Draw the graph n < 4, with the constraint n > 0.
o---------------o
0 ------------- 4 ------------------oo
0---4
To draw the graph representing the inequality n < 4 with the additional constraint n > 0, we can use a number line.
First, find the common range where the two conditions n < 4 and n > 0 overlap. In this case, the overlapping range would be from 1 to 3, inclusive. This is because n < 4 includes all numbers less than 4, but not 4 itself. The constraint n > 0 includes all positive numbers, but not 0.
Now, draw a number line starting from 0 and going to at least 4, or even further if needed. Mark the point 1 and label it. Then, mark the point 3 and label it. These are the limiting values determined by both conditions.
Next, draw open circles at the marks for 1 and 3. Open circles indicate that these numbers are not included in the solution.
Finally, draw a line segment between the circles to indicate that all values between 1 and 3 are solutions to the given inequality. Ensure that the line segment is drawn with an arrow on both ends to show that the solution extends indefinitely in both directions.
The resulting graph will have an open circle at 1, an open circle at 3, and a line segment connecting them with arrows on both ends. This represents the solution to the inequality n < 4 with the additional constraint n > 0.