Marlene Torres Skoumal, Rose Harrison, Josip Harcet, Jennifer Chang Wathall, Lorraine Heinrichs
Oxford IB Diploma Programme: IB Mathematics: analysis and approaches
Marlene Torres Skoumal, Rose Harrison, Josip Harcet, Jennifer Chang Wathall, Lorraine Heinrichs
Oxford IB Diploma Programme: IB Mathematics: analysis and approaches
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Featuring a wealth of digital content, this concept-based Print and Enhanced Online Course Book Pack has been developed in cooperation with the IB to provide the most comprehensive support for the new DP Mathematics: analysis and approaches HL syllabus, for first teaching in September 2019.
Featuring a wealth of digital content, this concept-based Print and Enhanced Online Course Book Pack has been developed in cooperation with the IB to provide the most comprehensive support for the new DP Mathematics: analysis and approaches HL syllabus, for first teaching in September 2019.
Hinweis: Dieser Artikel kann nur an eine deutsche Lieferadresse ausgeliefert werden.
Hinweis: Dieser Artikel kann nur an eine deutsche Lieferadresse ausgeliefert werden.
Produktdetails
- Produktdetails
- Verlag: Oxford Children's Books
- Erscheinungstermin: 21. März 2019
- Englisch
- Abmessung: 200mm x 257mm x 36mm
- Gewicht: 1760g
- ISBN-13: 9780198427162
- ISBN-10: 0198427166
- Artikelnr.: 55889870
- Herstellerkennzeichnung
- Books on Demand GmbH
- In de Tarpen 42
- 22848 Norderstedt
- info@bod.de
- 040 53433511
- Verlag: Oxford Children's Books
- Erscheinungstermin: 21. März 2019
- Englisch
- Abmessung: 200mm x 257mm x 36mm
- Gewicht: 1760g
- ISBN-13: 9780198427162
- ISBN-10: 0198427166
- Artikelnr.: 55889870
- Herstellerkennzeichnung
- Books on Demand GmbH
- In de Tarpen 42
- 22848 Norderstedt
- info@bod.de
- 040 53433511
Marlene Torres Skoumal, Rose Harrison, Josip Harcet, Jennifer Wathall, Lorraine Heinrichs
From patterns to generalizations: sequences and series
1.1: Sequences, series and sigma notation
1.2: Arithmetic and geometric sequences and series
1.3: Proof
1.4: Counting principles and the binomial theorem
Representing relationships: introducing functions
2.1: Functional relationships
2.2: Special functions and their graphs
2.3: Classification of functions
2.4: Operations with functions
2.5: Function transformations
Expanding the number system: complex numbers
3.1: Quadratic equations and inequalities
3.2: Complex numbers
3.3: Polynomial equations and inequalities
3.4: The fundamental theorem of algebra
3.5: Solving equations and inequalities
3.6: Solving systems of linear equations
Measuring change: differentiation
4.1: Limits, continuity and convergence
4.2: The derivative of a function
4.3: Differentiation rules
4.4: Graphical interpretation of the derivatives
4.5: Applications of differential calculus
4.6: Implicit differentiation and related rates
Analysing data and quantifying randomness: statistics and probability
5.1: Sampling
5.2: Descriptive statistics
5.3: The justification of statistical techniques
5.4: Correlation, causation and linear regression
Relationships in space: geometry and trigonometry
6.1: The properties of 3D space
6.2: Angles of measure
6.3: Ratios and identities
6.4: Trigonometric functions
6.5: Trigonometric equations
Generalizing relationships: exponents, logarithms and integration
7.1: Integration as antidifferentiation and definite integrals
7.2: Exponents and logarithms
7.3: Derivatives of exponential and logarithmic functions; tangents and normals
7.4: Integration techniques
Modelling changes: more calculus
8.1: Areas and volumes
8.2: Kinematics
8.3: Ordinary differential equations (ODEs)
8.4: Limits revisited
Modelling 3D space: vectors
9.1: Geometrical representation of vectors
9.2: Introduction to vector algebra
9.3: Scalar product and its properties
9.4: Vector equations of a line
9.5: Vector product and properties
9.6: Vector equation of a plane
9.7: Lines, planes and angles
9.8: Application of vectors
Equivalent systems of representation: more complex numbers
10.1: Forms of a complex number
10.2: Operations with complex numbers in polar form
10.3: Powers and roots of complex numbers in polar form
Valid comparisons and informed decisions: probability distributions
11.1: Axiomatic probability systems
11.2: Probability distributions
11.3: Continuous random variables
11.4: Binomial distribution
11.5: The normal distribution
Exploration
1.1: Sequences, series and sigma notation
1.2: Arithmetic and geometric sequences and series
1.3: Proof
1.4: Counting principles and the binomial theorem
Representing relationships: introducing functions
2.1: Functional relationships
2.2: Special functions and their graphs
2.3: Classification of functions
2.4: Operations with functions
2.5: Function transformations
Expanding the number system: complex numbers
3.1: Quadratic equations and inequalities
3.2: Complex numbers
3.3: Polynomial equations and inequalities
3.4: The fundamental theorem of algebra
3.5: Solving equations and inequalities
3.6: Solving systems of linear equations
Measuring change: differentiation
4.1: Limits, continuity and convergence
4.2: The derivative of a function
4.3: Differentiation rules
4.4: Graphical interpretation of the derivatives
4.5: Applications of differential calculus
4.6: Implicit differentiation and related rates
Analysing data and quantifying randomness: statistics and probability
5.1: Sampling
5.2: Descriptive statistics
5.3: The justification of statistical techniques
5.4: Correlation, causation and linear regression
Relationships in space: geometry and trigonometry
6.1: The properties of 3D space
6.2: Angles of measure
6.3: Ratios and identities
6.4: Trigonometric functions
6.5: Trigonometric equations
Generalizing relationships: exponents, logarithms and integration
7.1: Integration as antidifferentiation and definite integrals
7.2: Exponents and logarithms
7.3: Derivatives of exponential and logarithmic functions; tangents and normals
7.4: Integration techniques
Modelling changes: more calculus
8.1: Areas and volumes
8.2: Kinematics
8.3: Ordinary differential equations (ODEs)
8.4: Limits revisited
Modelling 3D space: vectors
9.1: Geometrical representation of vectors
9.2: Introduction to vector algebra
9.3: Scalar product and its properties
9.4: Vector equations of a line
9.5: Vector product and properties
9.6: Vector equation of a plane
9.7: Lines, planes and angles
9.8: Application of vectors
Equivalent systems of representation: more complex numbers
10.1: Forms of a complex number
10.2: Operations with complex numbers in polar form
10.3: Powers and roots of complex numbers in polar form
Valid comparisons and informed decisions: probability distributions
11.1: Axiomatic probability systems
11.2: Probability distributions
11.3: Continuous random variables
11.4: Binomial distribution
11.5: The normal distribution
Exploration
From patterns to generalizations: sequences and series
1.1: Sequences, series and sigma notation
1.2: Arithmetic and geometric sequences and series
1.3: Proof
1.4: Counting principles and the binomial theorem
Representing relationships: introducing functions
2.1: Functional relationships
2.2: Special functions and their graphs
2.3: Classification of functions
2.4: Operations with functions
2.5: Function transformations
Expanding the number system: complex numbers
3.1: Quadratic equations and inequalities
3.2: Complex numbers
3.3: Polynomial equations and inequalities
3.4: The fundamental theorem of algebra
3.5: Solving equations and inequalities
3.6: Solving systems of linear equations
Measuring change: differentiation
4.1: Limits, continuity and convergence
4.2: The derivative of a function
4.3: Differentiation rules
4.4: Graphical interpretation of the derivatives
4.5: Applications of differential calculus
4.6: Implicit differentiation and related rates
Analysing data and quantifying randomness: statistics and probability
5.1: Sampling
5.2: Descriptive statistics
5.3: The justification of statistical techniques
5.4: Correlation, causation and linear regression
Relationships in space: geometry and trigonometry
6.1: The properties of 3D space
6.2: Angles of measure
6.3: Ratios and identities
6.4: Trigonometric functions
6.5: Trigonometric equations
Generalizing relationships: exponents, logarithms and integration
7.1: Integration as antidifferentiation and definite integrals
7.2: Exponents and logarithms
7.3: Derivatives of exponential and logarithmic functions; tangents and normals
7.4: Integration techniques
Modelling changes: more calculus
8.1: Areas and volumes
8.2: Kinematics
8.3: Ordinary differential equations (ODEs)
8.4: Limits revisited
Modelling 3D space: vectors
9.1: Geometrical representation of vectors
9.2: Introduction to vector algebra
9.3: Scalar product and its properties
9.4: Vector equations of a line
9.5: Vector product and properties
9.6: Vector equation of a plane
9.7: Lines, planes and angles
9.8: Application of vectors
Equivalent systems of representation: more complex numbers
10.1: Forms of a complex number
10.2: Operations with complex numbers in polar form
10.3: Powers and roots of complex numbers in polar form
Valid comparisons and informed decisions: probability distributions
11.1: Axiomatic probability systems
11.2: Probability distributions
11.3: Continuous random variables
11.4: Binomial distribution
11.5: The normal distribution
Exploration
1.1: Sequences, series and sigma notation
1.2: Arithmetic and geometric sequences and series
1.3: Proof
1.4: Counting principles and the binomial theorem
Representing relationships: introducing functions
2.1: Functional relationships
2.2: Special functions and their graphs
2.3: Classification of functions
2.4: Operations with functions
2.5: Function transformations
Expanding the number system: complex numbers
3.1: Quadratic equations and inequalities
3.2: Complex numbers
3.3: Polynomial equations and inequalities
3.4: The fundamental theorem of algebra
3.5: Solving equations and inequalities
3.6: Solving systems of linear equations
Measuring change: differentiation
4.1: Limits, continuity and convergence
4.2: The derivative of a function
4.3: Differentiation rules
4.4: Graphical interpretation of the derivatives
4.5: Applications of differential calculus
4.6: Implicit differentiation and related rates
Analysing data and quantifying randomness: statistics and probability
5.1: Sampling
5.2: Descriptive statistics
5.3: The justification of statistical techniques
5.4: Correlation, causation and linear regression
Relationships in space: geometry and trigonometry
6.1: The properties of 3D space
6.2: Angles of measure
6.3: Ratios and identities
6.4: Trigonometric functions
6.5: Trigonometric equations
Generalizing relationships: exponents, logarithms and integration
7.1: Integration as antidifferentiation and definite integrals
7.2: Exponents and logarithms
7.3: Derivatives of exponential and logarithmic functions; tangents and normals
7.4: Integration techniques
Modelling changes: more calculus
8.1: Areas and volumes
8.2: Kinematics
8.3: Ordinary differential equations (ODEs)
8.4: Limits revisited
Modelling 3D space: vectors
9.1: Geometrical representation of vectors
9.2: Introduction to vector algebra
9.3: Scalar product and its properties
9.4: Vector equations of a line
9.5: Vector product and properties
9.6: Vector equation of a plane
9.7: Lines, planes and angles
9.8: Application of vectors
Equivalent systems of representation: more complex numbers
10.1: Forms of a complex number
10.2: Operations with complex numbers in polar form
10.3: Powers and roots of complex numbers in polar form
Valid comparisons and informed decisions: probability distributions
11.1: Axiomatic probability systems
11.2: Probability distributions
11.3: Continuous random variables
11.4: Binomial distribution
11.5: The normal distribution
Exploration