Respuesta :
Part 1:
The table showing the decreasing debt is shown as follows:
[tex]\begin{tabular} {|c|c|c|c|} Starting Balance&Interest Accrued&Payment&Closing Balance\\[1ex] \$1,853.42&\$22.39&\$400&\$1,475.81\\\$1,475.81&\$17.83&\$400&\$1,093.64\\\$1,093.64&\$13.21&\$200&\$906.85\\\$906.85&\$10.96&\$200&\$717.81\\\$717.81&\$8.67&\$200&\$526.48\\\$526.48&\$6.36&\$200&\$332.84\\\$332.84&\$4.02&\$200&\$136.86\\\$136.86&\$1.65&\$138.51&- \end{tabular}[/tex]
The column for interest accrued is obtained by the folmular
[tex]I=P(1+0.155)^{\frac{1}{12}}[/tex]
where P is the month's starting balance.
Part 2:
From the table, the last payment is $138.51
Part 3:
The total amount paid by the time the credit card is payed of is the summation of the "payment" column of the table.
Thus, the total amount is given by:
[tex]Payment\ total=2(400)+5(200)+138.51=\$1,938.51[/tex]
Part 4:
The debt ratio is given by
[tex]Debt\ ratio= \frac{debt}{limit} = \frac{1,853.42}{3,000} \approx0.62[/tex]
The table showing the decreasing debt is shown as follows:
[tex]\begin{tabular} {|c|c|c|c|} Starting Balance&Interest Accrued&Payment&Closing Balance\\[1ex] \$1,853.42&\$22.39&\$400&\$1,475.81\\\$1,475.81&\$17.83&\$400&\$1,093.64\\\$1,093.64&\$13.21&\$200&\$906.85\\\$906.85&\$10.96&\$200&\$717.81\\\$717.81&\$8.67&\$200&\$526.48\\\$526.48&\$6.36&\$200&\$332.84\\\$332.84&\$4.02&\$200&\$136.86\\\$136.86&\$1.65&\$138.51&- \end{tabular}[/tex]
The column for interest accrued is obtained by the folmular
[tex]I=P(1+0.155)^{\frac{1}{12}}[/tex]
where P is the month's starting balance.
Part 2:
From the table, the last payment is $138.51
Part 3:
The total amount paid by the time the credit card is payed of is the summation of the "payment" column of the table.
Thus, the total amount is given by:
[tex]Payment\ total=2(400)+5(200)+138.51=\$1,938.51[/tex]
Part 4:
The debt ratio is given by
[tex]Debt\ ratio= \frac{debt}{limit} = \frac{1,853.42}{3,000} \approx0.62[/tex]
The table of decreasing debt can be form by using the interest formula and according to that table the last payment is $138.51, total amount paid is $1938.51 and the debt ratio is 0.62.
Given :
- Owe $1,853.42 on a credit card with a limit of $3,000.00 at a rate of 15.5% APR.
- Pay $400.00 the first 2 months and then $200.00 until the bill is paid off.
1).
The interest can be find out by using the below formula:
[tex]\rm I = P(1+0.155)^{\frac{1}{12}}[/tex]
The table showing the decreasing debt is given below:
Balance Interest Payment Closing Balance
$1853.42 $22.39 $400 $1475.81
$1475.81 $17.83 $400 $1093.64
$1093.64 $13.21 $200 $906.85
$906.85 $10.96 $200 $717.81
$717.81 $8.67 $200 $526.48
$526.48 $6.36 $200 $332.84
$332.84 $4.02 $200 $136.86
$136.86 $1.65 $138.51 --
2). The last payment = $138.51
3). Total Amount Paid = 400 + 400 + 200 + 200 + 200 + 200 + 200 + 138.51
= 2(400) + 5(200) + 138.51
= $1938.51
4).
[tex]\rm Debt\;Ratio = \dfrac{Debt}{Limit}[/tex]
[tex]\rm Debt \; Ratio = \dfrac{1853.42}{3000} = 0.62[/tex]
Debt Ratio = 0.62
For more information, refer the link given below:
https://brainly.com/question/13612376
