A nursing student works at a doctor's office for $15 per hour and tutors other students for $25 per hour.

Let x be the number of hours the student works at the doctor's office and y be the number of hours the student tutors.

The system of inequalities representing the given constraints is:

x + y ≤ 20 (cannot work more than 20 hours each week)
15x + 25y ≥ 375 (wants to earn at least $375 each week)

To find how many hours the student should work at the doctor's office each week, we can use the fact that the student wants to work at the doctor's office for as many hours as possible. This means that the student should work at the doctor's office for all the hours remaining after tutoring for the minimum amount needed to earn $375.

Let's find the minimum amount of hours the student needs to tutor each week to earn $375. Using the second inequality:

15x + 25y ≥ 375
25y ≥ 375 - 15x
y ≥ (375 - 15x)/25

Since y has to be a whole number, the smallest value of y that satisfies this inequality is y = 15 (when x = 0). Therefore, the student needs to tutor for at least 15 hours each week to earn $375.

The maximum number of hours the student can work at the doctor's office is then:

x = 20 - y
x = 20 - 15
x = 5

So the student should work 5 hours at the doctor's office each week and tutor for 15 hours to earn at least $375.