Let `y^2=4px` be equation of parabola. Then equation of directrix is `x=-p` coordinates of focus are `(p,0)` and axis of symmetry is `x`-axis.
In this case equation of parabola is
`y^2=-2x`
Therefore,
`4p=-2`
Divide by 4 to obtain `p.`
`p=-2/4=-1/2`
Using the facts stated above we can simply write the equation of directrix and coordinates of focus.
Directrix is the line `x=1/2,` focus is the point `(-1/2,0)` and the axis of symmetry is `x`-axis. ...
Let `y^2=4px` be equation of parabola. Then equation of directrix is `x=-p` coordinates of focus are `(p,0)` and axis of symmetry is `x`-axis.
In this case equation of parabola is
`y^2=-2x`
Therefore,
`4p=-2`
Divide by 4 to obtain `p.`
`p=-2/4=-1/2`
Using the facts stated above we can simply write the equation of directrix and coordinates of focus.
Directrix is the line `x=1/2,` focus is the point `(-1/2,0)` and the axis of symmetry is `x`-axis.
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