if $a , b$ are positive numbers such that $a + b = 1$ prove that for all $x$ $ae^{\frac{x}{a}} + be^{-\frac{x}{b}} \le e^{\frac{x^2}{8a^2b^2}}$ [closed]

Question

I am working to prove the following inequality, however I have not reached to any definite solutions. I would be so thankful if anyone could help me prove this inequality or at least give me some hints and ideas to prove this inequality:

if $a , b$ are positive numbers such that $a + b = 1$ prove that for all $x$

$ae^{\frac{x}{a}} + be^{-\frac{x}{b}} \le e^{\frac{x^2}{8a^2b^2}}$

one of my friends told me to use the Taylor series of the two exponents on the left side of the inequality but I did not reach to the proper solution. Moreover, I chose to use the weighted arithmetic mean of the two exponents on the left side of the inequality but I did not reach to the solution either!!!

Please help me