[tex]\csc\theta=\dfrac1{\sin\theta}=\dfrac{\sqrt{17}}}4\implies\sin\theta=\dfrac4{\sqrt{17}}[/tex]
Recall that [tex]\sin^2\theta+\cos^2\theta=1[/tex], which means
[tex]\cos\theta=\pm\sqrt{1-\sin^2\theta}=\pm\sqrt{1-\dfrac{16}{17}}=\pm\dfrac1{\sqrt{17}}[/tex]
Since [tex]\tan\theta=\dfrac{\sin\theta}{\cos\theta}>0[/tex], and [tex]\sin\theta>0[/tex], it follows that [tex]\cos\theta>0[/tex] too, so you take the positive root:
[tex]\cos\theta=\dfrac1{\sqrt{17}}[/tex]
Therefore
[tex]\cot\theta=\dfrac{\cos\theta}{\sin\theta}=\dfrac{\frac1{\sqrt{17}}}{\frac4{\sqrt{17}}}=\dfrac14[/tex]
