Math PLATO Tutrials: Mathematics MATH 120 Cllege Mathematics 1. Data Skills Reading Graphical Data Reading Pie Charts Intrductin t Bar Graphs Reading Bar Graphs Intrductin t Data in Tables Reading Data in Tables Cmputing Graphical Data Graphing and Charting Tables Using Bar Graphs Using Pie Charts Using Histgrams Reading Cmplex Charts and Graphs Reading Histgrams Reading Cmplex Tables Cnstructing Graphs and Charts Cnstructing Pie Charts Cnstructing Bar Graphs Cnstructing Histgrams 2. Algebra 1, Part 1 Special Tpics Mean, Median, and Mde Prbability and Pssible Outcmes Prbability f an Event Equatins and Frmulas Literal Equatins Adapting and Using Frmulas 3. Algebra 2, Part 1 Prbability Chance Experiments and Prbability Determining the Prbability f an Event Multiplicatin Principle f Cunting Review: Prbability 4. Algebra 1, Part 2 Sets and Numbers Basic Set Cncepts: Elements in a Set Basic Set Cncepts: Finite r Infinite Basic Set Cncepts: Subsets Basic Set Cncepts: Rster and Set-builder Frms Unin f Tw Sets Intersectin f Tw Sets Plynmials and Factring Value f a Plynmial Plynmial Sum Plynmial Difference
Prduct f a Mnmial and Plynmial Simplifying Plynmial Expressins Prduct f Plynmials Qutient f a Mnmial and Plynmial Equatins and Inequalities Simple Equatins bin 1 Variable: Islating the Variable Mre Difficult Linear Equatins in 1 Variable Slving Prblems with Linear Equatin in 1 Variable Linear Inequalities in 1 Variable, Part 1 Linear Inequalities in 1 Variable, Part 2 Linear Inequalities in 1 Variable, Part 3 Quadratic Frmula 5. Trignmetry Trignmetric Functins Right Angle Trignmetry MATH 320 Intrductin t Statistics 1. Data Skills Reading Graphical Data Reading Pie Charts Intrductin t Bar Graphs Reading Bar Graphs Intrductin t Data in Tables Reading Data in Tables Cmputing Graphical Data Graphing and Charting Tables Using Bar Graphs Using Pie Charts Using Histgrams Reading Cmplex Charts and Graphs Reading Histgrams Reading Cmplex Tables Cnstructing Graphs and Charts Cnstructing Pie Charts Cnstructing Bar Graphs Cnstructing Histgrams 2. Algebra 1, Part 1 Special Tpics Mean, Median, and Mde Prbability and Pssible Outcmes Prbability f an Event 3. Algebra 2, Part 1 Prbability Chance Experiments and Prbability Determining the Prbability f an Event Multiplicatin Principle f Cunting Review: Prbability MATH 310 Cllege Algebra
1. Algebra 1, Part 2 (New) Plynmials and Factring Prduct f Plynmials Qutient f a Mnmial and Plynmial Qutient f a Binmial and Plynmial Greatest Cmmn Factr f Mnmials Mnmial Factrs f Plynmials Binmial Factrs f Plynmials, Part 1 Binmial Factrs f Plynmials, Part 2 Factring the Difference f 2 Squares Factring Perfect Square Trinmials Factring Trinmials, Part 1 Factring Trinmials, Part 2 Equatins and Inequalities Simple Equatins in 1 Variable: Islating the Variable Mre Difficult Linear Equatins in 1 Variable Linear Inequalities in 1 Variable, Part 1 Linear Inequalities in 1 Variable, Part 2 Linear Inequalities in 1 Variable, Part 3 Slving Quadratic Equatins by Factring, Part 1 Slving Quadratic Equatins by Factring, Part 2 Slving Quadratic Equatins by Factring, Part 3 Quadratic Frmula 2. Algebra 2, Part 1 Ratinal Expressins Evaluating Ratinal Expressins Restrictins n Ratinal Expressins Equivalent Frms f Ratinal Expressins Simplifying Ratinal Expressins Sum f Ratinal Expressins, Part 1 Difference f Ratinal Expressins, Part 1 Prduct f Ratinal Expressins Qutient f Ratinal Expressins Cmmn Denminatrs f Ratinal Expressins Sum f Ratinal Expressins, Part 2 Difference f Ratinal Expressins, Part 2 Graphs and Linear Equatins The Crdinate Plane Graphing Ordered Pairs Slutins f Linear Equatins as Ordered Pairs Graphing a Linear Equatin in 2 Variables Graphing a Linear Inequality in 2 Variables Slpe f a Line frm 2 Pints The y-intercept f a Line Using the Slpe and y-intercept t Graph a Line Finding the Slpe and y-intercept frm an Equatin Writing Equatins in Slpe-Intercept Frm Identifying Graphs frm Their Equatins 3. Algebra 2, Part 2 Numbers and Their Prperties Rules fr Expnents and Radicals Ratinalizing the Denminatr in Ratinal Expressins Applying Rules fr Expnents and Radicals
Simplifying Algebraic Expressins Multiplying Algebraic Expressins Factring Algebraic Expressins Factring r Using the Quadratic Frmula Ratinal Expressins: Simplify Ratinal Expressins: Add and Subtract Ratinal Expressins: Multiply and Divide Crdinates and Curves Calculating the Slpe f a Line Pint-Slpe and Slpe-Intercept Frms f Equatins Functins and Their Graphs Defining a Functin with Its Rule Finding Values f a Functin Using Its Rule Equatins and Graphs f Functins, Part 1 Equatins and Graphs f Functins, Part 2 Translatins and Transfrmatins Functinal Values Cmpsite Functins Dmain Values f Cmpsite Functins Inverse f a Functin Determining if a Functin Has an Inverse Slving Prblems with Linear Functins Slving Prblems with Quadratic Functins Expnential and Lgarithmic Functins Prperties f Expnential Functins Prperties f Lgarithmic Functins Recgnizing Graphs f Types f Functins Slving Prblems: Expnential and Lgarithmic Expnential Grwth Expnential Decay MATH 312 Finite Mathematics 1. Algebra 2, Part 1 Linear Systems f Equatins and Inequalities Slving Linear Systems f Equatins: Graphs Classifying Linear Systems Slving Linear Systems f Inequalities: Graphs Slving Linear Systems f Equatins: Substitutin Slving Linear Systems f Equatins: Additin Slving Linear Systems f Equatins: Matrices 1 Slving Linear Systems f Equatins: Matrices 2 Slving Prblems with Linear Systems Review: Linear Systems Prbability Chance Experiments and Prbability Determining the Prbability f an Event Multiplicatin Principle f Cunting Review: Prbability
MATH 410 - Calculus 1. Calculus 1 Limits I Intrductin t Limits - Tutrial Intrductin t Limits - Exercises Limits f Ratinal and Transcendental Functins - Tutrial Limits f Ratinal and Transcendental Functins - Exercises Limits at Infinity - Tutrial Limits at Infinity - Exercises Limits II Definitin and Prfs f Limits - Tutrial Definitin and Prfs f Limits - Exercises Use f Limit Therems - Tutrial Use f Limit Therems - Exercises Cntinuity - Tutrial Cntinuity - Exercises The Derivative Derivative: Apprximating Rates and Definitin - Tutrial Derivative: Apprximating Rates and Definitin - Exercises Derivative: Instantaneus Rates - Tutrial Derivative: Instantaneus Rates - Exercises. Techniques f Differentiatin Differentiatin f Plynmials and Ratinal Functins - Tutrial Differentiatin f Plynmials and Ratinal Functins - Exercises Uses f the First Derivative - Tutrial Uses f the First Derivative - Exercises The Secnd Derivative - Tutrial The Secnd Derivative - Exercises Chain Rule and Related Rates Derivatives f Cmpsite Functins - Tutrial Derivatives f Cmpsite Functins - Exercises Mre n the Chain Rule - Tutrial Mre n the Chain Rule - Exercises Implicit Differentiatin - Tutrial Implicit Differentiatin - Exercises Related Rates - Tutrial Related Rates - Exercises Tangent Line Apprximatins and Differentials Tangent Line Apprximatin - Tutrial Tangent Line Apprximatin - Exercises Differentials at a Pint - Tutrial Differentials at a Pint - Exercises Applicatins f the First Derivative The Behavir f a Functin as Related t the Sign f the Derivative - Tutrial The Behavir f a Functin as Related t the Sign f the Derivative - Exercises Finding Maxima and Minima f Functins - Tutrial Finding Maxima and Minima f Functins - Exercises Applicatins f the Secnd Derivative
Cncavity and the Secnd Derivative Test - Tutrial Cncavity and the Secnd Derivative Test - Exercises Graphing Ratinal Functins - Tutrial Graphing Ratinal Functins - Exercises Narrative Max-Min Prblems - Tutrial Narrative Max-Min Prblems - Exercises General Prperties f Cntinuus and Differentiable Functins Basic Therems - Tutrial Basic Therems - Exercises The Indefinite Integral The Indefinite Integral: Physical and Gemetrical Interpretatin f the Antiderivative - Tutrial The Indefinite Integral: Physical and Gemetrical Interpretatin f the Antiderivative Exercises Integratin by Substitutin Tutrial Integratin by Substitutin -Exercises. The Definite Integral Intrductin t the Definite Integral: Apprximatins and Areas - Tutrial Intrductin t the Definite Integral: Apprximatins and Areas - Exercises Intrductin t the Definite Integral: Definitin and Applicatins - Tutrial Intrductin t the Definite Integral: Definitin and Applicatins - Exercises The Fundamental Therem The Fundamental Therem f Calculus - Tutrial The Fundamental Therem f Calculus - Exercises Derivatives f Integrals with Functins as Limits - Tutrial Derivatives f Integrals with Functins as Limits - Exercises Gemetrical Applicatins f the Definite Integral Area Between Curves - Tutrial Area Between Curves - Exercises If yu have any truble accessing PLATO, please cntact PLATO at 800-869-2200 and give them the Davenprt supprt ID#: 4637121-100. If yu need t talk t smene at Davenprt abut PLATO, please cntact: Je LaMntagne at Je.LaMntagne@Davenprt.edu r 616-451-3511 Mary Etter at Mary.Etter@Davenprt.edu r 269-552-3363 Gary Franchy at Gary.Franchy@Davenprt.edu r 586-620-4091