how much should be invested now at an interes...

# Explanation: ## Step1: Recall continuous - compounding formula The formula for continuous compounding is $A = Pe^{rt}$, where $A$ is the final amount, $P$ is the principal amount (initial investment), $r$ is the annual interest rate (in decimal form), and $t$ is the time in years. We need to solve for $P$, so we can rewrite the formula as $P=\frac{A}{e^{rt}}$. ## Step2: Identify the values of $A$, $r$, and $t$ We are given that $A = 2000$, $r=0.05$ (since $5\%=0.05$), and $t = 7$. ## Step3: Substitute the values into the formula $P=\frac{2000}{e^{0.05\times7}}=\frac{2000}{e^{0.35}}$. ## Step4: Calculate the value of $P$ Using a calculator, $e^{0.35}\approx1.419067$, so $P=\frac{2000}{1.419067}\approx1409.30$. # Answer: $1409.30$