If `10^(log_a(log_b(log_c x)))=1 and 10^((log_b(log_c(log_a x)))=1` then, a is equal to

10^(log_p(log_q(log_r(x))))=1 and log_q(log_r(log_p(x)))=0 , then 'p' is equals

10^(log_p(log_q(log_r(x))))=1 and log_q(log_r(log_p(x)))=0 then 'p' equals

10^(log_(p)(log_(q)(log_(r)x)))=1 and log_(q)(log_(r)(log_(p)x))=0 then p equals to:

10^(log_(p)(log_(q)(log_(r)(x))))=1 and log_(q)(log_(r)(log_(p)(x)))=0 then 'p' equals

If a,b,c are distinct real number different from 1 such that (log_(b)a. log_(c)a-log_(a)a) + (log_(a)b.log_(c)b-log_(b)b) +(log_(a)c.log_(b)c-log_(c)C)=0 , then abc is equal to

If a,b,c are distinct real number different from 1 such that (log_(b)a. log_(c)a-log_(a)a) + (log_(a)b.log_(c)b.log_(c)b-log_(b)b) +(log_(a)c.log_(b)c-log_(c)C)=0 , then abc is equal to

1/(1+log_b a+log_b c)+1/(1+log_c a+log_c b)+1/(1+log_a b+log_a c)

If x=log_(k)b=log_(b)c=(1)/(2)log_(c)d, then log_(k)d is equal to

If log_(10)5+log_(10)(5x+1)=log_(10)(x+5)+1, then x is equal to

(1+log_(c)a)log_(a)x*log_(b)c=log_(b)x log_(a)x