If log2, log (2^x-1) and log(2^x+3) are ...

If `log2, log (2^x-1)` and `log(2^x+3)` are in A.P., then x is equal to

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

If log2,log(2^n-1) and log(2^n+3) are in A.P. then n =

If log 2, log ( 2^(x) - 1) and log ( 2^(x) + 3) are in A.P., then 2, 2^(x) -1 , 2^(x) + 3 are in :

If log_(3)2,log_(3)(2^(x)-5) and log_(3)(2^(x)-7/2) are in A.P., then x is equal to

If log_(3)2,log_(3)(2^(x)-5) and log_(3)(2^(x)-7/2) are in A.P., then x is equal to

If 1, log_9(3^(1-x)+2) and log_3(4.3^x-1) are in A.P.,then x is equal to __

If log_10 2, log_10(2^x- 1) and log_10(2^x+3) are in A.P., then find the value of x.

If 1, log_9(3^(1-x)+2) and log_3(4.3^x-1) are in AP , then x is equal to

Recommended Questions

If log2, log (2^x-1) and log(2^x+3) are in A.P., then x is equal to
Text Solution
|
If log2,log(2^x-1),log(2^x+3) are in A.P., write the value of xdot
Text Solution
|
If 2log(x+1)-log(x^(2)-1)=log2, then x=
Text Solution
|
If log2,log(2^(x)-1) and log(2^(x)+3) are in A.P.then x is equal to
Text Solution
|
log (x + y) = log2 + (1) / (2) log x + (1) / (2) log y, then
Text Solution
|
If (1)/(2)log x+(1)/(2)log y+log2=log(x+y) then :
Text Solution
|
Ify=2^(log x),then(dy)/(dx)is(a)(2^(log x))/(log2)c)(2^(log x))/(x)(d)...
Text Solution
|
int(0tooo) log(1+x^2)/(1+x^2) dx equals-(A) log2(B) -a log2(C) 1/2 log...
Text Solution
|
Evaluate: lim(x rarr 1) [(logx^(3)+log((1)/(x^(2)))+log2)/(log(x^(3)+3...
Text Solution
|