Final answer:
By setting up a system of equations, we find that Phyllis invested $29,328 at 9% simple interest and $20,000 at 6% simple interest, since each investment yielded the same amount of interest over one year.
Step-by-step explanation:
To determine how much Phyllis invested at each rate, we will use a system of equations to solve the problem. Let's assume x is the amount invested at 9% simple interest, and y is the amount invested at 6% simple interest. We know the total amount invested is $49,328, which gives us the equation:
x + y = 49,328
We also know that she earned the same interest from both investments. The simple interest for one year is calculated as principal × rate × time. As time is 1 year for both investments, and interest earned is equal, this gives us the second equation:
0.09x = 0.06y
After simplifying the second equation by dividing both sides by 0.03, we get:
3x = 2y
Now we have our system of equations:
- x + y = 49,328
- 3x = 2y
We can solve for y by multiplying equation (1) by 2:
2x + 2y = 98,656
Now subtract equation (2) from the new equation:
2x + 2y - 3x = 98,656 - 49,328
-x = -29,328
So, x = 29,328. Substituting x into equation (1), we get:
29,328 + y = 49,328
y = 49,328 - 29,328
y = 20,000
Therefore, Phyllis invested $29,328 at 9% and $20,000 at 6% simple interest.