It seems like you have several questions related to a linear equation, possibly about the cost of renting a bike. I will help you fill in the blanks based on typical characteristics of linear equations related to rental costs.

Let's assume the equation of the line is in the form of \( y = mx + b \), where \( m \) is the slope and \( b \) is the y-intercept.

1. The linear equation written in slope-intercept form is \( y = mx + b \). To complete this, you'll need to provide the specific slope (m) and y-intercept (b) based on the context of the bike rental.

2. The cost of renting the bike for 2 hours is $[You will need to provide the cost, which can be calculated based on the linear equation, if known].

3. (4, y) is on the linear equation. To find 'y', substitute \( x = 4 \) into the linear equation \( y = mx + b \).

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

5. The y-intercept is located at (0, b) (you will need to provide the specific value of b).

6. The y-intercept represents that at hour(s) [0 hours], the cost of the bike rental is $[b, the y-intercept value].

7. For $60, you can rent the bike for hours [To find this, you can set the equation equal to 60 and solve for x]:
   $$ 60 = mx + b $$ Solve for \( x \) based on the slope \( m \) and intercept \( b \).

To provide exact answers, please give specific values for the slope, intercept, or additional information about the bike rental costs.