Graphs with Intercepts
buttons.Graph a Line Using the Intercepts
To graph a linear equation by plotting points, you need to find three points whose coordinates are solutions to the equation. You can use the \(x-\) and \(y-\) intercepts as two of your three points. Find the intercepts, and then find a third point to ensure accuracy. Make sure the points line up - then draw the line. This method is often the quickest way to graph a line.
Example 4.22
Graph \(–x+2y=6\) using the intercepts.
Solution
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Step 1. Find the \(x\) - and \(y\) intercepts of the line. Let \(y=0\) and solve for \(x\). Let \(x=0\) and solve for \(y\). |
Find the \(x\) -intercept. Find the \(y\) -intercept. |
\(\begin{align} \begin{array}{r} \text { Let } y=0 \\ -x+2 y=6 \\ -x+2(0)=6 \\ -x=6 \\ x=-6 \end{array} \end{align}\) \(\begin{align} \begin{array}{r} \text { Let } x=0 \\ -x+2 y=6 \\ -0+2 y=6 \\ 2 y=6 \\ y=3 \end{array} \end{align}\) The \(y\) -intercept is \((0,3)\) |
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Step 2. Find another solution to the equation. |
We'll use \(x=2\). |
\(\begin{align} \begin{array}{r} \text { Let } x=2 \\ -x+2 y=6 \\ -2+2 y=6 \\ 2 y=8 \\ y=4 \end{array} \end{align}\) |
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Step 3. Plot the three points. Check that the points line up. |
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Step 4. Draw the line. |
See the graph. |
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Try It 4.43
Graph \(x–2y=4\) using the intercepts.
Try It 4.44
Graph \(–x+3y=6\) using the intercepts.
The steps to graph a linear equation using the intercepts are summarized below.
HOW TO
Graph a linear equation using the intercepts.
- Step 1. Find the \(x-\) and \(y-\) intercepts of the line.
- Let \(y=0\) and solve for \(x\).
- Let \(x=0\) and solve for \(y\).
- Step 2. Find a third solution to the equation.
- Step 3. Plot the three points and check that they line up.
- Step 4. Draw the line.
Example 4.23
Graph \(4x–3y=12\) using the intercepts.
Solution
Find the intercepts and a third point.
| \(x \text { -intercept, let } y=0\) | \(y \text { -intercept, let } x=0\) | \(\text { third point, let } y=4\) |
| \(\begin{aligned} 4 x-3 y &=12 \\ 4 x-3(0) &=12 \\ 4 x &=12 \\ x &=3 \end{aligned}\) | \(\begin{array}{r} 4 x-3 y=12 \\ 4(0)-3 y=12 \\ -3 y=12 \\ y=-4 \end{array} \) |
\(\begin{array}{r} 4 x-3 y=12 \\ 4 x-3(4)=12 \\ 4 x-12=12 \\ 4 x=24 \\ x=6\end{array}\) |
We list the points in Table 4.27 and show the graph below.
| \(4x−3y=12\) | ||
| \(x\) | \(y\) | \((x,y)\) |
| \(3\) | \(0\) | \((3,0)\) |
| \(0\) | −\(4\) | \((0,−4)\) |
| \(6\) | \(4\) | \((6,4)\) |
Table 4.27
Try It 4.45
Graph \(5x–2y=10\) using the intercepts.
Try It 4.46
Graph \(3x–4y=12\) using the intercepts.
Example 4.24
Graph \(y=5x\) using the intercepts.
Solution
| \(x\)-intercept | \(y\)-intercept |
|---|---|
| Let \(y=0\). | Let \(x=0\). |
| \(y=5 x\) | \(y=5 x\) |
| \(0=5 x\) | \(y=5 \cdot 0\) |
| \( 0=x\) | \(y=0\) |
| \( (0,0) \) | \( (0,0)\) |
This line has only one intercept. It is the point \((0,0)\).
To ensure accuracy we need to plot three points. Since the \(x-\) and \(y-\) intercepts are the same point, we need two more points to graph the line.
| Let \(x=1\). | Let \(x=-1\). |
| \(y=5 x\) | \(y=5 x\) |
| \(y=5 \cdot 1\) | \(y=5 (-1)\) |
| \(y=5\) | \(y=-5\) |
See Table 4.28.
| y=5x | ||
| x | y | (x,y) |
| \(0\) | \(0\) | \((0,0)\) |
| \(1\) | \(5\) | \((1,5)\) |
| \(−1\) | \(−5\) | \((−1,−5)\) |
Table 4.28
Plot the three points, check that they line up, and draw the line.
Try It 4.47
Graph \(y=4x\) using the intercepts.
Try It 4.48
Graph \(y=−x\) the intercepts.