To find out how much Manny’s investment will be worth in 20 years with continuous compounding, we can use the formula:
\[ A = Pe^{rt} \]
Where:
- \( P = 100 \) (the principal)
- \( r = 0.02 \) (the annual interest rate as a decimal)
- \( t = 20 \) (the time in years)
- \( e \) is the base of the natural logarithm, approximately equal to 2.71828
Plugging in the values:
\[ A = 100 \cdot e^{0.02 \cdot 20} \] \[ A = 100 \cdot e^{0.4} \]
Now, calculate \( e^{0.4} \):
\[ e^{0.4} \approx 1.49182 \]
Now substitute back into the equation:
\[ A \approx 100 \cdot 1.49182 \approx 149.18 \]
Rounding to the nearest dollar, Manny’s investment will be worth approximately:
\[ \boxed{149} \]
So, the correct response is $149.
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