QUESTION IMAGE
Question
transform △abc by the following transformations:
- reflect across the line y = -x
- translate 1 unit to the right and 2 units down.
identify the final coordinates of each vertex after both transformations.
Step1: Find reflection rule for \(y = -x\)
The rule for reflecting a point \((x,y)\) across the line \(y=-x\) is \((x,y)\to(-y,-x)\).
Step2: Apply reflection
Let's assume the vertices of the original triangle have coordinates. After reflection across \(y = -x\), we get new - coordinates.
Step3: Apply translation rule
The translation rule of moving 1 unit to the right and 2 units down is \((x,y)\to(x + 1,y-2)\).
Step4: Calculate final coordinates
Apply the translation to the reflected - coordinates to get the final coordinates of each vertex.
(Note: Since the original coordinates of the vertices of the triangle are not given in the text, we can't provide specific numerical answers. But the general steps for solving this type of transformation problem are as above.)
Snap & solve any problem in the app
Get step-by-step solutions on Sovi AI
Photo-based solutions with guided steps
Explore more problems and detailed explanations
Step1: Find reflection rule for \(y = -x\)
The rule for reflecting a point \((x,y)\) across the line \(y=-x\) is \((x,y)\to(-y,-x)\).
Step2: Apply reflection
Let's assume the vertices of the original triangle have coordinates. After reflection across \(y = -x\), we get new - coordinates.
Step3: Apply translation rule
The translation rule of moving 1 unit to the right and 2 units down is \((x,y)\to(x + 1,y-2)\).
Step4: Calculate final coordinates
Apply the translation to the reflected - coordinates to get the final coordinates of each vertex.
(Note: Since the original coordinates of the vertices of the triangle are not given in the text, we can't provide specific numerical answers. But the general steps for solving this type of transformation problem are as above.)