[img]data:image/png;base64,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[/img]
What do you notice about the difference from year to year?[br]
If there are [math]n[/math] stores one year, how many stores will there be a year later?
What do you notice about the difference every 3 years?[br]
If there are [math]n[/math] stores one year, how many stores will there be 3 years later?
What do you notice about the difference from year to year?[br]
What do you notice about the factor from year to year?[br]
If there are [math]n[/math] stores one year, how many stores will there be a year later?[br]
What do you notice about the difference every 3 years?[br]
What do you notice about the factor every 3 years?[br]
If there are [math]n[/math] stores one year, how many stores will there be 3 years later?[br]
Come up with a plan for the company to achieve this where it adds the same number of stores each year.
Come up with a plan for the company to achieve this where the number of stores multiplies by the same factor each year. (Note that you might need to round the outcome to the nearest whole store.)
[list][*][size=150]Situation 1: A person has 80 followers on social media. The number of followers triples each year. How many followers will she have after 4 years?[br][/size][/*][*][size=150]Situation 2: A tank contains 80 gallons of water and is getting filled at rate of 3 gallons per minute. How many gallons of water will be in the tank after 4 minutes?[br][/size][/*][/list][size=150][br]Match each representation (a table or an expression) with one situation. Be prepared to explain how the table or expression answers the question.[br][/size][br][math]80\cdot3\cdot3\cdot3\cdot3[/math]
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sLfC45saHmZaQggNWjCkCxdpjMLdh+0FP5ecGRDy0s1Dfy3E12+INhexsBqIG8NNPlLo2k0DbRzRsAIDCcBM43hXHfL2gj0TMBMo2d0NtAIDCcBM43hXHfL2gj0TOB/SkSGLKYoLaUAAAAASUVORK5CYII=[/img]
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