Question

Determine the equation of the line in the following graph:

Answer 1

yes it is a uniform graph as the work on X is in direct variation with Y.
uniform distribution is a continuous distribution that assigns only positive probabilities within a specified interval (a, b) — that is, all values between a and b. (a and b are two constants; they may be negative or positive.) ... As a result, the graph that illustrates this distribution is a rectangle.

Answer 2

Solution:

To find the equation of the line as shown in the graph,first take at least two points from where lines passes.

one point is (-3,-3)

other is (3,8)

Equation of the line passing through two points (x1,y1) and (x2,y2)

$y - y1 = \frac{y2 - y1}{x2 - x1} (x - x1) \\ \\ y - ( - 3) = \frac{8 - ( - 3)}{ - 3 - 3} (x - ( - 3) \\ \\ y + 3 = \frac{5}{ - 6} (x + 3) \\ \\ - 6y - 18 = 5x + 15 \\ \\ - 6y - 5x - 18 - 15 = 0 \\ \\ 5x + 6y + 33 = 0$

is the equation of the line.