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!