focal point (1 Viewer)

Caterwaul · Jan 31, 2024

Hi, how do you find the focal point of y=x^2+6x+7
i never really learned that part of maths properly so....

liamkk112 · Jan 31, 2024

Caterwaul said:
Hi, how do you find the focal point of y=x^2+6x+7
i never really learned that part of maths properly so....

by focal point im assuming u mean the vertex of the parabola.

the formula for the x-coordinate of the vertex is x = -b/2a, where b is the coefficient of the x^1 term and a is the coefficient of the x^2 term
so in this case b = 6, a = 1, so the vertex's x-coordinate is -6/2 = -3. (reasoning: the vertex is the point halfway between the two x-intercepts or the average of the two x-intercepts , and we know from the quadratic formula that the x-intercepts are of the form x = -b+sqrt(b^2-4ac)/2a and x = -b - sqrt(b^2 -4ac)/2a, so taking the average of these (add them and divide by 2) we get that x = -b/2a is the x-coordinate of the vertex [the square roots will cancel])

now we can plug this into the equation y = x^2 +6x + 7 to find the y-cooridnate of the vertex:
y = 9 -18 + 7 = -2

so we know the vertex is the point (-3, -2)

alternatively we can complete the square:
y = x^2 + 6x+7 = x^2 + 6x + 9 - 2 = (x+3)^2 -2

we know that a parabola in the form y = (x-h)^2 +k has a vertex of (h, k)
in this case h = -3, k = -2, so we know the vertex is the point (-3, -2)

Drongoski · Jan 31, 2024

The focal point of a parabola is not its vertex.

I think the focal point for this parabola is: S(-3,-1.75)

liamkk112 · Jan 31, 2024

Drongoski said:
The focal point of a parabola is not its vertex.

oops, this is not in the hsc syllabus though right?

Luukas.2 · Jan 31, 2024

liamkk112 said:
oops, this is not in the hsc syllabus though right?

Not any more, but it was until the start of 2020.

A parabola $(x - h)^2 = \pm4a(y - k)$ has its vertex at $(h,\,k)$ and a focal length of $a$ (which is the vertical distance from the vertex to the focus).

So, for example, $(x - 2)^2 = 4(y - 1)$ has its vertex at $(2,\,1)$ and a focal length of $a = 1$ . As it is concave up, its focus is at $(2,\,2)$ .

And, $(x - 3)^2 = -12(y + 5)$ has its vertex at $(3,\,-5)$ and a focal length of $a = 3$ . As it is concave down, its focus is at $(3,\,-8)$ .

Now, for the equation given:

$\begin{align*} y &= x^2 + 6x + 7 \\ y - 7 + \left(\frac{6}{2}\right)^2 &= x^2 + 6x + \left(\frac{6}{2}\right)^2 \\ y - 7 + 9 &= x^2 + 6x + 9 \\ y + 2 &= (x + 3)^2 \\ \\ \text{Focal length:} \qquad 4a &= 1 \\ a &= \frac{1}{4} \\ \\ \text{Vertex is} \ &(-3,\,-2) \\ \text{Focus is} \ &\left(-3,\,-1\frac{3}{4}\right) \ \text{as the parabola is concave up} \end{align*}$

matching the answer provided above by @Drongoski.

focal point (1 Viewer)

Caterwaul

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liamkk112

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Drongoski

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liamkk112

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Luukas.2

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