- Graph inequalities in a xy coordinate graph.
Assumptions:!
Ability to graph a line using the slope-intercept form (y = mx + b)
Concepts:
- The shaded area of a graph represents all of the coordinates that will work in a given equation.
- A solid edge of the shaded area means that the e! dge is part of the solutions to the equation.
- A dashed edge of the shaded area means that the edge of the graph is not part of the solutions.
Directions:
Graph the equation 
Step 1: Draw the graph just as you would y = x . This equations in slope intercept form would look like this 
. The 0 means that you will go through the origin, place a point there. Now use the slope to draw the rest of t! he line. From the origin go up one and to the right one and pl! ace anot her point. Repeat until you have several points.
Now draw a solid line because the equation to be graphed is greater than or equal to. Your graph should now look like this:
Step 2: Next shade everywhere above the line because the equation states that the y values are greater than or equal to the line for any given x value.
Now check your answer by inserting a couple of points from the shaded area and non-shaded area.
Shaded
Does the point ( 1, 2) work in the equation? yes 
Does the point ( -1, 0) work in the equation? yes 
Non-shaded
Does the point ( 1, 0) work in the equation? no 
Does the point ( 2, 1) work in the e! quation? no 
Lets try another one.
Graph graph y > 2x + 3
Remember the steps: plot some points, draw the line (solid if equal to, dashed if greater than or less than), shade above with greater than, shade below with less than.
The line will cross the y axis as 3 then go up 2 and over 1 for the slope. Start by placing a point at 3 on the y axis. Next use the slope to place 2 more dots, then make a dashed line through the dots.
The equation uses the greater than inequality so it should be shaded above the line.
Now that we have the common ones out of the way lets look at the ones that may trip you up such as the ones with only one variable like y > 2 and x < -3.
Graph y > 2
Remember that is just a horizontal line. This is just a horizontal line that is shaded above the line and dashed because it is not equal to the line it is only greater than the line.
Graph x < -3
Remember that is just a vertical line. This is just a vertical line that is shaded to the left of the line and dashed because it is not equal to the line it is only less than the line. The x values on the left are less than the line.
Things to remember when graphing inequalities:
≥ Solid line and shaded above the line.
≤ Solid line and shaded below the line
> Dashed line and shaded above the line
y > # Horizontal line and shaded above the line
y < # Horizontal! line an d shaded below the line
x > # Vertical line and shaded on the right side of the line
x < # Vertical line and shaded on the left side of the line.
coordinate plane
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