$a, b, c$ are in $A.P. \Rightarrow 2b=a+c$
Now,
$e^{1/c}\times e^{1/a}=e^{\left(a+c\right)/ac}=e^{2b/ac}=\left(e^{b/ac}\right)^{2}$
$\therefore e^{1/c}, e^{b/ac}, e^{1/a}$ in $G.P.$ with common ratio
$=\frac{e^{b/ac}}{e^{1/c}}=e^{\left(b-a\right)/ac}=e^{d/\left(b-d\right)\left(b+d\right)}$
$=e^{d/\left(b^2-d^2\right)}$
[$\because a, b, c$ are in $A.P.$ with common difference $d \therefore b - a = c - b = d$]