+118608 It does not have nice integer solutions so I would use Desmos or Wolfram|Alpha to solve it
http://www.wolframalpha.com/input/?i=183k^3%20%2B%2061k%20-%203%20%3D%200
If I needed to do it myself I would use Newton's method of approximating roots
+128632 183k^3 + 61k - 3 = 0
The onsite solver will do this, too......the answer is pretty nasty...!!!
$${\mathtt{183}}{\mathtt{\,\times\,}}{{\mathtt{k}}}^{{\mathtt{3}}}{\mathtt{\,\small\textbf+\,}}{\mathtt{61}}{\mathtt{\,\times\,}}{\mathtt{k}}{\mathtt{\,-\,}}{\mathtt{3}} = {\mathtt{0}} \Rightarrow \left\{ \begin{array}{l}{\mathtt{k}} = {\left({\frac{{\sqrt{{\mathtt{15\,613}}}}}{{\mathtt{3\,294}}}}{\mathtt{\,\small\textbf+\,}}{\frac{{\mathtt{1}}}{{\mathtt{122}}}}\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}{\mathtt{\,\times\,}}\left({\mathtt{\,-\,}}{\frac{{\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}}{{\mathtt{2}}}}{\mathtt{\,-\,}}{\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right){\mathtt{\,-\,}}{\frac{\left({\frac{{\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}}{{\mathtt{2}}}}{\mathtt{\,-\,}}{\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right)}{\left({\mathtt{9}}{\mathtt{\,\times\,}}{\left({\frac{{\sqrt{{\mathtt{15\,613}}}}}{{\mathtt{3\,294}}}}{\mathtt{\,\small\textbf+\,}}{\frac{{\mathtt{1}}}{{\mathtt{122}}}}\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}\right)}}\\
{\mathtt{k}} = {\left({\frac{{\sqrt{{\mathtt{15\,613}}}}}{{\mathtt{3\,294}}}}{\mathtt{\,\small\textbf+\,}}{\frac{{\mathtt{1}}}{{\mathtt{122}}}}\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}{\mathtt{\,\times\,}}\left({\frac{{\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}}{{\mathtt{2}}}}{\mathtt{\,-\,}}{\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right){\mathtt{\,-\,}}{\frac{\left({\mathtt{\,-\,}}{\frac{{\sqrt{{\mathtt{3}}}}{\mathtt{\,\times\,}}{i}}{{\mathtt{2}}}}{\mathtt{\,-\,}}{\frac{{\mathtt{1}}}{{\mathtt{2}}}}\right)}{\left({\mathtt{9}}{\mathtt{\,\times\,}}{\left({\frac{{\sqrt{{\mathtt{15\,613}}}}}{{\mathtt{3\,294}}}}{\mathtt{\,\small\textbf+\,}}{\frac{{\mathtt{1}}}{{\mathtt{122}}}}\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}\right)}}\\
{\mathtt{k}} = {\left({\frac{{\sqrt{{\mathtt{15\,613}}}}}{{\mathtt{3\,294}}}}{\mathtt{\,\small\textbf+\,}}{\frac{{\mathtt{1}}}{{\mathtt{122}}}}\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}{\mathtt{\,-\,}}{\frac{{\mathtt{1}}}{\left({\mathtt{9}}{\mathtt{\,\times\,}}{\left({\frac{{\sqrt{{\mathtt{15\,613}}}}}{{\mathtt{3\,294}}}}{\mathtt{\,\small\textbf+\,}}{\frac{{\mathtt{1}}}{{\mathtt{122}}}}\right)}^{\left({\frac{{\mathtt{1}}}{{\mathtt{3}}}}\right)}\right)}}\\
\end{array} \right\} \Rightarrow \left\{ \begin{array}{l}{\mathtt{k}} = {\mathtt{\,-\,}}{\mathtt{0.024\: \!415\: \!509\: \!892\: \!177\: \!8}}{\mathtt{\,-\,}}{\mathtt{0.578\: \!896\: \!955\: \!168\: \!551\: \!4}}{i}\\
{\mathtt{k}} = {\mathtt{\,-\,}}{\mathtt{0.024\: \!415\: \!509\: \!892\: \!177\: \!8}}{\mathtt{\,\small\textbf+\,}}{\mathtt{0.578\: \!896\: \!955\: \!168\: \!551\: \!4}}{i}\\
{\mathtt{k}} = {\mathtt{0.048\: \!831\: \!019\: \!784\: \!355\: \!5}}\\
\end{array} \right\}$$
+118608 Thanks Chris,
I often forget how clever our own site calculator is.
Thank you Mr Massow for making it for us. 
+128632 Note....Desmos is rather funky about solving these equations....
It will not "solve" 183x^3 + 61x - 3 = 0
It will "solve" 183x^3 = 3 - 61x if the left and right sides are entered as separate functions .....
See this......https://www.desmos.com/calculator/se02owjof1
Go figure....!!!
