Use the information that 3 hours costs $84. What operation connects 84 dollars and 3 hours to a "dollars per hour" rate?

After you find a candidate hourly rate from the 3-hour case, test it with the 5-hour, $140 case. Does multiplying that rate by 5 give 140?

Once you know the hourly rate, look for the option where $C$ is that rate multiplied by $h$, and where the cost increases (not decreases) as hours increase.

In one line, type 84/3 and in another line, type 140/5. Check that both expressions evaluate to the same number; that common value is the hourly rate in dollars per hour.

Once you see the hourly rate from step 1, write an equation of the form C = (that rate)*h in Desmos. This represents the cost as a function of hours.

(Optional) Add the points (3,84) and (5,140) in Desmos. Verify that they lie on the line given by your equation; the option whose line goes through both points is the correct one.

The company charges a constant amount per hour, so the cost is proportional to the number of hours.

That means the relationship has the form

• $C = (\text{hourly rate}) \times h$

or, more simply,

• $C = kh$, where $k$ is the cost per hour.

We know that 3 hours of work costs $84.

Substitute $h = 3$ and $C = 84$ into $C = kh$:

Solve for $k$:

So the company charges 28 dollars per hour.

Now check that this hourly rate also works for 5 hours and $140.

Using $k = 28$ and $h = 5$:

This matches the given information, so $k = 28$ is consistent with both points.

Since the hourly rate is 28 dollars per hour and the cost is rate times hours, the equation relating total cost $C$ to hours $h$ is

So the correct choice is $C = 28h$.