hard inequality with exponential

65 Views Asked by user504516 At 01 Apr 2026 - 3:49

If $c > b > a > 0$, how can I prove that $ \sum_{cyclic}^{} (e^{a-b}+e^{b-a}) \ge 2a-2c +3+ \sum_{cyclic}^{} (\frac {b}{a})^{\sqrt{ab}}$