A limit of a uniformly convergent sequence of smooth functions
Solution 1:
Yes. Approximate by polynomials $p_k(x)$ on each interval $[k,k+2]$, and put them together using a smooth partition of unity: if $\phi(x)$ is a smooth function with $\phi(x) = 0$ for $x \le 0$, $\phi(x) = 1$ for $x \ge 1$, and $0 \le \phi(x) \le 1$ for $0 \le x \le 1$, take $g(x) = \phi(x-k) p_k(x) + (1 - \phi(x-k)) p_{k-1}(x)$ for $k \le x \le k+1$.