The following documents are manuals for the TI-Nspire.
Choose a level :
Table of content :
1 Number and algebra
1.1 Scientific notation and rounding
1.2 Arithmetic sequences and series
1.3 Geometric sequences and series
1.4 Compound interests
1.5 Laws of exponents with integer exponents,logarithms
1.7 Amortization and annuities
1.8 Systems of linear equations and polynomial equations
2 Functions
2.3 Graph a function
2.4 Key features of graphs
2.5 Find roots of quadratic functions
2.6 Solve simultaneous equations
3 Geometry and trigonometry
4 Statistics and probability
4.3 Statistical measures on one variable data
4.4 Line of best fit
4.8 Binomial distribution
4.9 Normal distribution
4.10 Spearman’s Rank coefficient
4.11 Statistical tests
5 Calculous
5.3 Derivative of a function
5.4 Tangents and normals to acurve
5.5 Definite integrals
5.6 Local minimum and local maximum of a function
1 Number and algebra
1.1 Scientific notation and rounding
1.2 Arithmetic sequences and series
1.3 Geometric sequences and series
1.4 Compound interests
1.5 Laws of exponents with integer exponents,logarithms
1.7 Amortization and annuities
1.8 Systems of linear equations and polynomial equations
1.9 Laws of logarithms
1.12 Complex numbers
1.13 Complex numbers : cartesian and polar form
1.14 Matrices
1.15 Eigenvalues and eigenvectors
2 Functions
2.3 Graph a function
2.4 Key features of graphs
2.5 Find roots of quadratic functions
2.6 Solve simultaneous equations
2.7 Composite functions
2.8 Transformations of graphs
3 Geometry and trigonometry
3.7 Degrees and radians
3.8 Unit circle
3.9 Geometric transformations using matrices
3.10 Scalar product and vector product
4 Statistics and probability
4.3 Statistical measures on one variabledata
4.4 Line of bestfit
4.8 Binomial distribution
4.9 Normal distribution
4.10 Spearman’s Rank coefficient
4.11 Statistical tests
4.12 Reliability and validity
4.13 Non-linear regression
4.14 The t-distribution
4.15 Poisson distribution
4.16 Various tests
4.17 Transition matrices
5 Calculous
5.3 Derivative of a function
5.4 Tangents and normals to a curve
5.5 Definite integrals
5.6 Local minimum and local maximum of a function
5.10 Second derivative
5.16 Euler method for differential equations
1 Number and algebra
1.1 Scientific notation and rounding
1.2 Arithmetic sequences and series
1.3 Geometric sequences and series
1.4 Compound interests
1.5 Laws of exponents with integer exponents,logarithms
1.7 Amortization and annuities
1.8 Systems of linear equations and polynomial equations
1.9 Laws of logarithms
2 Functions
2.3 Graph a function
2.4 Key features of graphs
2.5 Find roots of quadratic functions
2.6 Solve simultaneous equations
2.7 Composite functions
2.8 Transformations of graphs
3 Geometry and trigonometry
3.7 Degrees and radians
3.8 Unit circle
4 Statistics and probability
4.3 Statistical measures on one variable data
4.4 Line of bestfit
4.8 Binomial distribution
4.9 Normal distribution
4.10 Spearman’s Rank coefficient
4.11 Statisticaltests
4.12 test-retest
5 Calculous
5.3 Derivative of a function
5.4 Tangents and normals to acurve
5.5 Definite integrals
5.6 Local minimum and local maximum of a function
5.7 Second derivative
Table of content :
1 Number and algebra
1.1 Scientific notation and rounding
1.2 Arithmetic sequences and series
1.3 Geometric sequences and series
1.4 Compound interests
1.5 Laws of exponents with integer exponents,logarithms
1.7 Amortization and annuities
1.8 Systems of linear equations and polynomial equations
1.9 Laws of logarithms
1.12Complex numbers
1.13Complex numbers : cartesian and polar form
1.14 Matrices
1.15 Eigenvalues and eigenvectors
2 Functions
2.3 Graph a function
2.4 Key features of graphs
2.5 Find roots of quadratic functions
2.6 Solve simultaneous equations
2.7 Composite functions
2.8 Transformations of graphs
3 Geometry and trigonometry
3.7 Degrees and radians
3.8 Unit circle
3.9 Geometric transformations using matrices
3.10 Scalar product and vector product
4 Statistics and probability
4.3 Statistical measures on one variable data
4.4 Line of bestfit
4.8 Binomial distribution
4.9 Normal distribution
4.10 Standardization of normal variables
4.11 The t-distribution
4.12 Poisson distribution
4.13 Advanced tests
4.14 Transition matrices
5 Calculous
5.3 Derivative of a function
5.4 Tangents and normals to a curve
5.5 Definite integrals
5.6 Local minimum and local maximum of a function
5.10 Second derivative
5.16 Euler method for differential equations