The balance for each compounding period on $50,000 for 2 1/2 down arrow years at a rate of 1.3% for Annually is approximately $51516.67, Semiannually is approximately $51528.04, Quarterly is approximately $51538.39, Monthly is approximately $51545.41, Daily is approximately $51546.33, Hourly is approximately $51546.58, Continuously is approximately $51546.81,
To find the balance for each compounding period on $50,000 for 2 1/2 years at a rate of 1.3%, we can use the compound interest formula:
![\[A = P \left(1 + (r)/(n)\right)^(nt),\]](https://img.qammunity.org/2024/formulas/mathematics/college/9wlhsv5geflx3tpefks2zz8fqa0qwkim69.png)
where:
- A is the future value of the investment,
- P is the principal amount (initial investment),
- r is the annual interest rate (as a decimal),
- n is the number of times interest is compounded per year,
- t is the time the money is invested for in years.
a. Annually (compounded once per year):
![\[A = 50000 \left(1 + (0.013)/(1)\right)^(1 * 2.5) \approx \$51516.67.\]](https://img.qammunity.org/2024/formulas/mathematics/college/oiybgj5lqzszfubckfsfbj1ugprl97stgo.png)
b. Semiannually (compounded twice per year):
![\[A = 50000 \left(1 + (0.013)/(2)\right)^(2 * 2.5) \approx \$51528.04.\]](https://img.qammunity.org/2024/formulas/mathematics/college/fdmlza6md26zodb0avq27wvwa9so1pqxem.png)
c. Quarterly (compounded four times per year):
![\[A = 50000 \left(1 + (0.013)/(4)\right)^(4 * 2.5) \approx \$51538.39.\]](https://img.qammunity.org/2024/formulas/mathematics/college/bypturpk69xl4v50bw7di0o3e1a8cceqyn.png)
d. Monthly (compounded twelve times per year):
![\[A = 50000 \left(1 + (0.013)/(12)\right)^(12 * 2.5) \approx \$51545.41.\]](https://img.qammunity.org/2024/formulas/mathematics/college/40dvnmzb362i0flt9vxbx4h0rs6zcarm6b.png)
e. Daily (compounded 365 times per year):
![\[A = 50000 \left(1 + (0.013)/(365)\right)^(365 * 2.5) \approx \$51546.33.\]](https://img.qammunity.org/2024/formulas/mathematics/college/p3ynjbud7l55yflq67xstz87z3kqpmzfhx.png)
f. Hourly (compounded 8,760 times per year):
![\[A = 50000 \left(1 + (0.013)/(8760)\right)^(8760 * 2.5) \approx \$51546.58.\]](https://img.qammunity.org/2024/formulas/mathematics/college/6nwlltpng5g5q1qij4bx1aqutmi8tppqvz.png)
g. Continuously:
![\[A = 50000e^(0.013 * 2.5) \approx \$51546.81.\]](https://img.qammunity.org/2024/formulas/mathematics/college/ev09p7e6z56gsmfca997bp7bpt3210eiq9.png)
In summary, the balance for each compounding period for the given investment varies, with continuous compounding yielding the highest balance of approximately $51546.81.
The probable question may be:
Find the balance for each compounding period on $50,000 for 2 1/2 down arrow years at a rate of 1.3%.
a. Annually
b. Semiannually
c. Quarterly
d. Monthly
e. Daily
f. Hourly
g. Continuously