$$AB\cap CD= Q\Rightarrow \triangle AQD \thicksim \triangle BCQ\Rightarrow $$

$$\Rightarrow \frac{QB}{QA}=\frac{QC}{QD}=\frac{BC}{AD}=\frac{1}{2}\Rightarrow \left\{ \begin{gathered} 2QB=AQ \\ 2QC = QD\\ \end{gathered} \right. \Rightarrow$$

$$\Rightarrow\left\{ \begin{gathered} QB=AB=x \\ QC =CD=y\\ \end{gathered} \right. $$

$$\triangle BDA: BD=z, \angle ABD=90^o\Rightarrow z^2+x^2=4$$

$$\triangle ODB: BD=z, \angle DBQ=90^o\Rightarrow z^2+x^2=4y^2\Rightarrow$$

$$\Rightarrow 4y^2=4\Rightarrow y=CD=1$$