Lesson 13More Solutions to Linear Equations
Let’s find solutions to more linear equations.
Learning Targets:
- I can find solutions to linear equations given either the - or the -value to start from.
13.1 Coordinate Pairs
For each equation choose a value for and then solve to find the corresponding value that makes that equation true.
13.2 True or False: Solutions in the Coordinate Plane
Here are graphs representing three linear relationships. These relationships could also be represented with equations.
For each statement below, decide if it is true or false. Explain your reasoning.
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is a solution of the equation for line .
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The coordinates of the point make both the equation for line and the equation for line true.
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is a solution of the equation for line .
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makes both the equation for line and the equation for line true.
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There is no solution for the equation for line that has .
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The coordinates of point are solutions to the equation for line .
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There are exactly two solutions of the equation for line .
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There is a point whose coordinates make the equations of all three lines true.
After you finish discussing the eight statements, find another group and check your answers against theirs. Discuss any disagreements.
13.3 I’ll Take an X, Please
One partner has 6 cards labeled A through F and one partner has 6 cards labeled a through f. In each pair of cards (for example, Cards A and a), there is an equation on one card and a coordinate pair, , that makes the equation true on the other card.
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The partner with the equation asks the partner with a solution for either the -value or the -value and explains why they chose the one they did.
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The partner with the equation uses this value to find the other value, explaining each step as they go.
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The partner with the coordinate pair then tells the partner with the equation if they are right or wrong. If they are wrong, both partners should look through the steps to find and correct any errors. If they are right, both partners move onto the next set of cards.
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Keep playing until you have finished Cards A through F.
Are you ready for more?
Consider the equation , where and are positive numbers.
- Find the coordinates of the - and -intercepts of the graph of the equation.
- Find the slope of the graph.
Lesson 13 Summary
Let's think about the linear equation . If we know is a solution to the equation, then we also know is a point on the graph of the equation. Since this point is on the -axis, we also know that it is the vertical intercept of the graph. But what about the coordinate of the horizontal intercept, when ? Well, we can use the equation to figure it out.
Since when , we know the point is on the graph of the line. No matter the form a linear equation comes in, we can always find solutions to the equation by starting with one value and then solving for the other value.
Lesson 13 Practice Problems
For each equation, find when . Then find when
Match each graph of a linear relationship to a situation that most reasonably reflects its context.
- is the weight of a kitten days after birth.
- is the distance left to go in a car ride after hours of driving at a constant rate toward its destination.
- is the temperature, in degrees C, of a gas being warmed in a laboratory experiment.
- is the amount of calories consumed eating crackers.
- True or false: The points , , and all lie on the same line. The equation of the line is . Explain or show your reasoning.
Here is a linear equation:
- Are and solutions to the equation? Explain or show your reasoning.
- Find the -intercept of the graph of the equation. Explain or show your reasoning.
Find the coordinates of , , and given that = 5 and = 10.