The given equation is $x=5y^2+25y+60$.

For two different forms of equations of parabola stated below, use the following key-concept to find vertex, axis of symmetry, focus, directrix, direction of opening of parabola and length of latus rectum.

 $\boxed{\begin{array}{ccc}\text{Form of equations}& y=a{\left(x-h\right)}^2+k& x=a{\left(y-k\right)}^2+h\\ \text{Vertex}& \left(h,k\right)& \left(h,k\right)\\ \text{Axis of symmetry}& x=h& y=k\\ \text{Focus}& \left(h,k+\frac{1}{4a}\right)& \left(h+\frac{1}{4a},k\right)\\ \text{Directrix}& y=k-\frac{1}{4a}& x=h-\frac{1}{4a}\\ \text{Direction of opening}& \begin{array}{l}\text{upward if }a>0,\\ \text{downward if }a<0\end{array}& \begin{array}{l}\text{right if }a>0,\\ \text{left if }a<0\end{array}\\ \text{Length of latus rectum}& \left|\frac{1}{a}\right|\text{units}& \left|\frac{1}{a}\right|\text{units}\end{array}}$

The given equation $x=5y^2+25y+60$ is converted to standard form $x=a{\left(y-k\right)}^2+h$ as:

 $\begin{array}{c}x=5y^2+25y+\mathrm{60....}\left(\text{Given}\right)\\ x=5\left(y^2+5y+12\right)\\ x=5\left(y^2+5y+12+{\left(\frac{5}{2}\right)}^2-{\left(\frac{5}{2}\right)}^2\right)\mathrm{....}\left(\begin{array}{l}\text{ Add and}\\ \text{subtract }{\left(\frac{5}{2}\right)}^2\end{array}\right)\\ x=5\left(y^2+5y+{\left(\frac{5}{2}\right)}^2\right)+5\left(12-{\left(\frac{5}{2}\right)}^2\right)\\ x=5{\left(y+\frac{5}{2}\right)}^2+\frac{115}{4}\mathrm{....}\left(\text{Standard form}\right)\end{array}$

Comparing $x=5{\left(y+\frac{5}{2}\right)}^2+\frac{115}{4}$ with $x=a{\left(y-k\right)}^2+h$, $a=5,h=\frac{115}{4}\text{ and }k=-\frac{5}{2}$.

The vertex and focus, the equations of the axis of symmetry and directrix, and the direction of opening of the parabola are evaluated as:

The vertex is $\left(\frac{115}{4},-\frac{5}{2}\right)$.

Focus is evaluated as:

 $\begin{array}{c}\left(h+\frac{1}{4a},k\right)=\left(\frac{115}{4}+\frac{1}{4\left(5\right)},-\frac{5}{2}\right)\\ =\left(\frac{144}{5},-\frac{5}{2}\right)\end{array}$

Axis of symmetry is $y=-\frac{5}{2}$.

The equation for directrix is evaluated as:

 $\begin{array}{c}x=h-\frac{1}{4a}\\ x=\frac{115}{4}-\frac{1}{4\left(5\right)}\\ x=\frac{287}{10}\mathrm{....}\left(\text{Directrix}\right)\end{array}$

The direction of opening of parabola is right because $a>0$.

The length of latus rectum is evaluated as:

 $\begin{array}{c}\frac{1}{\left|a\right|}=\frac{1}{\left|5\right|}\\ =\frac{1}{5}\text{ unit}\end{array}$

The graph of the parabola is shown below.

The vertex is $\left(\frac{115}{4},-\frac{5}{2}\right)$. Focus is $\left(\frac{144}{5},-\frac{5}{2}\right)$. Axis of symmetry is $y=-\frac{5}{2}$. The equation of directrix is $x=\frac{287}{10}$. The direction of opening of parabola is towards right. The length of latus rectum is $\frac{1}{5}\text{ unit}$.