Sixth-grade students were asked, “What grade are you in?” Explain why this is [i]not[/i] a statistical question.

Lin and her friends went out for ice cream after school. The following questions came up during their trip. Select [b]all [/b]the questions that are statistical questions.

Here is a list of questions about the students and teachers at a school. Select [b]all [/b]the questions that are statistical questions.

What is a typical height of female athletes on a team in the most recent international sporting event?

Are most adults in the school football fans?

How long do drivers generally need to wait at a red light in Washington, DC?

[img]data:image/png;base64,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[/img][br][br][math]\left(1,-6\right),\left(-7,-8\right),\left(-3,7\right),\left(0,9\right)[/math]

[math]\left(-20,-30\right),\left(-40,10\right),\left(20,-10\right),\left(5,-20\right)[/math]

[math]\left(\frac{-1}{3},-1\right),\left(\frac{2}{3},-1\frac{1}{3}\right),\left(\frac{-4}{3},\frac{2}{3}\right),\left(\frac{1}{6},0\right)[/math]

Noah’s water bottle contains more than 1 quart of water but less than [math]1\frac{1}{2}[/math] quarts. Let [math]w[/math] be the amount of water in Noah’s bottle, in quarts. Select [b]all [/b]the true statements.