Compute the following a^(((log)b((log)a ...

Compute the following `a^(((log)_b((log)_a N))/((log)_b\ \ a))`

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

Compute the following a^(((log)_b((log)_a N))/((log)_b(log a)))

The value of a^((log_b(log_b N))/(log_b a)), is

Prove that ((log)_a N)/((log)_(a b)N)=1+(log)_a b

Prove that ((log)_a N)/((log)_(a b)N)=1+(log)_a b

If a ,b ,c ,d in R^+-{1}, then the minimum value of (log)_d a+(log)_b d+(log)_a c+(log)_c b is (a) 4 (b) 2 (c) 1 (d)none of these

If a ,b ,c ,d in R^+-{1}, then the minimum value of (log)_d a+(log)_b d+(log)_a c+(log)_c b is (a) 4 (b) 2 (c) 1 (d)none of these

If a ,b ,c ,d in R^+-{1}, then the minimum value of (log)_d a+(log)_b d+(log)_a c+(log)_c b is (a) 4 (b) 2 (c) 1 (d)none of these

Prove that ((log)_(a)N)/((log)_(ab)N)=1+(log)_(a)b

Prove the identity; (log)_a N* (log)_b N+(log)_b N * (log)_c N+(log)_c N * (log)_a N=((log)_a N*(log)_b N*(log)_c N)/((log)_(a b c)N)

Prove the following identities: (a) (log_(a) n)/(log_(ab) n) = 1+ log_(a) b" "(b) log_(ab) x = (log_(a) x log_(b) x)/(log_(a) x + log_(b) x) .

Recommended Questions

Compute the following a^(((log)b((log)a N))/((log)b\ \ a))
Text Solution
|
The value of N satisfying (log)a[1+(log)b\ {1+(log)c(1+(log)p N)}]=0 i...
Text Solution
|
Compute the following a^(((log)b((log)a N))/((log)b a))
Text Solution
|
If (log)a b=2,(log)b c=2, and (log)3c=3+(log)3a , then the value of c/...
Text Solution
|
If ((log)a N)/((log)c N)=((log)a N-(log)b N)/((log)b N-(log)c N),w h e...
Text Solution
|
If ageqb >1, then find the largest possible value of the expression (l...
Text Solution
|
Find the value of x satisfying "log"a(1+"log"b{1+"log"c(1+"log"px)})=0
Text Solution
|
If (log)a b=2,(log)b c=2,a n d(log)3c=3+(log)3a , then the value of c/...
Text Solution
|
If ((log)a N)/((log)c N)=((log)a N-(log)b N)/((log)b N-(log)c N),w h e...
Text Solution
|