Graphing Inequalities on the Number Line

Directions:[br][br]In the applet below, you'll see an inequality. Move the [color=#1551b5][b]BLUE POINT[/b][/color] above the number line below and adjust the [color=#c51414][b]red[/b][/color] and [color=#1551b5][b]blue[/b][/color] sliders (off to the top right) so that the graph you create is the graph of the inequality shown. [br][br]Click on the "Generate New Inequality" button to generate a new inequality to graph. [b]You will need to do 2 problems.[/b][br][br][i]Take a screenshot of your answer "ctrl + Shift + Window". Download screenshot to problem on canvas quiz[br][img]data:image/jpeg;base64,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[/img] [/i]

Information: Graphing Inequalities on the Number Line