fitting
- Chapter 8: Sequences, Series, and Probability
- Chapter 8.1: Sequences, Series, and Probability
- Chapter 8.2: Arithmetic Sequences and Partial Sums
- Chapter 8.3: Geometric Sequences and Series
- Chapter 8.4: Mathematical Induction
- Chapter 8.5: The Binomial Theorem
- Chapter 8.6: Counting Principles
- Chapter 8.7: Probability
- Chapter 9: Circles and Parabolas
- Chapter 9.1: Circles and Parabolas
- Chapter 9.2: Ellipses
- Chapter 9.3: Hyperbolas
- Chapter 9.4: Rotation and Systems of Quadratic Equations
- Chapter 9.5: Parametric Equations
- Chapter 9.6: Polar Coordinates
- Chapter 9.7: Graphs of Polar Equations
- Chapter 9.8: Polar Equations of Conics
Precalculus With Limits A Graphing Approach 5th Edition - Solutions by Chapter
Full solutions for Precalculus With Limits A Graphing Approach | 5th Edition
ISBN: 9780618851522
Solutions by Chapter
Precalculus With Limits A Graphing Approach was written by and is associated to the ISBN: 9780618851522. The full step-by-step solution to problem in Precalculus With Limits A Graphing Approach were answered by , our top Math solution expert on 01/17/18, 03:02PM. This textbook survival guide was created for the textbook: Precalculus With Limits A Graphing Approach, edition: 5. This expansive textbook survival guide covers the following chapters: 84. Since problems from 84 chapters in Precalculus With Limits A Graphing Approach have been answered, more than 77943 students have viewed full step-by-step answer.
Key Math Terms and definitions covered in this textbook
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Basis for V.
Independent vectors VI, ... , v d whose linear combinations give each vector in V as v = CIVI + ... + CdVd. V has many bases, each basis gives unique c's. A vector space has many bases!
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Cayley-Hamilton Theorem.
peA) = det(A - AI) has peA) = zero matrix.
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Column picture of Ax = b.
The vector b becomes a combination of the columns of A. The system is solvable only when b is in the column space C (A).
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Commuting matrices AB = BA.
If diagonalizable, they share n eigenvectors.
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Ellipse (or ellipsoid) x T Ax = 1.
A must be positive definite; the axes of the ellipse are eigenvectors of A, with lengths 1/.JI. (For IIx II = 1 the vectors y = Ax lie on the ellipse IIA-1 yll2 = Y T(AAT)-1 Y = 1 displayed by eigshow; axis lengths ad
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Hilbert matrix hilb(n).
Entries HU = 1/(i + j -1) = Jd X i- 1 xj-1dx. Positive definite but extremely small Amin and large condition number: H is ill-conditioned.
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Inverse matrix A-I.
Square matrix with A-I A = I and AA-l = I. No inverse if det A = 0 and rank(A) < n and Ax = 0 for a nonzero vector x. The inverses of AB and AT are B-1 A-I and (A-I)T. Cofactor formula (A-l)ij = Cji! detA.
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Iterative method.
A sequence of steps intended to approach the desired solution.
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Length II x II.
Square root of x T x (Pythagoras in n dimensions).
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Matrix multiplication AB.
The i, j entry of AB is (row i of A)·(column j of B) = L aikbkj. By columns: Column j of AB = A times column j of B. By rows: row i of A multiplies B. Columns times rows: AB = sum of (column k)(row k). All these equivalent definitions come from the rule that A B times x equals A times B x .
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Multiplication Ax
= Xl (column 1) + ... + xn(column n) = combination of columns.
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Multiplicities AM and G M.
The algebraic multiplicity A M of A is the number of times A appears as a root of det(A - AI) = O. The geometric multiplicity GM is the number of independent eigenvectors for A (= dimension of the eigenspace).
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Multiplier eij.
The pivot row j is multiplied by eij and subtracted from row i to eliminate the i, j entry: eij = (entry to eliminate) / (jth pivot).
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Reflection matrix (Householder) Q = I -2uuT.
Unit vector u is reflected to Qu = -u. All x intheplanemirroruTx = o have Qx = x. Notice QT = Q-1 = Q.
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Right inverse A+.
If A has full row rank m, then A+ = AT(AAT)-l has AA+ = 1m.
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Row space C (AT) = all combinations of rows of A.
Column vectors by convention.
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Singular matrix A.
A square matrix that has no inverse: det(A) = o.
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Spectral Theorem A = QAQT.
Real symmetric A has real A'S and orthonormal q's.
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Triangle inequality II u + v II < II u II + II v II.
For matrix norms II A + B II < II A II + II B II·
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Volume of box.
The rows (or the columns) of A generate a box with volume I det(A) I.