evaluate y = e^x + 1 for the following values of x. round to the nearest thousandth. x=-2,y= x = 1,y= x =…

evaluate y = e^x + 1 for the following values of x. round to the nearest thousandth. x=-2,y= x = 1,y= x = 2,y= done
Answer
Explanation:
Step1: Substitute $x = - 2$
$y=e^{-2}+1$. Since $e^{-2}=\frac{1}{e^{2}}\approx\frac{1}{7.389}\approx0.135$, then $y = 0.135 + 1=1.135$.
Step2: Substitute $x = 1$
$y=e^{1}+1$. Since $e\approx2.718$, then $y=2.718 + 1=3.718$.
Step3: Substitute $x = 2$
$y=e^{2}+1$. Since $e^{2}\approx7.389$, then $y=7.389 + 1=8.389$.
Answer:
When $x=-2,y\approx1.135$; when $x = 1,y\approx3.718$; when $x = 2,y\approx8.389$