Interpreting Linear Functions
The graph of a Linear Function is a straight line. The function has either one or two variables with no powers or exponents. If the function
has more variables, then those variables must be constants or variables which will remain a linear function. A linear function has the following form y = f(x) = ax + b. A linear function has one independent variable and one dependent variable. The independent variable is x and the dependent variable is y. It is needed to create and graph linear equations. It involves manipulation of any linear equation into slope-intercept, point-slope and standard form. Then the equation is created for the visualization of the function and explains the parts of the equation represented on the graph. Understanding how linear equations represent relations in the real world is a prerequisite to understanding higher-level equations and their applications.
Hook Questions:
1.What is a linear function? |
2.What does it mean to be linear in math? |
3.Is a linear function a polynomial function? |
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