[log(4)(x-1)=log(2)(x-3)],[" Solue for "...

[log_(4)(x-1)=log_(2)(x-3)],[" Solue for "(x)]

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Solve log_(4)(x-1)=log_(2)(x-3)

Solve log_(4)(x-1)= log_(2) (x-3) .

Solve log_(4)(x-1)= log_(2) (x-3) .

Solve log_(4)(x-1)= log_(2) (x-3) .

Number of solutions of log_(4)(x-1)=log_(2)(x-3) is :

If log_(4)(x - 1) = log_(2)(x - 3) , then x may be

Solve the following equations : (i) log_(x)(4x-3)=2 (ii) log_2)(x-1)+log_(2)(x-3)=3 (iii) log_(2)(log_(8)(x^(2)-1))=0 (iv) 4^(log_(2)x)-2x-3=0

The number of solutions of log_(4)(x-1)=log_(2)(x-3)

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