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24 votes
24 votes
Quite urgent lol but should probably be quick I guess :(

Quite urgent lol but should probably be quick I guess :(-example-1
User Nijat Ahmadli
by
2.2k points

2 Answers

26 votes
26 votes

y = a(x-h)²+k where (h,k) denotes the vertex

Q.1)

vertex: (1, -9) where h=1, k = -9

coordinates: (0, -8) where x = 0, y = -8

find for a:

y = a(x-h)²+k

-8 = a(0-1)²-9

-8 = a -9

a = 1

============

equation: y = (x-1)²-9

Q.2)

vertex: (4, 2) where h=4, k = 2

coordinates: (2, 0) where x = 2, y = 0

find for a:

y = a(x-h)²+k

0 = a(2-4)²+2

-2 = 4(a)

a = -1/2

============

equation: y = -1/2(x-4)²+2

User Jimba Tamang
by
3.2k points
22 votes
22 votes

Answer:

(a)
y=x^2-2x-8

(b)
y= -\frac12x^2+4x-6

Explanation:

(a) From inspection of the graph, the x-intercepts (where
y = 0) are at


x = -2 and
x =4.

Therefore
y = a(x + 2)(x - 4) where
a is some constant

The y-intercept is at (0, -8)

Expanding the equation:


y = a(x + 2)(x - 4)


\implies y = a(x^2-4x+2x-8)


\implies y= ax^2-2ax-8a

Therefore, -8a is the y-intercept

Comparing y-intercepts: -8 = -8a ⇒ a = 1

Substituting a = 1, the final equation in standard form is:


y=x^2-2x-8

--------------------------------------------------------------------------------------------------

(b) From inspection of the graph, the x-intercepts (where
y = 0) are at


x = 2 and
x =6.

Therefore
y = a(x -2)(x - 6) where
a is some constant

The y-intercept is at (0, -6)

Expanding the equation:


y = a(x -2)(x - 6)


\implies y = a(x^2-6x-2x+12)


\implies y= ax^2-8ax+12a

Therefore, 12a is the y-intercept

Comparing y-intercepts:


-6 = 12a \implies a = -\frac12

Substituting found value of a into the equation:


\implies y= (-\frac12)x^2-8(-\frac12)x+12(-\frac12)


\implies y= -\frac12x^2+4x-6

User Anergy
by
2.9k points