Use the example above and determine the fraction of total interest paid after the seventh month of a 12-month loan:

The numerator is: [tex]\{(n+11)+(n+10)+(n+9)+(n+8)+(n+7)+(n+6)+(n+5)\} = \square[/tex]

The denominator is: [tex]\{(n)+(n+1)+\ldots+(n+11)\} = \square[/tex]

Therefore, the fraction is [tex]\frac{\text{numerator}}{\text{denominator}}[/tex] (to the nearest tenth) [tex]= \square[/tex] %.



Answer :

Let's break down the problem step-by-step to determine the fraction of total interest paid after the seventh month of a 12-month loan.

Given:
- The numerator is the sum of the interest paid from the 5th month to the 11th month.
- The denominator is the sum of the interest paid from the 0th month to the 11th month.

1. Calculate the Numerator:

The numerator is given by the sum of interest payments from the 5th month to the 11th month:
[tex]\[ \{(n+11) + (n+10) + (n+9) + (n+8) + (n+7) + (n+6) + (n+5)\} \][/tex]
We have already determined that the numerator is:
[tex]\[ 63 \][/tex]

2. Calculate the Denominator:

The denominator is the sum of interest payments from the 0th month to the 11th month:
[tex]\[ (n) + (n+1) + (n+2) + \ldots + (n+11) \][/tex]
We have already determined that the denominator is:
[tex]\[ 78 \][/tex]

3. Determine the Fraction:

We need to find the fraction of the total interest paid, which is the ratio of the numerator to the denominator, and then express this fraction as a percentage to the nearest tenth:
[tex]\[ \text{Fraction} = \left( \frac{\text{Numerator}}{\text{Denominator}} \right) \times 100 \][/tex]
Plugging in the values we have:
[tex]\[ \text{Fraction} = \left( \frac{63}{78} \right) \times 100 = 80.8\% \][/tex]

Therefore, the fraction of total interest paid after the seventh month of the 12-month loan, rounded to the nearest tenth, is [tex]\(80.8\%\)[/tex].