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What is the equation of the quadratic graph with a focus of (6, 0) and a directrix of y = −10?
f(x) = −one twentieth (x − 6)2 + 5

f(x) = −one twentieth (x − 6)2 − 5

f(x) = one twentieth (x − 6)2 + 5

f(x) = one twentieth (x − 6)2 − 5

Respuesta :

Answer:

Last option is right

f(x) = one twentieth (x − 6)2 − 5

Step-by-step explanation:

Given that it is a quadratic equation

Hence a parabola

Focus = (6,0)

Directrix is y =-10

Since vertex lies exactly in the middle from focus to directrix we have

vertex = (6,-5)

The parabola is having axis perpendicular to directrix and hence axis is x =6

The parabola is open up since focus lies above the directrix.

So equation is

[tex]f(x) = \frac{(x-6)^2}{2} -5[/tex]

Hence last option is right

f(x) = one twentieth (x − 6)2 − 5


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