Owen would like to make a small income as an artist. Owen asked his friend Emily for advice about what

Let:
x = number of pastels made
y = number of watercolors made

The profit made from pastels is $40 per pastel, so the profit made from x pastels is 40x.
The profit made from watercolors is $100 per watercolor, so the profit made from y watercolors is 100y.

The material cost for each pastel is $5, so the cost for x pastels is 5x.
The material cost for each watercolor is $15, so the cost for y watercolors is 15y.

Based on the given information:
1. Owen wants to determine a reasonable profit for the month's work, so let's say he wants to earn a profit of P dollars.
2. Owen has $180 to spend on materials.
3. Owen can make at most 16 pictures.

The inequalities to represent this situation are as follows:
1. The profit made should be at least P dollars: 40x + 100y ≥ P
2. The cost of materials should not exceed $180: 5x + 15y ≤ 180
3. Owen can make at most 16 pictures: x + y ≤ 16

Additionally, there is a non-negative constraint:
x ≥ 0 (the number of pastels cannot be negative)
y ≥ 0 (the number of watercolors cannot be negative)

The system of inequalities is:
40x + 100y ≥ P
5x + 15y ≤ 180
x + y ≤ 16
x ≥ 0
y ≥ 0

b. The optimization equation is to maximize the profit made, which can be represented as the objective function:
Maximize Z = 40x + 100y