The graph below represents c, the amount a phone company charges, based on m, the number of minutes the customer uses each month. If there are a maximum of 44,640 minutes in a month, which equation best represents the phone company’s charges?

What graph? Cannot copy and paste here.

The answer is 03294308949383092480932

To determine the equation that represents the phone company's charges, we need to analyze the provided graph and identify the relationship between the number of minutes used (m) and the corresponding charge amount (c).

Since we do not have access to the graph, let's analyze the information given in the question. The question states that there are a maximum of 44,640 minutes in a month. This implies that the graph should be a straight line, as the charges increase linearly with the number of minutes used. Therefore, we can conclude that the relationship between m and c is a linear equation.

A linear equation can be represented in the form:
c = mx + b

Where "m" represents the slope of the line, and "b" represents the y-intercept (the point where the line intersects the y-axis).

To determine the equation, we need to identify the values of "m" and "b" based on the given information in the question.

Since we don't have specific values for the slope and y-intercept, we cannot determine the exact equation without additional information or access to the graph. However, we can make an educated guess.

Considering that the graph represents the phone company's charges, we can assume that there is likely a base charge even if the number of minutes used is zero. This would be represented by the y-intercept (b) in the equation.

Based on this assumption, our equation (in slope-intercept form) would look something like this:
c = m * m + b

However, without more information or access to the graph, we cannot provide the exact equation that represents the phone company's charges.

A phone company charges a monthly fee of $13 plus 12 cents per text message. Another company charges $20 each month plus 8 cents per text message for the same plan.

How many text messages will have to be sent for the cost of a phone plan from the first company to equal the cost of a phone plan from the second company?

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