4. Linear Functions

4.01 Review: Slope as rate of change

4.02 The slope formula

4.03 Transformations of y=x

Investigation: Exploring slopes and equations of lines

4.04 Slope-intercept form

4.05 Standard form

Investigation: Relationship between shoulder span and height

4.06 Point-slope form

4.07 Graphical solutions to linear equations or inequalities

4.08 Graphing linear inequalities in two variables

4.09 Modeling linear relationships

4.10 Comparing linear relationships

4.11 Arithmetics sequences as linear functions

United States of America UT

Math I

4.07 Graphical solutions to linear equations or inequalities

Interactive practice questions

Consider the equation $\frac{3x}{5}-1=2$3x5−1=2.

a

Solve for the value of $x$x that satisfies the equation.

b

To verify the solution graphically, which two straight lines would need to be graphed?

$y=\frac{3x}{5}$y=3x5

A

$y=\frac{3x}{5}+1$y=3x5+1

B

$y=2$y=2

C

$y=\frac{3x}{5}-1$y=3x5−1

D

c

Graph the lines $y=\frac{3x}{5}-1$y=3x5−1 and $y=2$y=2 on the same plane.

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d

Hence find the value of $x$x that satisfies the two equations $y=\frac{3x}{5}-1$y=3x5−1 and $y=2$y=2 simultaneously.

Easy

5min

Consider the equation $2\left(x-1\right)-3=7$2(x−1)−3=7.

Easy

4min

Consider the equation $2x=8-2x$2x=8−2x.

Easy

4min

Consider the equation $4x+3=2x-1$4x+3=2x−1.

Easy

4min

Outcomes

I.A.REI.11

Explain why the x-coordinates of the points where the graphs of the equations y = f(x) and y = g(x) intersect are the solutions of the equation f(x) =g(x); find the solutions approximately. Include cases where f(x) and/or g(x) are linear and exponential functions.

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