`1.bar27` in the form `(q)/(p)` is equal to

1.bar(27) in the form (p)/(q) is equal to

1.27 in the form (p)/(q) is equal to (127)/(100) (b) (14)/(11) (c) (73)/(100)( d ) (11)/(14)

Express 3.bar(2) in the form (p)/(q) where p and q are integers and q!=0

If p^(2)+q^(2)=1,p,q in R, then (1+p+iq)/(1+p-iq) is equal to

Express 0.bar(6)" in the form of (p)/(q) , where p & q are integers and q!=0"

Using progressions express the recurring decimal 2*bar(123) in the form of (p)/(q) , where p and q are integers.

The number 1.27 in the form (p)/(q), where p and q are integers and q!=0, is (14)/(9) (b) (14)/(11) (c) (14)/(13) (d) (14)/(15)

The value of 0.bar2 in the fomr (p)/(q) where p and q are integers and q ne 0 , is

The index form of q^((1)/(p)) is