- 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 40140 students have viewed full step-by-step answer.
Key Math Terms and definitions covered in this textbook
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Back substitution.
Upper triangular systems are solved in reverse order Xn to Xl.
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Commuting matrices AB = BA.
If diagonalizable, they share n eigenvectors.
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Condition number
cond(A) = c(A) = IIAIlIIA-III = amaxlamin. In Ax = b, the relative change Ilox III Ilx II is less than cond(A) times the relative change Ilob III lib II· Condition numbers measure the sensitivity of the output to change in the input.
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Elimination matrix = Elementary matrix Eij.
The identity matrix with an extra -eij in the i, j entry (i #- j). Then Eij A subtracts eij times row j of A from row i.
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Fast Fourier Transform (FFT).
A factorization of the Fourier matrix Fn into e = log2 n matrices Si times a permutation. Each Si needs only nl2 multiplications, so Fnx and Fn-1c can be computed with ne/2 multiplications. Revolutionary.
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Fibonacci numbers
0,1,1,2,3,5, ... satisfy Fn = Fn-l + Fn- 2 = (A7 -A~)I()q -A2). Growth rate Al = (1 + .J5) 12 is the largest eigenvalue of the Fibonacci matrix [ } A].
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Free variable Xi.
Column i has no pivot in elimination. We can give the n - r free variables any values, then Ax = b determines the r pivot variables (if solvable!).
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Indefinite matrix.
A symmetric matrix with eigenvalues of both signs (+ and - ).
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Independent vectors VI, .. " vk.
No combination cl VI + ... + qVk = zero vector unless all ci = O. If the v's are the columns of A, the only solution to Ax = 0 is x = o.
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Kirchhoff's Laws.
Current Law: net current (in minus out) is zero at each node. Voltage Law: Potential differences (voltage drops) add to zero around any closed loop.
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Kronecker product (tensor product) A ® B.
Blocks aij B, eigenvalues Ap(A)Aq(B).
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Multiplication Ax
= Xl (column 1) + ... + xn(column n) = combination of columns.
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Norm
IIA II. The ".e 2 norm" of A is the maximum ratio II Ax II/l1x II = O"max· Then II Ax II < IIAllllxll and IIABII < IIAIIIIBII and IIA + BII < IIAII + IIBII. Frobenius norm IIAII} = L La~. The.e 1 and.e oo norms are largest column and row sums of laij I.
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Rank one matrix A = uvT f=. O.
Column and row spaces = lines cu and cv.
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Row picture of Ax = b.
Each equation gives a plane in Rn; the planes intersect at x.
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Simplex method for linear programming.
The minimum cost vector x * is found by moving from comer to lower cost comer along the edges of the feasible set (where the constraints Ax = b and x > 0 are satisfied). Minimum cost at a comer!
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Singular Value Decomposition
(SVD) A = U:E VT = (orthogonal) ( diag)( orthogonal) First r columns of U and V are orthonormal bases of C (A) and C (AT), AVi = O'iUi with singular value O'i > O. Last columns are orthonormal bases of nullspaces.
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Toeplitz matrix.
Constant down each diagonal = time-invariant (shift-invariant) filter.
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Vandermonde matrix V.
V c = b gives coefficients of p(x) = Co + ... + Cn_IXn- 1 with P(Xi) = bi. Vij = (Xi)j-I and det V = product of (Xk - Xi) for k > i.
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Vector addition.
v + w = (VI + WI, ... , Vn + Wn ) = diagonal of parallelogram.