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quadratic identities! + HSC 98 Q (1 Viewer)

sf_diegoxrock

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the points (1,-2), (3,0) and (-2,10) lie on a parabola, find its eqn
i tried doing it using simulataneous eqns and didnt get the answer :(
any help is appreciated

and a Q from the 98 HSC paper:
what is the co ord of the vertex for x*2=8(y+3)
is it (0,-3)? and the eqn of the directrix, is it y=-2?
 
P

pLuvia

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Still doing the first one :)

2.

x2=8(y+3)
x2=8y+24
y=x2/8 - 24/8

y=x2/8 - 3

axis of symmetry x=-b/2a

x=0
y=-3

Vertex (0,-3)

Focal length = 4a=8
a=2

Function concave up
Directrix y=-5
 
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acmilan

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y = ax2 + bx + c

(1,-2)

a + b + c = -2

(3,0)

9a + 3b + c = 0

(-2,10)

4a - 2b + c = 10

Three equations to solve:

9a + 3b + c = 0___(1) -> c = -9a-3b
a + b + c = -2____(2)
4a - 2b + c = 10____(3)

Sub c into 2 and 3

a + b - 9a - 3b = -2
-8a - 2b = -2
4a + b = 1______(3)

4a - 2b - 9a - 3b = 10
-5a - 5b = 10
a + b = -10____(4)

Unless there is an error, you'll get the answer by solving 3 and 4 simultaneously to get a and b, then sub the answer into c = -9a-3b to get c
 

PLooB

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kadlil said:
Still doing the first one :)

2.

x2=8(y+3)
x2=8y+24
y=x2/8 - 24/8

y=x2/8 - 3

axis of symmetry x=-b/2a

x=0
y=-3

Vertex (0,-3)

Focal length = 4a=8
a=2

Function concave up
Directrix y=-2
2/3 marks for you :)

focal length is indeed 2 as 4a=8
so the directrix is the line 2 below the vertex.

Thus directrix is y=-5

At first I was thinking how can the directrix go through the parabola? Then I realised this wasn't a x2=4ay question.
 

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