For `x >0,l e th(x)={1/q ,ifx=p/q and 0,if x is i r r a t ion a l` where `p ,q >0` are relatively prime integers. Then prove that `f(x)` is continuous for all irrational values of `xdot`

For let h(x)={1/q if x=p/q and 0 if x is irrational where p & q > 0 are relatively prime integers 0 then which one does not hold good?

If p,q in N and 0.1bar2=p/q where p and q are relatively prime then which of the following is incorrect?

If 2009 = p^a x q^b where p and q are prime numbers, then the value of (p+q) is

lim _(xtooo)3/x [(x)/(4)]=p/q where [.] denotes greatest integer function), then p+q (where p,q are relative prime) is:

The positive integers p ,q ,&r are all primes if p^2-q^2=r , then find all possible values of r

If 3+4i is a root of equation x^(2)+px+q=0 where p, q in R then

If f(x)={e^(1/x) ,1 ifx!=0ifx=0 Find whether f is continuous at x=0.

Let A= [{:p q q p:}] such that det(A)=r where p,q,r all prime number, then trace of A is equal to

"I f"f(x)={x^3-6x^2; ifxi sr a t ion a l-11 x+6;ifxi si r r a t ion a l"t h e n" f(x) is continuous for all real x f(x) is continuous at x=1,2,3. f(x) is discontinuous at infinite points f(x) discontinuous for all real xdot

If all the roots of x^3 + px + q = 0 p,q in R,q != 0 are real, then