when graphing a parabola, the focus is defined as a . located the parabola, and the directrix is defined as a located the parabola. they are both units away from the vertex. vector line plane point
using cramer’s rule to solve the following system of . which would you use for the denominator of each variable?

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Accepted Answer

To solve the problem about the focus and directrix of a parabola:

### For the focus:
- A parabola's focus is a **point** (from the options: vector, line, plane, point) located **inside** the parabola, at a distance of $ \frac{1}{4|a|} $ units from the vertex (where $ a $ is the coefficient of $ x^2 $ or $ y^2 $ in the parabola’s equation).

### For the directrix:
- The directrix is a **line** (from the same options) located **outside** the parabola, also at a distance of $ \frac{1}{4|a|} $ units from the vertex, and parallel to the axis of symmetry (perpendicular to the parabola’s opening direction).

### Final Answer (filling the blanks):
- Focus: defined as a $\boldsymbol{\text{point}}$, located $\boldsymbol{\text{inside}}$ the parabola.
- Directrix: defined as a $\boldsymbol{\text{line}}$, located $\boldsymbol{\text{outside}}$ the parabola.
- They are both $\boldsymbol{\frac{1}{4|a|}}$ units away from the vertex (where $ a $ is the coefficient of $ x^2 $ or $ y^2 $ in the parabola’s standard form).

### Brief Explanations:
- **Focus**: By definition, the focus of a parabola is a fixed point inside the curve, equidistant from the vertex and the directrix.
- **Directrix**: The directrix is a fixed line outside the parabola, perpendicular to the axis of symmetry, and equidistant from the vertex as the focus.
- **Distance**: For a parabola in the form $ y = ax^2 + bx + c $ (or $ x = ay^2 + by + c $), the distance from the vertex to the focus (and to the directrix) is $ \frac{1}{4|a|} $ units.

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Explanation:

For the focus:

For the directrix:

Final Answer (filling the blanks):

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