If a is any real number and m;n are positive integers; then `a^p/ a^q = a^(p-q)`

If a is any real number and m;n are positive integers; then (a^p)^q = a^(pq) = (a^q)^p

If a is any real number and m;n are positive integers; then a^(p)xx a^(q)=a^(p+q)

If a is any real number and m;n are positive integers; then (i) (ab)^(p)=a^(p)b^(p) (ii) ((a)/(b))^(p)=(a^(p))/(b^(p));b!=0

If p,q,r are any real number, then

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

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:

Property 1 if (p)/(q) is a rational number and m is a non -zero integer then (p)/(q)=p xx(m)/(q)xx m

If p, q, r are real numbers then:

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