if (3,6) lies on the boundry of the inequality y is greater than f(x), the point that must be a solution to teh inequality is
a. (0,6)
b. (3,3)
c. (3,9)
d. (6,6)
6 years ago
Answered By Peter O
From the coordinates in graph sheet, it is clear that the only point that is greater than point (3,6) is (3,9). Points (0,6) and (6,6) lie on the boundary as point (3,6), while point (3,3) is below the boundary.
6 years ago
Answered By Peter O
From the coordinates in graph sheet, it is clear that the only point that is greater than point (3,6) is (3,9). Points (0,6) and (6,6) lie on the boundary as point (3,6), while point (3,3) is below the boundary.
So, C. (3,9) satisfied the Inequality y$>$>f(x)
Attached Graph: