r, s, t are prime numbers and p, q are natural numbers such that LCM of p, q is `r^(2)" "s^(4)" "t^(2)`, then the number of ordered pairs (p,q) is

If r,s,t are prime numbers and p,q are the positive integers such that LCM of p,q is r^(2)s^(4)t^(2) , then the number of ordered pairs (p,q) is:

lf r, s, t are prime numbers and p, q are the positive integers such that their LCM of p,q is r^2 t^4 s^2, then the numbers of ordered pair of (p, q) is (A) 252 (B) 254 (C) 225 (D) 224

If p,q&r are different prime numbers and a, bare natural numbers such that their LCM is p^(3)q^(3)r^(2) and HCF is pr,then number of possible ordered pairs (a,b) is

If p,q,r,s are natural numbers such that p>=q>=r If 2^(p)+2^(q)+2^(r)=2^(s) then

The number of ordered pairs (p,q) such that the LCM of p and q is 2520

If p,q and r are prime numbers such that r=q+2 and q=p+2 , then the number of triples of the form (p,q,r) is

If p, q, r are prime numbers such that p^(2)-q^(2)=r then which of the following options are correct ?