Which point on the axis satisfies the inequality y<x
Any point on the y-axis satisfies the inequality y < x.
To find the point on the axis that satisfies the inequality y < x, we need to consider that the axis is the line where the x-coordinate is zero.
Since the x-coordinate is zero, we can substitute x = 0 into the inequality: y < 0.
Therefore, any point on the axis where the y-coordinate is negative satisfies the given inequality.
To find the point on the axis that satisfies the inequality y < x, we need to look for points where the y-coordinate is less than the x-coordinate.
Since we are looking for a point on the axis, the y-coordinate will be zero. Therefore, we need to find the x-coordinate where y = 0 and satisfies y < x.
Let's solve for y = 0 in the inequality y < x:
0 < x
This means that any value of x greater than 0 would satisfy the inequality because 0 is not included.
Therefore, the point on the axis that satisfies the inequality y < x is any point where y = 0 and x is greater than 0. In other words, any point on the positive x-axis (to the right of the origin) would satisfy the given inequality.