QUESTION IMAGE
Question
graph the image of square efgh after a reflection over the y-axis.
Step1: Identify coordinates of E, F, G, H
From the graph, we can find the coordinates:
- \( E(8, -8) \)
- \( F(9, -8) \)
- \( G(9, -7) \)
- \( H(8, -7) \)
Step2: Apply reflection over y - axis rule
The rule for reflection over the \( y \) - axis is \( (x,y)\to(-x,y) \).
- For \( E(8, -8) \): After reflection, \( E'(-8, -8) \)
- For \( F(9, -8) \): After reflection, \( F'(-9, -8) \)
- For \( G(9, -7) \): After reflection, \( G'(-9, -7) \)
- For \( H(8, -7) \): After reflection, \( H'(-8, -7) \)
Step3: Plot the reflected points
Plot the points \( E'(-8, -8) \), \( F'(-9, -8) \), \( G'(-9, -7) \), \( H'(-8, -7) \) on the coordinate plane and connect them to form the reflected square.
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The image of square \( EFGH \) after reflection over the \( y \) - axis has vertices at \( E'(-8, -8) \), \( F'(-9, -8) \), \( G'(-9, -7) \), \( H'(-8, -7) \) (plotted on the coordinate plane as described).