The equation
represents the total cost \(C\) of using a computer for
minutes at the internet cafe. The slope
signifies a cost increase of
dollars per minute.
The equation for the total cost of using a computer at the internet cafe,
, is expressed as
, where
is the number of minutes used. This equation reflects the cafe's pricing structure, with the term
representing the cost per minute of computer usage and the constant term 1 representing the initial fee.
The slope of the function is
In the context of the problem, this slope signifies the rate of change in cost concerning time, specifically the cost per minute. For every additional minute of computer usage, the cost increases by
units. Therefore, the cafe charges
dollars per minute for utilizing their computer services.
The graph visually illustrates this linear relationship, showing a steady increase in the total cost as the number of minutes used (the independent variable) increases. The initial fee contributes to the y-intercept, while the slope captures the incremental cost per minute.
Understanding the equation and slope provides customers insights into the cafe's pricing model, aiding in budgeting decisions for computer usage. It allows individuals to predict costs based on the time they plan to spend at the internet cafe, enhancing transparency in pricing for both the cafe and its customers.