[size=150]A student said, “To find the value of [math]109.2\div6[/math], I can divide 1,092 by 60.”[br][/size][br]Do you agree with her? Explain your reasoning.[br]
Calculate the quotient of [math]109.2\div6[/math] using any method of your choice.
[size=150]Here is how Han found [math]31.59\div13[/math]:[/size][br][img]data:image/png;base64,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[/img][br]At the second step, Han subtracts 52 from 55. How do you know that these numbers represent tenths?[br]
At the third step, Han subtracts 39 from 39. How do you know that these numbers represent hundredths?[br]
Check that Han’s answer is correct by calculating the product of 2.43 and 13.[br]
[size=150]Write two division expressions that have the same value as [math]61.12\div3.2[/math].[/size][br]
[size=150]Find the value of [math]61.12\div3.2[/math]. Show your reasoning. [/size]
[size=150]A bag of pennies weighs 5.1 kilograms. Each penny weighs 2.5 grams. About how many pennies are in the bag?[/size]
[size=150]Plant B is [math]6\frac{2}{3}[/math] inches tall. Plant C is [math]4\frac{4}{15}[/math] inches tall. Complete the sentences and show your reasoning.[/size][br][br]Plant C is _______ times as tall as Plant B.[br]
Plant C is _______ inches ____________ (taller or shorter) than Plant B.[br]
The number of students who take public transit is 20% of the number of students who walk. How many students take public transit?[br]
The number of students who bike to school is 5% of the number of students who walk. How many students bike to school?
The number of students who ride the school bus is 110% of the number of students who walk. How many students ride the school bus?