To determine if the point (2, 3) satisfies the inequality \( y < x + 4 \), we can substitute the coordinates of the point into the inequality.
The inequality is: \[ y < x + 4 \]
Substituting \( x = 2 \) and \( y = 3 \): \[ 3 < 2 + 4 \]
Calculating the right side: \[ 3 < 6 \]
This statement is true. Therefore, the point (2, 3) does satisfy the inequality \( y < x + 4 \).