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Question - According to the rule of 72, which statement is true? An investment of $3,100 will double in 12 years at a compound interest rate of 5%. An investment of $9,000 will double in 10 years at a compound interest rate of 7%. An investment of $4,500 will double in 8 years at a compound interest rate of 9%. An investment of $3,000 will double in 4 years at a compound interest rate of 12%
Answer - An investment of $3,000 will double in 4 years at a compound interest rate of 12%
0.012 / 3000 = 0.00004 = 4
Answer:
Statement 3 is true
Step-by-step explanation:
By using rule of 72, we can simply determine how long an investment will take to double.
By using the formula : [tex]\frac{72}{r}[/tex] ( r = rate of interest )
There are 4 statements, by using rule of 72 we find out which statement is true.
Statement (1):
Investment of $3,100 will double in 12 years at a compound interest rate of 5%.
We use the formula [tex]\frac{72}{r}[/tex] = [tex]\frac{72}{5}[/tex] = 14.4 years
It will take 14.4 years to double. This statement is not true.
Statement (2):
Investment of $9000 will double in 10 years at a compound interest rate of 7%.
[tex]\frac{72}{7}[/tex] = 10.28 years
It will take 10.28 years, so this statement is not true.
Statement (3):
Investment of $4,500 will double in 8 years at a compound interest rate of 9%.
[tex]\frac{72}{9}[/tex] = 8 years
It will take 8 years to double. This statement is true.
Statement (4):
Investment of $3,000 will double in 4 years at a compound interest rate of 12%
[tex]\frac{72}{12}[/tex] = 6 years
It will take 6 years to double, so this statement is not true.
Therefore, Statement 3 is true.
