How much does honey cost per ounce?

How much honey can you buy per dollar?

Write two different equations that represent this situation. Use [math]h[/math] for ounces of honey and [math]c[/math] for cost in dollars.

The point [math]\left(3,\frac{6}{5}\right)[/math] lies on the graph representing a proportional relationship. Which of the following points also lie on the same graph? Select [b]all [/b]that apply.

Write the equation for the relationship that has constant of proportionality greater than 1. 

Write the equation for the relationship that has constant of proportionality less than 1.

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[/img][br][br]Come up with a situation that could be represented by this graph.

Choose a point on the graph. What do the coordinates represent in your situation?