QUESTION IMAGE
Question
name:
mon hw jan 26, due tuesday jan 27
project check in: check each item that is complete.
pre - image
reflection
translation
rotation
coloring
- reflect the image over the x - axis.
- give the rule:
- reflect the image over the y - axis.
- give the rule:
To solve the reflection problems (over the \( x \)-axis and \( y \)-axis), we use the following rules:
For Reflection over the \( x \)-axis (Problem 2):
The rule for reflecting a point \( (x, y) \) over the \( x \)-axis is:
\[ (x, y)
ightarrow (x, -y) \]
This means we keep the \( x \)-coordinate the same and negate the \( y \)-coordinate.
For Reflection over the \( y \)-axis (Problem 4):
The rule for reflecting a point \( (x, y) \) over the \( y \)-axis is:
\[ (x, y)
ightarrow (-x, y) \]
This means we negate the \( x \)-coordinate and keep the \( y \)-coordinate the same.
Example Application (Using the Triangle):
Suppose the pre - image has a vertex at \( (x, y) \):
- After reflecting over the \( x \)-axis, it becomes \( (x, -y) \).
- After reflecting over the \( y \)-axis, it becomes \( (-x, y) \).
Final Answers:
- Rule for reflection over \( x \)-axis: \( \boldsymbol{(x, y)
ightarrow (x, -y)} \)
- Rule for reflection over \( y \)-axis: \( \boldsymbol{(x, y)
ightarrow (-x, y)} \)
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To solve the reflection problems (over the \( x \)-axis and \( y \)-axis), we use the following rules:
For Reflection over the \( x \)-axis (Problem 2):
The rule for reflecting a point \( (x, y) \) over the \( x \)-axis is:
\[ (x, y)
ightarrow (x, -y) \]
This means we keep the \( x \)-coordinate the same and negate the \( y \)-coordinate.
For Reflection over the \( y \)-axis (Problem 4):
The rule for reflecting a point \( (x, y) \) over the \( y \)-axis is:
\[ (x, y)
ightarrow (-x, y) \]
This means we negate the \( x \)-coordinate and keep the \( y \)-coordinate the same.
Example Application (Using the Triangle):
Suppose the pre - image has a vertex at \( (x, y) \):
- After reflecting over the \( x \)-axis, it becomes \( (x, -y) \).
- After reflecting over the \( y \)-axis, it becomes \( (-x, y) \).
Final Answers:
- Rule for reflection over \( x \)-axis: \( \boldsymbol{(x, y)
ightarrow (x, -y)} \)
- Rule for reflection over \( y \)-axis: \( \boldsymbol{(x, y)
ightarrow (-x, y)} \)