Hlavní obsah
Math
Missouri Math
Algebra 1: Reasoning with Equations and Inequalities
A1.REI.A.1
Partially covered
(Content unavailable)
A1.REI.A.2a
Fully covered
A1.REI.A.2b
Fully covered
- Discriminant review
- Number of solutions of quadratic equations
- Quadratic equations word problem: box dimensions
- Quadratic equations word problem: triangle dimensions
- Quadratic formula
- Quadratic formula review
- Quadratics by factoring
- Quadratics by factoring (intro)
- Solve equations using structure
- Solving quadratics by factoring
- Solving quadratics by factoring
- Solving quadratics by factoring review
- Solving quadratics by factoring: leading coefficient ≠ 1
- The quadratic formula
- Understanding the quadratic formula
- Using the quadratic formula: number of solutions
- Worked example: quadratic formula (example 2)
- Worked example: quadratic formula (negative coefficients)
A1.REI.A.2c
Fully covered
- Discriminant review
- Features of quadratic functions
- Finding the vertex of a parabola in standard form
- Quadratic formula
- Quadratic formula review
- Quadratics by factoring
- Quadratics by factoring (intro)
- Solve equations using structure
- Solving quadratics by factoring
- Solving quadratics by factoring
- Solving quadratics by factoring review
- Solving quadratics by factoring: leading coefficient ≠ 1
- Solving quadratics using structure
- The quadratic formula
- Understanding the quadratic formula
- Using the quadratic formula: number of solutions
- Worked example: quadratic formula (example 2)
- Worked example: quadratic formula (negative coefficients)
A1.REI.B.3
Fully covered
- Age word problem: Arman & Diya
- Age word problem: Ben & William
- Age word problem: Imran
- Age word problems
- Elimination method review (systems of linear equations)
- Equivalent systems of equations review
- How many solutions does a system of linear equations have if there are at least two?
- Number of solutions to a system of equations
- Number of solutions to a system of equations algebraically
- Number of solutions to a system of equations algebraically
- Number of solutions to a system of equations graphically
- Number of solutions to a system of equations graphically
- Number of solutions to system of equations review
- Solutions of systems of equations
- Solutions to systems of equations: consistent vs. inconsistent
- Solutions to systems of equations: dependent vs. independent
- Solving equations by graphing
- Solving equations by graphing: graphing calculator
- Solving equations by graphing: intro
- Solving equations by graphing: word problems
- Solving equations graphically: graphing calculator
- Solving equations graphically: intro
- Solving equations graphically: word problems
- Substitution method review (systems of equations)
- System of equations word problem: infinite solutions
- System of equations word problem: no solution
- System of equations word problem: walk & ride
- Systems of equations number of solutions: fruit prices (1 of 2)
- Systems of equations number of solutions: fruit prices (2 of 2)
- Systems of equations with elimination
- Systems of equations with elimination (and manipulation)
- Systems of equations with elimination challenge
- Systems of equations with elimination: apples and oranges
- Systems of equations with elimination: coffee and croissants
- Systems of equations with elimination: King's cupcakes
- Systems of equations with elimination: potato chips
- Systems of equations with elimination: TV & DVD
- Systems of equations with elimination: x-4y=-18 & -x+3y=11
- Systems of equations with graphing
- Systems of equations with graphing: exact & approximate solutions
- Systems of equations with graphing: y=7/5x-5 & y=3/5x-1
- Systems of equations with substitution
- Systems of equations with substitution: -3x-4y=-2 & y=2x-5
- Systems of equations with substitution: coins
- Systems of equations with substitution: potato chips
- Systems of equations word problems
- Systems of equations word problems (with zero and infinite solutions)
- Systems of equations: trolls, tolls (1 of 2)
- Systems of equations: trolls, tolls (2 of 2)
- Testing a solution to a system of equations
- Two-variable linear equations intro
- Why can we subtract one equation from the other in a system of equations?
A1.REI.B.4
Mostly covered
- Elimination method review (systems of linear equations)
- Equivalent systems of equations review
- How many solutions does a system of linear equations have if there are at least two?
- Number of solutions to a system of equations
- Number of solutions to a system of equations algebraically
- Number of solutions to a system of equations algebraically
- Number of solutions to a system of equations graphically
- Number of solutions to a system of equations graphically
- Number of solutions to system of equations review
- Solutions of systems of equations
- Solutions to systems of equations: consistent vs. inconsistent
- Solutions to systems of equations: dependent vs. independent
- Solving equations by graphing
- Solving equations by graphing: graphing calculator
- Solving equations by graphing: intro
- Solving equations by graphing: word problems
- Solving equations graphically: graphing calculator
- Solving equations graphically: intro
- Solving equations graphically: word problems
- Systems of equations number of solutions: fruit prices (1 of 2)
- Systems of equations number of solutions: fruit prices (2 of 2)
- Systems of equations with elimination
- Systems of equations with elimination challenge
- Systems of equations with elimination: apples and oranges
- Systems of equations with elimination: coffee and croissants
- Systems of equations with elimination: King's cupcakes
- Systems of equations with elimination: potato chips
- Systems of equations with elimination: TV & DVD
- Systems of equations with elimination: x-4y=-18 & -x+3y=11
- Systems of equations with graphing
- Systems of equations with graphing: exact & approximate solutions
- Systems of equations with graphing: y=7/5x-5 & y=3/5x-1
- Systems of equations with substitution: potato chips
- Systems of equations word problems (with zero and infinite solutions)
- Systems of equations: trolls, tolls (1 of 2)
- Systems of equations: trolls, tolls (2 of 2)
- Testing a solution to a system of equations
- Two-variable linear equations intro
- Why can we subtract one equation from the other in a system of equations?
A1.REI.B.5
Fully covered
- Elimination method review (systems of linear equations)
- Equivalent systems of equations review
- Systems of equations with elimination
- Systems of equations with elimination challenge
- Systems of equations with elimination: apples and oranges
- Systems of equations with elimination: coffee and croissants
- Systems of equations with elimination: King's cupcakes
- Systems of equations with elimination: potato chips
- Systems of equations with elimination: TV & DVD
- Systems of equations with elimination: x-4y=-18 & -x+3y=11
- Systems of equations word problems (with zero and infinite solutions)
- Why can we subtract one equation from the other in a system of equations?
A1.REI.C.6
Fully covered
- Complete solutions to 2-variable equations
- Completing solutions to 2-variable equations
- How many solutions does a system of linear equations have if there are at least two?
- Intercepts from a graph
- Intercepts from an equation
- Intro to intercepts
- Intro to slope-intercept form
- Intro to slope-intercept form
- Number of solutions to a system of equations
- Number of solutions to a system of equations algebraically
- Number of solutions to a system of equations algebraically
- Number of solutions to a system of equations graphically
- Number of solutions to a system of equations graphically
- Number of solutions to system of equations review
- Slope-intercept intro
- Solutions to 2-variable equations
- Solutions to 2-variable equations
- Solutions to systems of equations: consistent vs. inconsistent
- Solutions to systems of equations: dependent vs. independent
- Systems of equations number of solutions: fruit prices (1 of 2)
- Systems of equations number of solutions: fruit prices (2 of 2)
- Worked example: solutions to 2-variable equations
A1.REI.C.7
Fully covered
A1.REI.C.8
Fully covered