The roots of the equation log2 (x^2 - 4 ...

The roots of the equation `log_2 (x^2 - 4 x + 5) = (x - 2)` are

Promotional Banner

Promotional Banner

Similar Questions

Explore conceptually related problems

The real roots of the equation : 7 log_(7) (x^(2) - 4x + 5) = x - 1 are :

The roots of the equation log_(2)(x^(2)-4x+5)=(x-2) are

The roots of the equation log2(x^(2)-4x+5)=(x-2) are

The real roots of the equation 5^("log"5(x^(2) - 4x + 5)) = x - 1 are :

Sum of squares of the roots of the equation slogs 5^(log_(5)(x^(2)-4x+5))=x-1 is equal to

Solve the equation log_4 (2x^2 + x + 1) - log_2 (2x - 1) = 1.

The number of roots of the equation 1+log_(2)(1-x)=2^(-x) , is

Recommended Questions

The roots of the equation log2 (x^2 - 4 x + 5) = (x - 2) are
Text Solution
|
Real roots of equation x^(2)+5|x|+4=0 are
Text Solution
|
if x >0 , and log2 x + log2 (x^(1/2)) + log2 (x^(1/4))+ ------------ =...
Text Solution
|
The equation x^((3)/4 (log2x)^2+log2 x -(5)/(4))=sqrt(2) has :
Text Solution
|
Number of real values of x satisfying the equation log2(x^2-x)*log2((...
Text Solution
|
Solution(s) of the equation. 3x^2-2x^3 = log2 (x^2 + 1) - log2 x is/ar...
Text Solution
|
Solve x^[[3/4(log2 x)^2+log2 x-5/4]] = sqrt2
Text Solution
|
Solve the following equations for 'x' : 2log4 (4-x)=4-log2(-2-x)
Text Solution
|
if x >0 , and log2 x + log2 (x^(1/2)) + log2 (x^(1/4))+ ------------ =...
Text Solution
|