- Chapter 1: Trigonometric Functions
- Chapter 1.1: Angles
- Chapter 1.2: Angle Relationships and Similar Triangles
- Chapter 1.3: Trigonometric Functions
- Chapter 1.4: Using the Definitions of the Trigonometric Functions
- Chapter 2: Acute Angles and Right Triangles
- Chapter 2.1: Trigonometric Functions of Acute Angles
- Chapter 2.2: Trigonometric Functions of Non-Acute Angles
- Chapter 2.3: Approximations of Trigonometric Function Values
- Chapter 2.4: Solutions and Applications of Right Triangles
- Chapter 2.5: Further Applications of Right Triangles
- Chapter 3: Radian Measure and the Unit Circle
- Chapter 3.1: Radian Measure
- Chapter 3.2: Applications of Radian Measure
- Chapter 3.3: The Unit Circle and Circular Functions
- Chapter 3.4: Linear and Angular Speed
- Chapter 4: Graphs of the Circular Functions
- Chapter 4.1: Graphs of the Sine and Cosine Functions
- Chapter 4.2: Translations of the Graphs of the Sine and Cosine Functions
- Chapter 4.3: Graphs of the Tangent and Cotangent Functions
- Chapter 4.4: Graphs of the Secant and Cosecant Functions
- Chapter 4.5: Harmonic Motion
- Chapter 5: Trigonometric Identities
- Chapter 5.1: Fundamental Identities
- Chapter 5.2: Verifying Trigonometric Identities
- Chapter 5.3: Sum and Difference Identities for Cosine
- Chapter 5.4: Sum and Difference Identities for Sine and Tangent
- Chapter 5.5: Double-Angle Identities
- Chapter 5.6: Half-Angle Identities
- Chapter 6: Inverse Circular Functions and Trigonometric Equations
- Chapter 6.1: Inverse Circular Functions
- Chapter 6.2: Trigonometric Equations I
- Chapter 6.3: Trigonometric Equations II
- Chapter 6.4: Equations Involving Inverse Trigonometric Functions
- Chapter 7.1: Oblique Triangles and the Law of Sines
- Chapter 7.2: The Ambiguous Case of the Law of Sines
- Chapter 7.3: The Law of Cosines
- Chapter 7.4: Geometrically Defined Vectors and Applications
- Chapter 7.5: Algebraically Defined Vectors and the Dot Product
- Chapter 8: Complex Numbers, Polar Equations, and Parametric Equations
- Chapter 8.1: Complex Numbers
- Chapter 8.2: Trigonometric (Polar) Form of Complex Numbers
- Chapter 8.3: The Product and Quotient Theorems
- Chapter 8.4: De Moivres Theorem; Powers and Roots of Complex Numbers
- Chapter 8.5: Polar Equations and Graphs
- Chapter 8.6: Parametric Equations, Graphs, and Applications
Trigonometry 11th Edition - Solutions by Chapter
Full solutions for Trigonometry | 11th Edition
ISBN: 9780134217437
Trigonometry | 11th Edition - Solutions by Chapter
Get Full Solutions
Solutions by Chapter
This expansive textbook survival guide covers the following chapters: 46. Trigonometry was written by and is associated to the ISBN: 9780134217437. This textbook survival guide was created for the textbook: Trigonometry, edition: 11. Since problems from 46 chapters in Trigonometry have been answered, more than 5032 students have viewed full step-by-step answer. The full step-by-step solution to problem in Trigonometry were answered by , our top Math solution expert on 03/19/18, 04:02PM.
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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Cayley-Hamilton Theorem.
peA) = det(A - AI) has peA) = zero matrix.
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Complete solution x = x p + Xn to Ax = b.
(Particular x p) + (x n in nullspace).
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Determinant IAI = det(A).
Defined by det I = 1, sign reversal for row exchange, and linearity in each row. Then IAI = 0 when A is singular. Also IABI = IAIIBI and
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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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Full column rank r = n.
Independent columns, N(A) = {O}, no free variables.
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Hankel matrix H.
Constant along each antidiagonal; hij depends on i + j.
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Iterative method.
A sequence of steps intended to approach the desired solution.
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Linearly dependent VI, ... , Vn.
A combination other than all Ci = 0 gives L Ci Vi = O.
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Pascal matrix
Ps = pascal(n) = the symmetric matrix with binomial entries (i1~;2). Ps = PL Pu all contain Pascal's triangle with det = 1 (see Pascal in the index).
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Polar decomposition A = Q H.
Orthogonal Q times positive (semi)definite H.
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Positive definite matrix A.
Symmetric matrix with positive eigenvalues and positive pivots. Definition: x T Ax > 0 unless x = O. Then A = LDLT with diag(D» O.
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Rank r (A)
= number of pivots = dimension of column space = dimension of row space.
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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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Skew-symmetric matrix K.
The transpose is -K, since Kij = -Kji. Eigenvalues are pure imaginary, eigenvectors are orthogonal, eKt is an orthogonal matrix.
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Spectrum of A = the set of eigenvalues {A I, ... , An}.
Spectral radius = max of IAi I.
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Stiffness matrix
If x gives the movements of the nodes, K x gives the internal forces. K = ATe A where C has spring constants from Hooke's Law and Ax = stretching.
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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 space V.
Set of vectors such that all combinations cv + d w remain within V. Eight required rules are given in Section 3.1 for scalars c, d and vectors v, w.
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Vector v in Rn.
Sequence of n real numbers v = (VI, ... , Vn) = point in Rn.
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