How many of the values in this data set are between the first quartile and the third quartile?

How many of the values in this data set are between the first quartile and the median?

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[/img][br][br]What is the median score?

What is the first quartile (Q1)?

What is the third quartile (Q3)?

What is the interquartile range (IQR)?

[size=150]Mai and Priya each played 10 games of bowling and recorded the scores. Mai’s median score was 120, and her IQR was 5. Priya’s median score was 118, and her IQR was 15. Whose scores probably had less variability? Explain how you know.[/size]

There are 20 pennies in a jar. If 16% of the coins in the jar are pennies, how many coins are there in the jar?