[center][img]data:image/png;base64,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[/img][/center][list][*]Tyler says the temperature dropped faster between 4 p.m. and 6 p.m. [/*][*]Mai says the temperature dropped faster between 6 p.m. and 10 p.m.[/*][/list][br]Who do you agree with? Explain your reasoning.

[size=150]The table and graphs show a more complete picture of the temperature changes on the same winter day. The function [math]T[/math] gives the temperature in degrees Fahrenheit, [math]h[/math] hours since noon.[/size][br][center][/center][table][tr][td][img]data:image/png;base64,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[/img][/td][td][img]data:image/png;base64,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[/img][/td][/tr][/table][br][br][size=100][size=150]Find the [b]average rate of change[/b] for the following intervals. Explain or show your reasoning. [/size][br][br]between noon and 1 p.m.[/size]

between noon and 4 p.m.

between noon and midnight

[size=150]Remember Mai and Tyler’s disagreement? [/size][br]Use average rate of change to show which time period—4 p.m. to 6 p.m. or 6 p.m. to 10 p.m.—experienced a faster temperature drop.[br]

Over what interval did the temperature decrease the most rapidly?[br]

Over what interval did the temperature increase the most rapidly?[br]

Estimate the average rate of change in the population in each state between 1970 and 2010. Show your reasoning.

In this situation, what does each rate of change mean?

Which state’s population grew more quickly between 1900 and 2000? Show your reasoning.