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We propse a simple and concise method to construct the inhomogeneous quantum
group $\text{IGL}_q(n)$
and its universal enveloping algebra $\text{U}_q(\text{igl}(n))$. Our
technique is based on embedding an $n$-dimensional quantum space in an
$n+1$-dimensional one as the set $x_{n+1}=1$. This is possible only if one
considers the multiparametric quantum space whose parameters are fixed in a
specific way. The quantum group $\text{IGL}_q(n)$ is then the subset of
$\text{GL}_q(n+1)$,
which leaves the $x_{n+1}=1$ subset invariant. For the deformed
universal enveloping algebra $\text{U}_q(\text{igl}(n))$,
we will show that it can also be
embedded in $\text{U}_q(\text{gl}(n+1))$,
provided one uses the multiparametric deformation
of $\text{U}(\text{gl}(n+1))$ with a specific choice of its parameters.
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