Download - Conic Sections. Parabola Will have only one variable squared y=+x 2 x=+y 2 y=-x 2 x=- y 2
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Conic Sections
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ParabolaWill have only one variable squared
• y=+x2 x=+y2
• y=-x2 x=- y2
![Page 3: Conic Sections. Parabola Will have only one variable squared y=+x 2 x=+y 2 y=-x 2 x=- y 2](https://reader036.vdocument.in/reader036/viewer/2022082418/5697c0211a28abf838cd2a81/html5/thumbnails/3.jpg)
Parabola
• Non squared term needs to be by itself and postive
x=a(y-k)2+h y=a(x-h)2+k
• Vertex for both forms (h, k)
• May need to complete the square to get into this form
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CircleWill have both variables squared,
added and with the same coefficients
• (x-h)2 + (y-k)2=r2
• Center (h, k)• Radius r (h,k)
• (x-2)2 + (y+3)2=9 .____
• Center (2, -3) radius 3 r
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Ellipse Will have both variables squared, added and with different coefficients. Always equals 1.
1)()(
2
2
2
2
b
ky
a
hx
a2 > b2
b2 > a2
Center = (h, k)
Move right and left of center point
Move up and down of center point
2a2b
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Ellipse• If not equal to 1 divide entire equation by constant
• May need to complete the square to get into standard form (could be x, y or both)
14
)2(
3
)3(
12
12
12
)2(3
12
)3(4
12)2(3)3(4
22
22
22
yx
yx
yx
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Hyperbola Will have both variables squared and
subtracted. Always equals 1.
1)()(
1)()(
2
2
2
2
2
2
2
2
a
hx
b
ky
b
ky
a
hx
a
b
Asymptote sloperun
risechangex
changey
1)()(
1)()(
2
2
2
2
2
2
2
2
b
hx
a
ky
b
ky
a
hx
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Hyperbola
• If not equal to one divide by constant (refer to ellipse example)
• May need to complete the square to get into standard form (could be x, y or both)
![Page 9: Conic Sections. Parabola Will have only one variable squared y=+x 2 x=+y 2 y=-x 2 x=- y 2](https://reader036.vdocument.in/reader036/viewer/2022082418/5697c0211a28abf838cd2a81/html5/thumbnails/9.jpg)
What conic will the equation create?
258.
01004.
125.
02512.
4)1(.
22
22
22
2
22
yxxE
yxD
yxyC
xyyB
xyA
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129.
25)3(.
48416.
070710.
6424425.
2
22
22
22
22
xxyJ
yxI
yxH
yxG
yyxF