Solving Systems of Linear and Quadratic Equations

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Solve a System Algebraically

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Presentation transcript:

Solving Systems of Linear and Quadratic Equations

Remember these? Systems of Linear Equations We had 3 methods to solve them. Method 1 - Graphing Solve for y. (6, – 4)

Remember these? (6, – 4) Systems of Linear Equations Method 2 - Substitution (6, – 4)

Remember these? (6, – 4) Systems of Linear Equations Method 3 - Elimination All 3 methods giving us the same answer (6,–4). (6, – 4)

Try the following. (12,1) Many solutions Same Line! NO solution 1. Many solutions Same Line! 4. 5. 2. 3. NO solution Parallel Lines! 6. (12, – 4)

Now let’s look at Systems of Linear and Quadratic Equations!

Solve the System Algebraically Use Substitution (0, 1) (1, 2) Answer: (0,1) (1,2)

Solve the System Algebraically Use Substitution (2, 2) Answer: (2,2)

Solve the System Algebraically Use Substitution (5, –1) (1, – 5) Answer: (5, –1) (1, – 5)

Solve the System Algebraically Use Substitution (4, 3) (– 4, – 3) Answer: (4, 3) (–4, – 3)

Solve the System Algebraically Use ????

Now let’s look at the Graphs of these Systems! Quadratic Parabola What does the graph of each look like? Classify each equation as linear/quadratic. Linear Line What is the solution to the system? Point of Intersection (-2, 0) Point of Intersection (1, -3 )

We have solved the following algebraically Now use your calculator to check it graphically. Answer: (0,1) (1,2) Answer: (2,2)