[br]In previous lessons, you learned how to add, subtract, and multiply fractions and mixed numbers. [br][br][i][color=#0000ff]Wearing Uniforms:[/color][/i] https://www.geogebra.org/m/ceyu3wpa[br][i][color=#0000ff]Mixing 'Em Up:[/color][/i] https://www.geogebra.org/m/hzx95nwa[br][color=#0000ff][i]Reducing, Reusing, Recycling:[/i][/color] https://www.geogebra.org/m/gcxtdncg[br][br]In this lesson, you're going to learn how to divide fractions and mixed numbers.[br][br][color=#0000ff]DIVISION[/color] of [color=#0000ff]FRACTIONS[/color] follows the exact same steps as [color=#0000ff]MULTIPLICATION[/color] of [color=#0000ff]FRACTIONS[/color] with one major difference. The first step in division involves [color=#ff0000]FLIPPING[/color] (inverting) the [color=#ff0000]SECOND FRACTION[/color] after which, the operation proceeds as in [color=#0000ff]MULTIPLICATION [/color]of[color=#0000ff] FRACTIONS[/color].[br][br]Examples:[br][br][img]data:image/png;base64,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[/img][br][br][img]data:image/png;base64,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[/img][br][br]In [color=#0000ff]DIVISION[/color] of [color=#0000ff]MIXED NUMBERS[/color], the first step involves [color=#ff0000]CONVERTING[/color] the [color=#ff0000]MIXED NUMBER[/color] into an [color=#ff0000]IMPROPER FRACTION[/color], after which the operation proceeds as in [color=#0000ff]DIVISION[/color] of [color=#0000ff]FRACTIONS[/color] as outlined above.[br][br]Examples:[br][br][img]data:image/png;base64,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[/img][br][br][img]data:image/png;base64,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[/img]

[br]Select a category or a pair of categories (as the applet will allow). Then solve the problem mentally or on a separate sheet of paper and verify your answer by clicking [b]Answer[/b]. The applet will give the correct answer.[br][br]Repeat as many times as needed to master the concept. Make sure to work on all categories.

In future lessons, you'll learn how to work with other forms of showing the parts of a whole. Did you ENJOY today's lesson?