To provide accurate answers to each of the prompts, we need more context, specifically about the linear equation and its parameters related to bike rental costs. However, we can create a hypothetical scenario to illustrate how one might answer these questions based on a linear relationship.
Let's assume the linear equation that represents the cost to rent a bike is
y = 10x,
where y is the total cost in dollars and x is the number of hours rented. This equation tells us that it costs $10 per hour to rent the bike.
Now, let's answer the prompts based on this hypothetical equation:
A) The linear equation written in slope-intercept form is
y = 10x.
B) The cost of renting the bike for 2 hours is $
20 (since 10 * 2 = 20).
C) (4, ) is on the linear equation.
(4, 40) (because 10 * 4 = 40).
D) The point (6,50) represents that it costs $
50 to rent the bike for
5 hours (since 10 * 5 = 50, the y-value should correspond to renting for 5 hours).
E) The y-intercept is located at
(0, 0) (when x = 0, y = 10*0 = 0).
F) The y-intercept represents that at
0 hours, the cost of the bike rental is $
0.
G) For $60, you can rent the bike for
6 hours (since 60 / 10 = 6).
These answers are based on the assumed linear relationship and would change if you had a different equation or context for bike rentals.