" Given that "log_(p)x=alpha" and "log_(q)x=beta," then value of "log_(p/q)x" equals- "

If log_(p)x=alpha andlog _(q)x=beta, then the value of log_((p)/(q))x is

Given that (log)_p x=alpha\ a n d(log)_q x=beta,\ then value of equals- a. (alphabeta)/(beta-alpha) b. (beta-alpha)/(alphabeta) c. (alpha-beta)/(alphabeta) d. (alphabeta)/(alpha-beta)

If log_(p)x=a and log_(q)x=b prove that log_(p/q)x=(ab)/(a-b)

If log_(q)(xy)=3 and log_(q)(x^(2)y^(3))=4 , find the value of log_(q)x ,

If p >1 and q >1 are such that log(p+q)=logp+logq , then the value of log(p-1)+log(q-1) is equal to

If p >1 and q >1 are such that log(p+q)=logp+logq , then the value of log(p-1)+"log"(q-1) is equal to 0 (b) 1 (c) 2 (d) none of these

If p >1 and q >1 are such that log(p+q)=logp+logq , then the value of log(p-1)+log(q-1) is equal to (a) 0 (b) 1 (c) 2 (d) none of these

If p >1 and q >1 are such that log(p+q)=logp+logq , then the value of log(p-1)+log(q-1) is equal to (a) 0 (b) 1 (c) 2 (d) none of these

If log_(10) a= p and log_(10) b = q, then what is log_(10) (a^(p)b^(q)) equal to ?