Write an equation that describes the relationship between [math]h[/math] and [math]t[/math].
After how many months will the bamboo plant be 66 inches tall? Explain or show your reasoning.
[table][tr][td][img]data:image/png;base64,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[/img][/td][td]The relationship between cups of flour [math]y[/math] [br]and cups of sugar [math]x[/math] in the second recipe [br]is [math]y=\frac{7}{4}x[/math][/td][/tr][/table][br]If you used 4 cups of sugar, how much flour does each recipe need?
What is the constant of proportionality for each situation and what does it mean?
Identify the sequence of translations, rotations, reflections, and dilations that takes the larger figure to the smaller one.