Answer:
[tex]y=-8.08[/tex] -------> [tex]y+8=3(x+2)^{2}[/tex]
[tex]y=14.25[/tex] -------> [tex]y-14=-(x-3)^{2}[/tex]
[tex]y=-7.625[/tex] -----> [tex]y+7.5=2(x+2.5)^{2}[/tex]
[tex]y=17.25[/tex] -------> [tex]y-17=-(x-3)^{2}[/tex]
[tex]y=-7.25[/tex] -------> [tex]y+7=(x-4)^{2}[/tex]
[tex]y=6.25[/tex] -------> [tex]y-6=-(x-1)^{2}[/tex]
Step-by-step explanation:
we know that
The standard form of a vertical parabola is equal to
[tex](x-h)^{2}=4p(y- k)[/tex]
where
(h,k) is the vertex
the focus is (h, k + p)
and
the directrix is y = k - p
Part 1) we have
[tex]y+8=3(x+2)^{2}[/tex]
Convert to standard form
[tex](x+2)^{2}=(1/3)(y+8)[/tex]
The vertex is the point [tex](-2,-8)[/tex]
[tex]h=-2,k=-8[/tex]
[tex]4p=1/3[/tex]
[tex]p=1/12[/tex]
the directrix is equal to
[tex]y = k-p[/tex] -----> [tex]y=-8-(1/12)=-8.08[/tex]
Part 2) we have
[tex]y-14=-(x-3)^{2}[/tex]
Convert to standard form
[tex](x-3)^{2}=-(y-14)[/tex]
The vertex is the point [tex](3,14)[/tex]
[tex]h=3,k=14[/tex]
[tex]4p=-1[/tex]
[tex]p=-1/4[/tex]
the directrix is equal to
[tex]y = k-p[/tex] -----> [tex]y = 14-(-1/4)=14.25[/tex]
Part 3) we have
[tex]y+7.5=2(x+2.5)^{2}[/tex]
Convert to standard form
[tex](x+2.5)^{2}=(1/2)(y+7.5)[/tex]
The vertex is the point [tex](-2.5,-7.5)[/tex]
[tex]h=-2.5,k=-7.5[/tex]
[tex]4p=1/2[/tex]
[tex]p=1/8[/tex]
the directrix is equal to
[tex]y = k-p[/tex] -----> [tex]y=-7.5-(1/8)=-7.625[/tex]
Part 4) we have
[tex]y-17=-(x-3)^{2}[/tex]
Convert to standard form
[tex](x-3)^{2}=-(y-17)[/tex]
The vertex is the point [tex](3,17)[/tex]
[tex]h=3,k=17[/tex]
[tex]4p=-1[/tex]
[tex]p=-1/4[/tex]
the directrix is equal to
[tex]y = k-p[/tex] -----> [tex]y = 17-(-1/4)=17.25[/tex]
Part 5) we have
[tex]y+7=(x-4)^{2}[/tex]
Convert to standard form
[tex](x-4)^{2}=(y+7)[/tex]
The vertex is the point [tex](4,-7)[/tex]
[tex]h=4,k=-7[/tex]
[tex]4p=1[/tex]
[tex]p=1/4[/tex]
the directrix is equal to
[tex]y = k-p[/tex] -----> [tex]y=-7-(1/4)=-7.25[/tex]
Part 6) we have
[tex]y-6=-(x-1)^{2}[/tex]
Convert to standard form
[tex](x-1)^{2}=-(y-6)[/tex]
The vertex is the point [tex](1,6)[/tex]
[tex]h=1,k=6[/tex]
[tex]4p=-1[/tex]
[tex]p=-1/4[/tex]
the directrix is equal to
[tex]y = k-p[/tex] -----> [tex]y=6-(-1/4)=6.25[/tex]
