Solve the vertex, focus, and diractrix of the following given equation (y+4)^2 = -4(x-3)
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The variable having squared determines the opening of a parabola. If
is the squared variable, then the parabola opens up or down but if 
is the squared variable, then the parabola opens left or right. Here, the y variable is squared and the coefficient is negative, therefore, the parabola opens to the left.
The vertex form of the equation of a left-opened parabola with vertex (h, k), is given by
or 
, where 
is the distance from the vertex to the focus of the parabola. Given 
. Therefore, the vertex is at (3, -4).
The focus of a left-opening parabola with vertex (h, k), is given by
. Thus the focus of the given parabola is at 
.
The directrix of a left-opening parabola with vertex (h, k), is given by
. Thus the directrix of the given parabola is 
.