If $h:[a,b]\to R$ is continuous and one-to-one, then $h$ is monotone.
Proof: The image of the connected set $\{(s,t): a \le s < t \le b\}$ under the map $h(t)-h(s)$ is a connected subset of $R\setminus\{0\}$.
If $h:[a,b]\to R$ is continuous and one-to-one, then $h$ is monotone.
Proof: The image of the connected set $\{(s,t): a \le s < t \le b\}$ under the map $h(t)-h(s)$ is a connected subset of $R\setminus\{0\}$.