Directions:

Answer the questions below.
You will be able to check your answers by clicking on "Check Answers" at the bottom.
You can make corrections before submitting this Sample Work.
The linear equation represented on the coordinate plane represents the cost of renting a bike per hour.

(1 point)
A) The linear equation written in slope-intercept form is

B) The cost of renting the bike for 2 hours is $

C) (4,
) is on the linear equation.

D) The point (6,50) represents that it costs $
to rent the bike for
hours

E) The y-intercept is located at
(write your answer as an ordered pair)

F) The y-intercept represents that at
hour(s), the cost of the bike rental is $

G) For $60, you can rent the bike for
hours

1 answer

To answer your questions, I will assume a linear equation that relates cost (y) to hours (x). A common example of such an equation is \( y = mx + b \), where \( m \) is the slope and \( b \) is the y-intercept. Let's assume a hypothetical linear equation, for instance \( y = 10x \), meaning that the cost is $10 per hour.

Based on this assumption, here are the answers:

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 \( 10 \times 2 = 20 \))

C) (4, __) is on the linear equation. To find y when \( x = 4 \): (4, 40) (since \( 10 \times 4 = 40 \))

D) The point (6,50) represents that it costs $: $60 to rent the bike for: 6 hours (since it should be \( y = 10x \) where \( y = 10 \times 6 = 60 \), not 50)

E) The y-intercept is located at: (0, 0) (if we are assuming the equation \( y = 10x \))

F) The y-intercept represents that at: 0 hour(s), the cost of the bike rental is $0

G) For $60, you can rent the bike for: 6 hours (since \( 60 \div 10 = 6 \))

Feel free to make any necessary corrections based on the actual equation provided if it's different from the assumed one above!