000 04155nam a22003257i 4500
999 _c8047
_d8047
005 20210103113039.0
008 111005s2013 at a b 001 0 eng d
020 _a9781111574635
020 _a1111574634
040 _aStDuBDS |b eng
_cStDuBDS
_dUkOxU
_dUk
_erda
082 0 4 _223
_a570.151
_bA.F.M
100 1 _aAdler, Frederick R.
_933334
_eauthor.
245 1 0 _aModeling the dynamics of life :
_bcalculus and probability for life scientists /
_cFrederick R. Adler.
246 _nthird edtion international edition.
264 1 _aAustralia ;
_aUnited Kingdom :
_bBrooks/Cole Cengage Learning,
_cc2013.
264 4 _cc2013.
300 _aca. 930 pages. in various pagings :
_billustrations. ;
_c28 cm.
336 _2rdacontent
_atext
337 _2rdamedia
_aunmediated
338 _2rdacarrier
_avolume
500 _aPrevious ed.: 2005.
500 _aFormerly CIP. |5 Uk
504 _aIncludes bibliographical references and index.
505 0 0 _a1 Discrete-Time Dynamical Systems.1.2 Variables And Functions. 1.3 Units And Dimensions.1.4 Linear Functions And Their Graphs.1.5 Discrete-Time Dynamical Systems.1.6 Analysis Of Discrete-Time Dynamical Systems.1.7 Solutions And Exponential Functions.1.8 Oscillations And Trigonometry.1.9 A Model Of Gas Exchange In The Lung.1.10 An Example Of Nonlinear Dynamics.1.11 Excitable Systems I: The Heart.1.12 Supplementary Problems for Chapter 1.1.13 Projects for Chapter 1.2 Limits and Derivatives.2.1 Introduction to Derivatives.2.2 Limits.2.3 Continuity.2.4 Computing Derivatives.2.5 Derivatives of Sums, Powers and Polynomials.2.6 Derivatives of Products and Quotients.2.7 The Second Derivative.2.8 Exponentials and Logarithms.2.9 The Chain Rule.2.10 Derivatives of Trigonometric Functions.2.11 Supplementary Problems for Chapter 2.2.12 Projects for Chapter 2.3 Derivatives and Dynamical Systems.3.1 Stability and the Derivative.3.2 More Complicated Dynamics.3.3 Maximization3.4 Reasoning About Functions.3.5 Limits at Infinity.3.6 Leading behavior and L'Hosptal's Rule.3.7 Approximating Functions.3.8 Newton's Method.3.9 Panting and Deep Breathing.3.10 Supplementary Problems for Chapter 3.3.11 Projects for Chapter 3.4 Differential Equations and Integrals.4.1 Differential Equations.4.2 Antiderivatives and Indefinite Integrals.4.3 Special Functions and Methods of Integration.4.4 Integrals and Sums.4.5 Definite and Indefinite Integrals.4.6 Applications of Integrals.4.7 Improper Integrals.4.8 Supplementary Problems for Chapter 4.4.9 Projects for Chapter 4.5 Autonomous Differential Equations.5.1 Basic Differential Equations.5.2 The Phase-Line Diagram.5.3 Stable and Unstable Equilibria.5.4 Solving Autonomous Equations.5.5 Two Dimensional Equations.5.6 The Phase-Plane.5.7 Solutions in the Phase-Plane.5.8 The Dynamics of Neuron.5.9 Supplementary Problems for Chapter 5. 5.10 Projects for Chapter 5.6 Probability Theory and Statistics.6.1 Introduction to Probabilistic Models.6.2 Stochastic Models of Diffusion and Genetics.6.3 Probability Theory.6.4 Conditional Probability.6.5 Independence and Marcov Chains.6.6 Displaying Probabilities.6.7 Random Variables.6.8 Descriptive Statistics.6.9 Descriptive Statistics for Spread.6.10 Supplementary Problems for Chapter 6.6.11 Projects for Chapter 6.7 Probability Models.7.1 Joint Distributions.7.2 Covariance and Correlation.7.3 Sums and Products of Random Variables.7.4 The Binomial Distribution.7.5 Applications of the Binomial Distribution.7.6 Exponential Distributions.7.7 The Poisson Distribution.7.8 The Normal Distribution.7.9 Applying the Normal Approximation.7.10 Supplementary Problems for Chapter 7.7.11 Projects for Chapter 7.8 Introduction to Statistical Reasoning.8.1 Statistics: Estimating Parameters.8.2 confidence Limits.8.3 Estimating the Mean.8.4 Hypothesis Testing.8.5 Hypothesis Testing: Normal Theory.8.6 comparing Experiments.8.7 Analysis of Contingency Tables and Goodness of Fit.8.8 Hypothesis Testing with the Method of Support.8.9 Regression.8.10 Projects for Chapter 8.
650 0 _aLife sciences |x Mathematics.
650 0 _aCalculus.
650 0 _aProbabilities.
942 _cBK
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