$l o g_{(x - 2)} (2 x - 3) > l o g_{(x - 2)} (24 - 6 x)$
The solution set of the above inequality has integral values of x ___

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Solution

$\frac{27}{8} < x < 4$ and $2 < x < 3$
We must have $2 x - 3 > 0, 24 - 6 x > 0$
or $x > \frac{3}{2}$ and $x < 4$
Also base $x - 2 > 0 \Rightarrow x > 2$
Hence we must have $x > 2$ and $x < 4 \dots \dots (1)$
Now if base x-2>1 i.e. x > 3, then we must have
$2 x - 3 > 24 - 6 x$
or $8 x > 27 ∴ x > \frac{27}{8} \dots \dots (2)$
Hence from (1) and (2), we have
$\frac{27}{8} < x < 4$
However if $0 < x - 2 < 1$ or $2 < x < 3$ then we
must have $2 x - 3 < 24 - 6 x$ or $8 x < 27 ∴ x < \frac{27}{8}$
In this case we have $2 < x < 3 \dots \dots (B)$
Both (A) and (B) give the required solution

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