QUESTION IMAGE
Question
- reflect the triangle in the y-axis. then translate 2 units left.
To solve the problem of reflecting the triangle over the \( y \)-axis and then translating it 2 units left, we follow these steps:
Step 1: Identify the original coordinates of the triangle's vertices
From the graph, let's assume the vertices of the triangle are:
- Vertex 1: \( (-2, 3) \)
- Vertex 2: \( (-1, 4) \)
- Vertex 3: \( (0, 2) \)
Step 2: Reflect over the \( y \)-axis
The rule for reflecting a point \( (x, y) \) over the \( y \)-axis is \( (x, y)
ightarrow (-x, y) \).
- For \( (-2, 3) \): \( -(-2) = 2 \), so new point: \( (2, 3) \)
- For \( (-1, 4) \): \( -(-1) = 1 \), so new point: \( (1, 4) \)
- For \( (0, 2) \): \( -(0) = 0 \), so new point: \( (0, 2) \)
Step 3: Translate 2 units left
The rule for translating a point \( (x, y) \) 2 units left is \( (x, y)
ightarrow (x - 2, y) \).
- For \( (2, 3) \): \( 2 - 2 = 0 \), so new point: \( (0, 3) \)
- For \( (1, 4) \): \( 1 - 2 = -1 \), so new point: \( (-1, 4) \)
- For \( (0, 2) \): \( 0 - 2 = -2 \), so new point: \( (-2, 2) \)
Final Vertices After Transformations
The vertices of the triangle after reflection over the \( y \)-axis and translation 2 units left are:
- \( (0, 3) \)
- \( (-1, 4) \)
- \( (-2, 2) \)
To graph the transformed triangle, plot these three points and connect them.
(Note: If the original coordinates were different, adjust the calculations accordingly. The key is applying the reflection and translation rules to each vertex.)
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To solve the problem of reflecting the triangle over the \( y \)-axis and then translating it 2 units left, we follow these steps:
Step 1: Identify the original coordinates of the triangle's vertices
From the graph, let's assume the vertices of the triangle are:
- Vertex 1: \( (-2, 3) \)
- Vertex 2: \( (-1, 4) \)
- Vertex 3: \( (0, 2) \)
Step 2: Reflect over the \( y \)-axis
The rule for reflecting a point \( (x, y) \) over the \( y \)-axis is \( (x, y)
ightarrow (-x, y) \).
- For \( (-2, 3) \): \( -(-2) = 2 \), so new point: \( (2, 3) \)
- For \( (-1, 4) \): \( -(-1) = 1 \), so new point: \( (1, 4) \)
- For \( (0, 2) \): \( -(0) = 0 \), so new point: \( (0, 2) \)
Step 3: Translate 2 units left
The rule for translating a point \( (x, y) \) 2 units left is \( (x, y)
ightarrow (x - 2, y) \).
- For \( (2, 3) \): \( 2 - 2 = 0 \), so new point: \( (0, 3) \)
- For \( (1, 4) \): \( 1 - 2 = -1 \), so new point: \( (-1, 4) \)
- For \( (0, 2) \): \( 0 - 2 = -2 \), so new point: \( (-2, 2) \)
Final Vertices After Transformations
The vertices of the triangle after reflection over the \( y \)-axis and translation 2 units left are:
- \( (0, 3) \)
- \( (-1, 4) \)
- \( (-2, 2) \)
To graph the transformed triangle, plot these three points and connect them.
(Note: If the original coordinates were different, adjust the calculations accordingly. The key is applying the reflection and translation rules to each vertex.)