Let $X_n$ in $S'$ and $\mu_n$, $\mu$ in $M(S')$.  $S'$ is the space of tempered distributions. I'm looking for a reference that says if  $< f, X_n >$ converges in distribution to  $< f,X>$ for every $f$ in $S$, then $\mu_n$ weakly converges to $\mu$ where $\mu$ is the measure for the random variable $X$.  Is anyone aware of such a result?

Also, same question for $X_n$ in $D'$ and $\mu_n$, $\mu$ in $M(D')$.  

Thank you in advance for any insight, it's very much appreciated.