Firts, Let [tex]x[/tex] be the repeated decimal that we are trying to convert , so [tex]x=10.9090909090[/tex] equation (1)
Next, lets find how many digits are repeating:
It is pretty cleat that 90 is repeating, and 90 has two digits. So we are going to multiply our equation by 100 to move the decimal point two places:
[tex]100x=1090.90909090[/tex] (2)
Subtract equation (1) from equation (2):
[tex]100x-x=1090.90909090-10.90909090[/tex]
[tex]99x=1080[/tex]
Solve for [tex]x[/tex]
[tex]x= \frac{1080}{99} [/tex]
We can conclude that 10.9090909091... expressed as a rational number, in the form pq where p and q are positive integers with no common factors, is [tex] \frac{1080}{99} [/tex].
