you build an annuity by investing ( p ) dollars every month at interest rate ( r ), compounded monthly. find the amount ( a ) accrued after ( n ) months using the formula a = pleft \frac{(1 + r/12)^n - 1}{r/12}
ight where ( r ) is in decimal form. (round your answer to two decimal places.) ( p = $116, r = 0.09, n = 52 ) months ( a = $ ) enter a number resources read it watch it submit answer

Question

you build an annuity by investing ( p ) dollars every month at interest rate ( r ), compounded monthly. find the amount ( a ) accrued after ( n ) months using the formula  a = pleft \frac{(1 + r/12)^n - 1}{r/12}
ight  where ( r ) is in decimal form. (round your answer to two decimal places.) ( p = $116, r = 0.09, n = 52 ) months ( a = $ ) enter a number resources read it watch it submit answer

Accepted Answer

# Explanation:
## Step1: Identify given values
$P=116$, $r=0.09$, $n=52$
## Step2: Calculate monthly rate
$\frac{r}{12} = \frac{0.09}{12} = 0.0075$
## Step3: Calculate $(1+\frac{r}{12})^n$
$(1+0.0075)^{52} \approx 1.47087$
## Step4: Subtract 1 from the result
$1.47087 - 1 = 0.47087$
## Step5: Divide by monthly rate
$\frac{0.47087}{0.0075} \approx 62.7827$
## Step6: Multiply by $P$
$A = 116 	imes 62.7827 \approx 7282.79$
# Answer:
$\$7282.79$

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QUESTION IMAGE

Question

Explanation:

Step1: Identify given values

Step2: Calculate monthly rate

Step3: Calculate $(1+\frac{r}{12})^n$

Step4: Subtract 1 from the result

Step5: Divide by monthly rate

Step6: Multiply by $P$

Answer: