A be the set of two positive integers and `f: A -> Z^+` (set of positive integer) defined as `f(n)= p` where p is the largest prime factor of n. If the range of `f` is `{3}`, find A.

A be the set of two positive integers and f:A rarr Z^(+)( set of positive integer) defined as f(n)=p where p is the largest prime factor of n.If the range of f is {3}, find A.

Let A be a set of two positive integers and a function f:A to Z^(+) is defined as f(n)=p , where p is largest prime factor of n. if the range of f is {3} , then find A. Can A exist uniquely?

If A={9,10,11,12,13} and a function f:A to N is defined as f(n) =largest prime factor of n. If the range of f is B, then find B.

Let A={9,10,11,12,13} and let f: A to N be defined by f(n)= the highest prime factor of n. Find the range of f.

Let A={9,10,11,12,13} and let f: A to N be defined by f(n)= the highest prime factor of n. Find the range of f.

Let A={9,10,11,12,13} and let f: A to N be defined by f(n)= the highest prime factor of n. Find the range of f.

Let A={9,10,11,12,13} and let f: A to N be defined by f(n)= the highest prime factor of n. Find the range of f.

Let A={9,10,11,12,13} and let f: A to N be defined by f(n)= the highest prime factor of n. Find the range of f.

Let A = {9,10,11,12,13} and let f : A rarr N be defined by f (n) = the highest prime factor of n. find the range of f.

Let A = {9, 10 , 11 , 12 , 13} and let f : A ->N be defined by f(n) = the highest prime factor of n. Find the range of f.