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E. Math is > the Rest. Pre-Calculus 20 P20.9 Expand and demonstrate understanding of inequalities including: one-variable quadratic inequalities two-variable linear and quadratic inequalities. Key Terms :. 1. Two Variable Linear Inequalities. P20.9
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E. Math is > the Rest Pre-Calculus 20 P20.9 Expand and demonstrate understanding of inequalities including: one-variable quadratic inequalities two-variable linear and quadratic inequalities.
1. Two Variable Linear Inequalities • P20.9 • Expand and demonstrate understanding of inequalities including: • one-variable quadratic inequalities • two-variable linear and quadratic inequalities.
1. Two Variable Linear Inequalities • A Linear Inequalities comes in 4 forms:
A linear Inequality is describing a region on a Cartesian plane • An order pair (x,y) is a solution to the Inequality if it satisfies the equations • The set of points that satisfy the Inequality is called the Solution Region • The line related to the Inequality Ax + Bx = C called the boundary divides the Cartesian plane into to regions.
For the solution region Ax + Bx ≥ C is true • For the solution region Ax + Bx ≥ C is false
Practice • Ex. 9.1 (p.472) #1-17 #8-21
2. Quadratic Inequalities in One Variable • P20.9 • Expand and demonstrate understanding of inequalities including: • one-variable quadratic inequalities • two-variable linear and quadratic inequalities.
Quadratic Inequalities can be written with any inequality sign.
You can solve a quadratic inequality graphically or algebraically • The solution set to a Quadratic Inequality in one variable can have 0, 1, Infinite Solutions
Practice • Ex. 9.2 (p.484) #1-17 #9-20
3. Two Variable Quadratic Inequalities • P20.9 • Expand and demonstrate understanding of inequalities including: • one-variable quadratic inequalities • two-variable linear and quadratic inequalities.
3. Two Variable Quadratic Inequalities • You can express a quadratic inequality in two variables in one of the following forms:
A Quadratic Inequality is 2 variables represents a region of the Cartesian plane with a parabola as the boundary. • The graph of Quadratic Inequality is the set of points (x,y) that are solutions to the inequalities.
The boundary is set by y= x2-2x-3 and because its < , the boundary has dashed line because those points are not inclined in solutions • To determine the solution region use a test point. Lets try (0,0).
Practice • Ex. 9.3 (p.496) #1-15 #6-18