We prove that for any prime $pgeq 3$ the minimal exponential growth rate of the Baumslag-Solitar group $BS(1,p)$ and the lamplighter group $mathcal{L}_p=(mathbb{Z}/pmathbb{Z})wr mathbb{Z}$ are equal. We also show that for $p=2$ this claim is not true
and the growth rate of $BS(1,2)$ is equal to the positive root of $x^3-x^2-2$, whilst the one of the lamplighter group $mathcal{L}_2$ is equal to the golden ratio $(1+sqrt5)/2$. The latter value also serves to show that the lower bound of A.Mann from [Mann, Journal of Algebra 326, no. 1 (2011) 208--217] for the growth rates of non-semidirect HNN extensions is optimal.
We prove that there is a gap between $sqrt{2}$ and $(1+sqrt{5})/2$ for the exponential growth rate of free products $G=A*B$ not isomorphic to the infinite dihedral group. For amalgamated products $G=A*_C B$ with $([A:C]-1)([B:C]-1)geq2$, we show that
lower exponential growth rate than $sqrt{2}$ can be achieved by proving that the exponential growth rate of the amalgamated product $mathrm{PGL}(2,mathbb{Z})cong (C_2times C_2) *_{C_2} D_6$ is equal to the unique positive root of the polynomial $z^3-z-1$. This answers two questions by Avinoam Mann [The growth of free products, Journal of Algebra 326, no. 1 (2011) 208--217].
