Math  /  Geometry

QuestionIf the coefficient aa in the general quadratic equation is equal to 148\frac{1}{48}, what is the focal length for the parabola, cc^{\prime}, equal to? 12 1 148\frac{1}{48} 48 112\frac{1}{12} 4 124\frac{1}{24}

Studdy Solution

STEP 1

1. The quadratic equation is in the form y=ax2 y = ax^2 .
2. The parabola is oriented such that its vertex is at the origin.
3. The focal length c c^{\prime} is the distance from the vertex to the focus of the parabola.

STEP 2

1. Recall the relationship between the coefficient a a and the focal length c c^{\prime} for a parabola.
2. Substitute the given value of a a .
3. Solve for the focal length c c^{\prime} .

STEP 3

Recall the relationship between the coefficient a a and the focal length c c^{\prime} for a parabola:
For a parabola y=ax2 y = ax^2 , the focal length c c^{\prime} is given by:
c=14a c^{\prime} = \frac{1}{4a}

STEP 4

Substitute the given value of a=148 a = \frac{1}{48} into the formula:
c=14×148 c^{\prime} = \frac{1}{4 \times \frac{1}{48}}

STEP 5

Solve for the focal length c c^{\prime} :
c=1448 c^{\prime} = \frac{1}{\frac{4}{48}} c=484 c^{\prime} = \frac{48}{4} c=12 c^{\prime} = 12
The focal length c c^{\prime} is:
12 \boxed{12}

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