Mapping Diagrams: From AB to EF, Resource
- Author:
- Martin Flashman
Mapping Diagrams from A(lgebra) B(asics) to E(lementary) F(unctions).
A Reference and Resource Book on Function Visualizations Using Mapping Diagrams
Preparations for Calculus Version
Table of Contents
Visualizing Functions
Linear Functions
Quadratic Functions
Other Algebraic Functions
- example.OAF.RF.0
- example.OAF.DPFF.0
- example.OAF.DPSF.0
- example.OAF.RFF.1
- example.OAF.RFF.2
- example.OAF.RFF.3
- example.OAF.RFF.4
- example.OAF.DRF.0
- example.OAF.DSYMM.0
- example.OAF.BRF.1.0
- example.OAF.BRF.2.0
- example.OAF.BRF.3.0
- example.OAF.BRF.4.0
- example.OAF.SAE.1.0
- example.OAF.SAE.2.0
- example.OAF.DSAE.1.0
- example.OAF.DSAE.2.0
- example.OAF.CPPF.4.0
- example.OAF.CPPF.3.0
- example.OAF.CPPF.2.0
- example.OAF.CPPF.1.0.
- example.OAF.CNPF.1.0
- example.OAF.CNPF.2.0
- example.OAF.CNPF.3.0
- example.OAF.CNPF.4.0
- example.OAF.DCPPF.0
- example.OAF.DCNPF.0
- example.OAF.DVNPF.0
- example.OAF.DVPPF.0
Other Ways to Define Functions
- example.OW.0
- example.OW.FDPC.1.0
- example.OW.FDPC.2.0
- example.OW.FDPC.3.0
- example.OW.FDPC.4.0
- example.OW.DFDPC.0
- example.OW.ICPPF.1.0
- example.OW.ICPPF.2.0
- example.OW.ICPPF.3.0
- example.OW.ICPPF.4.0
- example.OW.DICPPF.0
- example.OW.IMPL.3.0
- example.OW.IMPL.2.0
- example.OW.IMPL.1.0
- example.OW.DIMPL.1.0.A
- example.OW.DIMPL.1.0.B
- example.OW.RECF.1.0
- example.OW.RECF.2.0
- example.OW.RECF.3.0.
- example.OW.RECF.4.0
Exponential and Logarithmic Functions
- example.ELF.0
- example.ELF.CELF.1.0
- example.ELF.CELF.2.0
- example.ELF.CELF.3.0
- example.ELF.CELF.4.0
- ELF.LCELF.1.0
- example.ELF.DCELF.0.
- example.ELF.DOM.L.1.0
- example.ELF.DOM.L.2.0
- example.ELF.DOM.L.3.0
- example.ELF.DDOM.L.0
- example.ELF.NEL.1.0
- example.ELF.NEL.2.0
- example.ELF.NEL.3.0
- example.ELF.IDA.2.0
- example.ELF.DIDA.0
- example.ELF.AP.1.0.A
- example.ELF.AP.1.0.B
- example.ELF.AP.2.0.A
- example.ELF.AP.2.0.B
- example.ELF.AP.3.0.A
- example.ELF.AP.3.0.B
- proof.ELF.AP.P.1.0
- proof.ELF.AP.P.2.0
- proof.ELF.AP.P.3.0
- proof.ELF.AP.P.4.0
- example.ELF.LCELF.1.0
- example.ELF.LCELF.2.0
- example.ELF.LCELF.3.0
- example.ELF.DLCELF.0
- example.ELF.INV.1
- example.ELF.INV.2.A
- example.ELF.INV.2.B
- example.ELF.INV.3
- example.ELF.SEQ.1.0
- example.ELF.SEQ.2.0
- example.ELF.SEQ.E.3.0
- example.ELF.DSEQ.E.0
- example.ELF.SEQ.L.1.0
- example.ELF.SEQ.L.2.0
- example.ELF.SEQ.L.3.0
- example.ELF.DSEQ.L.0
Trigonometric Functions
- example.TRIG.0
- TRIG.MD.Deg.Rad.0.ggb
- TRIG.TRIDEF.2.ggb
- TRIG.TRIDEF.MD.ggb
- TRIG.circle.DEF.SCT.0.ggb
- TRIG.other.MD.Recip.0
- TRIG.circle.other.1
- Theorem.TRIG.SHAPE.1
- theorem.TRIG.SHAPE.2
- TRIG.Circle.SYM.0.1
- example.TRIG.DSYMM.0
- definition.InvTrigF.UnitCircle.ASIN
- definition.InvTrigF.UnitCircle.ACOS
- definition.InvTrigF.UnitCircle.ATAN
- definition.ITrigF
- theorem.TRIG.PERIOD,SC
- theorem.TRIG.PERIOD.TAN
- example.TRIG.DPB.0
- example.TRIG.SEQ.1.0.
- example.TRIG.SEQ.2.0
- example.TRIG.SEQ.3.0.
- Example SEQ.SC.4
- TRIG.MD All Solve Eqn.3
- TRIG.MD.ALLSolveGraph.0
- example.TRIG.ID.1.0
- example.TRIG.ID.2.0
- TRIG.DID.0
- TRIG.Circle.A*sin(Bx+C),A*cos(Bx+C).MD.0.1
- TRIG.Circle.A*tan(Bx+C)
- TRIG.MD.Graph.Table.Atrig(Bx+C)
- example.TRIG.COMP.1
- example.TRIG.COMP.2
- example.TRIG.COMP.3.0
- example.TRIG.COMP.4
- example.TRIG.LCOMP.1
- example.TRIG.LCOMP.2
- example.TRIG.LCOMP.3
- example.TRIG.LCOMP.4
- Example TRIG.INV.1
- Example TRIG.INV.2(i)
Algebra and Elementary Functions
- AEF. example.1
- AEF.Example.2
- Example AEF.0
- Mapping Diagrams and Graphs for Arithmetic Operations
- Mapping Diagrams (I) for Arithmetic operations to create new functions from old.
- Mapping Diagrams (II) for Arithmetic Operations
- example.AEF.COMP.1.
- example.AEF.COMP.2.
- example.AEF.DCOMP.0.
- Example AEF.MR.1
- Example AEF.DR.1
- Example AEF.SR.1
- Example AEF.ERU.1
- AEF.CSS Composition: Socks and Shoes
- Example AEF.NEB Numerical Estimation Bisection
- AEF.NEFP Numerical Estimation False Position
- Example AEF.NENS Newton Secant Method
- Example AEF.NEC Numerical Estimation Comparison
- Mapping diagrams - composite functions
- AMATYC 2017: Using Mapping Diagrams to Make Sense of Functions and Equations