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when you sketch the graphs, include the x-intercepts and vertex.
| length of fencing | function | vertex | axis of symmetry | sketch graph | ---- | ---- | ---- | ---- | ---- | 50 ft | $a(w)=w(25-w)$ | $(12.5, 156.25)$ | $x=12.5$ | sketched graph | 164 ft | $a(w)=w(82-w)$ | $(41, 1,681)$ | $x=41$ | sketched graph | 66 ft | 30 ft | $a(w)=w(15-w)$ | $x=50$ | $a(w)=w(35-w)$ | $a(w)=w(17-w)$ | $(8.5, 72.25)$ | $x=8.5$ | sketched graph with intercepts (0,0), (17,0) and vertex (8.5,72.25) | focus on algebra: quadratic functions 2014 |
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Step1: 66 ft row: Define area function
For fencing length $L=66$ ft, the area function for a rectangular enclosure (where one side uses existing fencing, so $L = 2w + l$, $l = 33 - w$) is:
$A(w) = w(33 - w)$
Step2: 66 ft row: Find vertex x-coordinate
Axis of symmetry (vertex x-value) for $A(w)=-w^2+33w$ is $w=-\frac{b}{2a}=-\frac{33}{2(-1)}=16.5$
Step3: 66 ft row: Find vertex y-coordinate
Substitute $w=16.5$ into $A(w)$:
$A(16.5)=16.5(33-16.5)=16.5^2=272.25$
Vertex: $(16.5, 272.25)$
Axis of symmetry: $x=16.5$
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Step4: 30 ft row: Identify fencing length
From $A(w)=w(15-w)$, $l=15-w$, so $L=2w+l=2w+15-w=15+w$; intercepts at $w=0,15$, so total fencing $L=30$ ft (matches table)
Step5: 30 ft row: Find vertex x-coordinate
Axis of symmetry: $w=-\frac{b}{2a}=-\frac{15}{2(-1)}=7.5$
Step6: 30 ft row: Find vertex y-coordinate
$A(7.5)=7.5(15-7.5)=7.5^2=56.25$
Vertex: $(7.5, 56.25)$
Axis of symmetry: $x=7.5$
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Step7: $x=50$ row: Find fencing length
Axis of symmetry $w=50$, so $w=-\frac{b}{2a}=50$. For $A(w)=w(L/2 - w)$, $L/2=100$, so $L=200$ ft
Step8: $x=50$ row: Define area function
$A(w)=w(100 - w)$
Step9: $x=50$ row: Find vertex y-coordinate
$A(50)=50(100-50)=2500$
Vertex: $(50, 2500)$
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Step10: $A(w)=w(35-w)$ row: Find fencing length
$l=35-w$, so $L=2w+l=2w+35-w=35+w$; intercepts at $w=0,35$, total fencing $L=70$ ft
Step11: $A(w)=w(35-w)$ row: Find vertex x-coordinate
Axis of symmetry: $w=-\frac{b}{2a}=-\frac{35}{2(-1)}=17.5$
Step12: $A(w)=w(35-w)$ row: Find vertex y-coordinate
$A(17.5)=17.5(35-17.5)=17.5^2=306.25$
Vertex: $(17.5, 306.25)$
Axis of symmetry: $x=17.5$
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| Length of Fencing | Function | Vertex | Axis of Symmetry | Sketch Graph (Key Points) |
|---|---|---|---|---|
| 30 ft | $A(w)=w(15-w)$ | $(7.5, 56.25)$ | $x=7.5$ | x-intercepts $(0,0),(15,0)$, vertex $(7.5, 56.25)$ |
| 200 ft | $A(w)=w(100-w)$ | $(50, 2500)$ | $x=50$ | x-intercepts $(0,0),(100,0)$, vertex $(50, 2500)$ |
| 70 ft | $A(w)=w(35-w)$ | $(17.5, 306.25)$ | $x=17.5$ | x-intercepts $(0,0),(35,0)$, vertex $(17.5, 306.25)$ |