QUESTION IMAGE
Question
4.2 3. complete each table of values.
a) $y = x + 1$\
\
| $x$ | $y$ | \ |
| --- | --- | \ |
| 1 | \underline{2} | \ |
| 2 | \underline{3} | \ |
| 3 | \underline{4} | \ |
| 4 | \underline{5} | \ |
\
b) $y = x - 1$\
\
| $x$ | $y$ | \ |
| --- | --- | \ |
| 2 | \underline{1} | \ |
| 4 | \underline{3} | \ |
| 6 | \underline{5} | \ |
| 8 | \underline{7} | \ |
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- on his first birthday, hayden was given $20 by his grandfather. each years gift is $10 more than the year before. the data is given in the table below\
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grandfather’s gifts\
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| birthday, $n$ | gift, $g$ ($) | \ |
| --- | --- | \ |
| 1 | 20 | \ |
| 2 | 30 | \ |
| 3 | 40 | \ |
| 4 | 50 | \ |
\
a) graph the data.\
b) is the graph linear? explain your thinking.\
the points \underline{make a straight line}, so the graph is \underline{linear}.\
c) should the points be joined? explain why or why not.\
\
\
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d) how are the patterns in the table shown in the graph? in the table,\
as the birthday increases by \underline{1}, the gift value increases by \underline{10}. each point\
on the graph is \underline{across} and \underline{1 higher} from the previous point.\
\
4.3 5. write an equation to describe each line.\
a) \
\
(graph with x from -4 to 4, y from -4 to 4, origin at (0,0))\
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\underline{$y = 4x - 4$}\
b) \
\
(graph with x from -6 to 6, y from -6 to 6, origin at (0,0))\
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\underline{$y = 6x - 6$}\
c) \
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(graph with x from -10 to 10, y from -10 to 10, origin at (0,0))\
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\underline{$y = 10x - 10$}
Step1: Verify 4a (already done)
The graph plots points (1,20), (2,30), (3,40), (4,50) correctly, matching the table.
Step2: Verify 4b (already done)
Linear graphs form straight lines; the points lie on a straight line, so it is linear.
Step3: Answer 4c
Birthdays are whole numbers (discrete data). We only have gift values for specific birthdays, not every value between them.
Step4: Verify 4d (correct values)
In the table, $n$ increases by 1, $g$ increases by 10. On the graph, each point is 1 unit right and 10 units up from the prior point.
Step5: Correct 5a equation
The line passes through (0,0) (origin), slope $m=\frac{4}{4}=1$. Equation: $y=x$.
Step6: Correct 5b equation
The line passes through (0,0), slope $m=\frac{6}{6}=1$. Equation: $y=x$.
Step7: Correct 5c equation
The line passes through (0,0), slope $m=\frac{10}{10}=1$. Equation: $y=x$.
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Question 3 (already completed correctly):
a) For $y=x+1$:
$x=1, y=2$; $x=2, y=3$; $x=3, y=4$; $x=4, y=5$
b) For $y=x-1$:
$x=2, y=1$; $x=4, y=3$; $x=6, y=5$; $x=8, y=7$
Question 4:
a) (Graph is already correctly plotted with points (1,20), (2,30), (3,40), (4,50))
b) Yes, the graph is linear. The plotted points lie on a single straight line.
c) No, the points should not be joined. Birthdays are discrete (whole-number values only), so there is no valid gift amount for values between the listed birthdays.
d) In the table, as the birthday increases by $\boldsymbol{1}$, the gift value increases by $\boldsymbol{10}$. Each point on the graph is $\boldsymbol{1\ \text{unit to the right}}$ and $\boldsymbol{10\ \text{units up}}$ from the previous point.
Question 5:
a) $y=x$
b) $y=x$
c) $y=x$