the table represents the location of qrst before and after a reflection. use the table to answer 3-5.
3. give a verbal description of the transformation.
4. which best represents the transformation algebraically?
a. (x, -y) b. (-x, y) c. (-x, -y) d. (x + 18, y)
5. find the location of t.

| pre-image | image |
| --- | --- |
| q(-9, -8) | q(9, -8) |
| r(-9, -2) | r(9, -2) |
| s(-4, -2) | s(4, -2) |
| t(-4, -8) | ? |

Question

the table represents the location of qrst before and after a reflection. use the table to answer 3-5.
3. give a verbal description of the transformation.
4. which best represents the transformation algebraically?
   a. (x, -y)  b. (-x, y)  c. (-x, -y)  d. (x + 18, y)
5. find the location of t.

| pre-image | image |
| --- | --- |
| q(-9, -8) | q(9, -8) |
| r(-9, -2) | r(9, -2) |
| s(-4, -2) | s(4, -2) |
| t(-4, -8) | ? |

Accepted Answer

# Explanation:
## Step1: Analyze reflection pattern
Compare pre-image and image coordinates:
For $Q(-9, -8) 	o Q'(9, -8)$, $R(-9, -2) 	o R'(9, -2)$, $S(-4, -2) 	o S'(4, -2)$: the $x$-coordinate is negated, $y$-coordinate stays the same.
## Step2: Answer question 3
This transformation is a reflection over the $y$-axis (since only $x$-values flip sign, $y$ remains unchanged).
## Step3: Answer question 4
The algebraic rule for negating $x$ while keeping $y$ is $(-x, y)$.
## Step4: Find T' using the rule
Apply $(-x, y)$ to $T(-4, -8)$:
$x=-4$, so $-x = -(-4)=4$; $y=-8$ stays the same.
Expression: $T' = (4, -8)$

# Answer:
3. Reflection over the y-axis
4. b. $(-x, y)$
5. $(4, -8)$

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QUESTION IMAGE

Question

Explanation:

Step1: Analyze reflection pattern

Step2: Answer question 3

Step3: Answer question 4

Step4: Find T' using the rule

Answer: