[img]data:image/png;base64,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[/img][br][br]Priya says the area of the large unmarked square is 26 square units because [math]9+17=26[/math]. Do you agree? Explain your reasoning.

[math]m[/math], [math]p[/math][size=150] and [math]z[/math] represent the lengths of the three sides of this right triangle.[br][img]data:image/png;base64,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[/img][br][size=100]Select all the equations that represent the relationship between [math]m[/math], [math]p[/math], and [math]z[/math].[/size][/size]

[size=150]Which is the best explanation for why [math]-\sqrt{10}[/math] is irrational?[/size]

[size=150]A teacher tells her students she is just over 1 and [math]\frac{1}{2}[/math] billion seconds old.[/size][br][br]Write her age in seconds using scientific notation.

What is a more reasonable unit of measurement for this situation?

[size=100]How old is she when you use a more reasonable unit of measurement?[/size]