Use the following compound interest formula to complete the problem. 2007-11-01-00-00_files/i0110000.jpg Victor has a credit card with an APR of 13.66%, compounded monthly. He currently owes a balance of $1,349.34. Assuming that Victor makes no purchases or payments, how much will he owe after one year, to the nearest cent? a. $1,349.34 b. $1,533.66 c. $1,545.65 d. $1,364.70

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Aliwohaish12 Aliwohaish12 · Answer 1 · 2017-05-17T19:36:02+02:00

A=p (1+r/k)^kt
A=1,349.34×(1+0.1366÷12)^(12×1)
A=1,545.65

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PhantomWisdom PhantomWisdom · Answer 2 · 2019-01-03T12:27:26+01:00

Answer:

The correct answer is C. $ 1545.65

Step-by-step explanation:

Principle = $ 1349.34

Rate = 13.66 %

t = No. of times the interest is compounded in one year

⇒ t = 12 ( since it is given that the interest is compounded monthly so the interest is compounded 12 times in one year)

n = 1 year

[tex]Amount=Principle\cdot (1+\frac{rate}{n})^{n\cdot t}[/tex]

where n = no. of years and t = No. of times the interest is compounded in one year

[tex]\Rightarrow Amount=1349.34\cdot (1+\frac{13.66}{100\cdot 12})^{12\cdot 1}[/tex]

= 1349.34 × 1.15

= $ 1545.65

So, the correct answer is C