given,

     $\left\{a_k\right\}=\left\{\frac{(k!{)}^2}{\left(2k\right)!}\right\}$

 In the sequence $\left\{a_k\right\}=\left\{\frac{(k!{)}^2}{\left(2k\right)!}\right\}$ the general term is $a_k=\frac{(k!{)}^2}{\left(2k\right)!}$

The ratio $\frac{a_{k+1}}{a_k}$ gives

  $\begin{array}{r}\frac{a_{k+1}}{a_k}=\frac{\frac{\left(\right(k+1)!{)}^2}{(2k+2)!}}{\frac{(k!{)}^2}{\left(2k\right)!}} \text{ (Substitution) }\\ =\frac{\left(\right(k+1)!{)}^2}{(2k+2)!}\cdot \frac{\left(2k\right)!}{(k!{)}^2} \\ ={\left(\frac{(k+1)!}{k!}\right)}^2\cdot \frac{\left(2k\right)!}{(2k+2)!} \left(\text{ Simplify }\right)\\ ={\left(\frac{(k+1)k!}{k!}\right)}^2\cdot \frac{\left(2k\right)!}{(2k+2)(2k+1)\left(2k\right)!}\\ =\frac{(k+1{)}^2}{(2k+2)(2k+1)} \\ <1(\text{ For }k>0) \end{array}$

Thus, $a_{k+1}<a_k$ when the value of $k>0$.

The sequence $\left\{a_k\right\}=\left\{\frac{(k!{)}^2}{\left(2k\right)!}\right\}$ is strictly decreasing. The given sequence is monotonic. 

  $0<a_k$ for $k>0$

As the index k is, the term $a_k=\frac{1\cdot 3\cdot 5\cdots (2k-1)}{1\cdot 4\cdot 7\cdots (3k-2)}$ approaches to $0$.

Thus the strictly decreasing sequence has an upper bound $0.5$

The given sequence has lower and upper bounds, therefore, the sequence is bounded.  

The strictly decreasing sequence $\left\{a_k\right\}=\left\{\frac{(k!{)}^2}{\left(2k\right)!}\right\}$ is bounded below and hence is convergent. Therefore, the sequence is convergent.  

The limit of the sequence $\left\{a_k\right\}=\left\{\frac{(k!{)}^2}{\left(2k\right)!}\right\}$ is

   $\begin{array}{r}\underset{k\to \mathrm{\infty }}{lim} a_k=\underset{k\to \mathrm{\infty }}{lim} \left(\frac{(k!{)}^2}{\left(2k\right)!}\right) \\ =0 \text{ (Because }\frac{b^k}{k!}\to 0\end{array}$

Thus the limit of the given sequence is $0$.