Number of integers for which f(x)= sqrt(...

Number of integers for which `f(x)= sqrt(1/(log_(3x-2) (2x+3)) - log_(2x+3)(x^2-x+1)` equal to

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

f(x)=sqrt(log((3x-x^(2))/(x-1)))

f(x)=sqrt(log((3x-x^(2))/(x-1)))

f(x)=sqrt(log((3x-x^(2))/(x-1)))

log_(x)2x<=sqrt(log_(x)(2x^(3)))

[" Number of integers in the domain "],[" of real valued function "],[f(x)=sqrt((1)/(log_((3x-2))(2x+3))-log_((2x+3))(x^(2)-x+1))],[" is equal to- "]

log_(2)(x+1)-log_(2)(3x-1)=2

The number of integers in the domain of f(x)=sqrt(log_(2)(log_(3)(log_((1)/(4))x))) is

Sum of integers satisfying sqrt(log_(2)x-1)-(1)/(2)log_(2)(x^(3))+2>0 is

Number of integers in domain of function f(x)=log_(|x^(2)|)(4-|x|)+log_(2){sqrt(x)} is

Recommended Questions

Number of integers for which f(x)= sqrt(1/(log(3x-2) (2x+3)) - log(2x+...
Text Solution
|
Solve the inequality sqrt((log)2((2x-3)/(x-1)))<1
Text Solution
|
log(3)(log(9)x+(1)/(2)+9^(x))=2x
Text Solution
|
log(3)(log(9)x+(1)/(2)+9^(x))=2x
Text Solution
|
Number of integers for which f(x)=sqrt((1)/(log(3x-2)(2x+3))-log(2x+3)...
Text Solution
|
Domain of the function f(x)=sqrt((2x-1)/(2x^(3)+3x^(2)+x))+sqrt(sin^(-...
Text Solution
|
log(x)2x<=sqrt(log(x)(2x^(3)))
Text Solution
|
If log(2)(3^(2x-2)+7)=2+log(2)(3^(x-1)+1) then x=
Text Solution
|
Find the value of x satisfying the equation, sqrt((log3(3x)^(1/3)+logx...
Text Solution
|