A standard trick for finding the rational form of a repeated decimal:
[tex]x=0.34563456\ldots=0.\overline{3456}[/tex]
Multiply by an appropriate power of 10 to move one "cycle" of the repeated pattern to the left side of the decimal point:
[tex]\implies10^4x=3456.34563456\ldots=3456.\overline{3456}[/tex]
Now subtract [tex]x[/tex] from this number and we lose the fractional part:
[tex]\implies10^4x-x=9999x=3456[/tex]
And from here you can solve for [tex]x[/tex].
[tex]\implies x=\dfrac{3456}{9999}=\dfrac{384}{1111}[/tex]
