To provide responses, I need specific details about the linear equation, such as its slope, y-intercept, or any context related to the costs and hours for bike rental. However, I can provide a general template for how to fill in the responses based on common structures of linear equations, especially in the context of cost and time.
Assuming the equation of the line can be expressed as:
\[ y = mx + b \]
where \( y \) represents the cost, \( x \) represents the hours, \( m \) is the slope (cost per hour), and \( b \) is the y-intercept (fixed cost).
Here are the general responses based on the above assumption:
A) The linear equation written in slope-intercept form is
\[ y = mx + b \]
B) The cost of renting the bike for 2 hours is
\[ 2m + b \] (substituting 2 for \( x \))
C) (4, \( 4m + b \)) is on the linear equation.
D) The point (6, 50) represents that it costs $50 to rent the bike for 6 hours.
E) The y-intercept is located at \( (0, b) \) (write your answer as an ordered pair).
F) The y-intercept represents that at 0 hours, the cost of the bike rental is $b.
G) For $60, you can rent the bike for
\[ \frac{60 - b}{m} \] hours (solving the equation \( 60 = mx + b \)).
If you can provide specific values for \( m \) and \( b \) or additional information, I can give you precise answers!