More and Less than 1%: IM 7.4.9
[url=https://im.kendallhunt.com/MS/teachers/2/4/9/preparation.html]“More and Less than 1%”[/url] from IM Grade 7 by [url=https://www.geogebra.org/m/gus8ffvr]Open Up Resources[/url] and Illustrative Mathematics. Licensed under the [url=https://creativecommons.org/licenses/by/4.0/]Creative Commons Attribution 4.0 license[/url].
Table of Contents
- Lesson 7.4.9
- IM 7.4.9 Lesson: More and Less than 1%
- Practice 7.4.9
- IM 7.4.9 Practice: More and Less than 1%
IM 7.4.9 Lesson: More and Less than 1%
Determine the percentage mentally.
10 is what percentage of 50?
5 is what percentage of 50?
1 is what percentage of 50?
17 is what percentage of 50?
During one waiter’s shift, he delivered appetizers, entrées, and desserts. What percentage of the dishes were desserts? appetizers? entrées? What do your percentages add up to?
Find each percentage of 60.
30% of 60
3% of 60
0.3% of 60
0.03% of 60
What do you notice about your last 4 answers?
20% of 5,000 is 1,000 and 21% of 5,000 is 1,050. Find each percentage of 5,000 and be prepared to explain your reasoning. If you get stuck, consider using the double number line diagram.
1% of 5,000
0.1% of 5,000
20.1% of 5,000
20.4% of 5,000
15% of 80 is 12 and 16% of 80 is 12.8. Find each percentage of 80 and explain your reasoning.
15.1% of 80
15.7% of 80
To make Sierpinski's triangle,[br][list][*]Start with an equilateral triangle. This is step 1.[/*][*]Connect the midpoints of every side, and remove the middle triangle, leaving three smaller triangles. This is step 2.[/*][*]Do the same to each of the remaining triangles. This is step 3.[/*][*]Keep repeating this process.[/*][/list][img]data:image/png;base64,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[/img][br]What percentage of the area of the original triangle is left after step 2? Step 3? Step 10?
At which step does the percentage first fall below 1%?
The population of City A was approximately 243,000 people, and it increased by 8% in one year. What was the new population?
The population of city B was approximately 7,150,000, and it increased by 0.8% in one year. What was the new population?
IM 7.4.9 Practice: More and Less than 1%
The student government snack shop sold 32 items this week.
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[/img][br][br]What percentage of all snacks sold were fruit cups?
What percentage of all snacks sold were veggie sticks?
What percentage of all snacks sold were chips?
What percentage of all snacks sold were water?
Select [b]all[/b] the options that have the same value as [math]3\frac{1}{2}\%[/math] of 20.
22% of 65 is 14.3. What is 22.6% of 65? Explain your reasoning.
A bakery used 30% more sugar this month than last month. If the bakery used 560 kilograms of sugar last month, how much did it use this month?
Select [b]all [/b]of the situations that match the diagram below.[br][img]data:image/png;base64,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[/img]
Select [b]all [/b]of the situations that match the diagram below.[br][img]data:image/png;base64,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[/img]
A certain type of car has room for 4 passengers.
Write an equation relating the number of cars ([math]n[/math]) to the number of passengers ([math]p[/math]).
How many passengers could fit in 78 cars?
How many cars would be needed to fit 78 passengers?