Answer:
The equations are missing but we can solve the problem from the given information
The equation  [tex]P(1+\frac{0.193}{12})^{12}+84=P(1+\frac{0.246}{12})^{12}[/tex]  can be used to solve for the principal P for which the cards offer the same deal over the course of a year
Step-by-step explanation:
The formula of the compounded interest is [tex]A=P(1 + \frac{r}{n})^{nt}[/tex] , where
Card A:
∵ Credit card A has an APR of 19.3% and an annual fee of $84
∴ r = 19.3% = 19.3 ÷ 100 = 0.193
∴ Annual fee = 84
∵ Interest is compounded monthly for a year
∴ n = 12 and t = 1
- Substitute the values of r, n and t in the formula above
∴ [tex]A=P(1 + \frac{0.193}{12})^{12(1)}[/tex]
- Add the value of the annual fee
∴ [tex]A=P(1 + \frac{0.193}{12})^{12}+84[/tex]
Card B:
∵ Credit card B has an APR of 24.6% and no annual fee
∴ r = 24.6% = 24.6 ÷ 100 = 0.246
∴ Annual fee = 0
∵ Interest is compounded monthly for a year
∴ n = 12 and t = 1
- Substitute the values of r, n and t in the formula above
∴ [tex]A=P(1 + \frac{0.246}{12})^{12(1)}[/tex]
∴ [tex]A=P(1 + \frac{0.246}{12})^{12}[/tex]
- Equate The equations of cards A and B
∴ [tex]P(1+\frac{0.193}{12})^{12}+84=P(1+\frac{0.246}{12})^{12}[/tex]
The equation  [tex]P(1+\frac{0.193}{12})^{12}+84=P(1+\frac{0.246}{12})^{12}[/tex]  can be used to solve for the principal P for which the cards offer the same deal over the course of a year
