Answer:
Option (B) is correct i.e the amount of interest accrued on the second account is double the amount of interest accrued on the first account.
Step-by-step explanation:
As given
The amount of simple interest accrued on a sum of money varies jointly with the amount of money, the interest rate, and the time the money is invested.
Thus
Formula for simple interest .
[tex]Simple\ interest = \frac{Principle\times Rate\times Time }{100}[/tex]
As given
A sum of money is invested at 4% for 3 years and accrues $168 in interest.
Put in the above
[tex]168 = \frac{Principle\times 4\times 3}{100}[/tex]
[tex]Principle = \frac{16800}{12}[/tex]
Principle = $1400
As given
The same sum of money is invested in a second account at 6% for 4 years.
Put in the formula
[tex]Simple\ interest = \frac{1400\times 6\times 4}{100}[/tex]
[tex]Simple\ interest = \frac{33600}{100}[/tex]
Simple interest = $336
Thus Option (B) is correct i.e the amount of interest accrued on the second account is double the amount of interest accrued on the first account.
