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

The index form of rootp(q) is _____

If the value of lim_(x->0)( ((3/ x)+1)/((3/x)-1))^(1/x) can be expressed in the form of e^(p/q), where p and q are relative prime then find the value of (p+q) .

A Rational number (p)/(q) is said to be in the standard form if q is positive and the integers p and q have no common divisor other then 1

Express in the form of (p)/(q): 0.overline38 + 1.overline27 .

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

express 0.1bar25 in the form of p/q .

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