Final answer:
A point that satisfies the inequality y < (x - 1) - 3 is one with a y-value below the line y = (x - 1) - 3 on a graph. For example, the point (2, -7) satisfies the inequality as its y-value is less than the y-value of the line for x=2.
Step-by-step explanation:
The question concerns the determination of points that satisfy a given inequality. The inequality provided is y < (x - 1) - 3, which represents a line with a slope of 1 (rise/run = 1/1) and a y-intercept at (0, -4). To identify a point that satisfies this inequality, one needs to find a point whose y-value is less than the y-value on this line at the corresponding x-value.
For example, if we consider the point (2, -7), we see that for x=2, the line equation gives us y = (2-1)-3 = -2. Since -7 is less than -2, the point (2, -7) satisfies the inequality y < (x - 1) - 3.
It's important to note that when graphing inequalities, the region that represents the solution to an inequality is shaded to indicate all the points that satisfy the inequality. In this case, it would be the area below the line y = (x - 1) - 3.