Question
Use the image to answer the question.
Two parabolas that open upward are plotted on a coordinate plane. Both parabolas begin in quadrant 2 sloping downward from left to right, pass through quadrant 3 until reaching a common vertex on the y-axis, and then rise through quadrants 4 and 1.
According to the graph, what is the value of k? Does the transformation show a stretch or a compression?
(1 point)
Responses
0.5; stretch
0.5; stretch
0.5x
; stretch
0.5 x ; stretch
0.5x
; compression
0.5 x ; compression
0.5; compression
Two parabolas that open upward are plotted on a coordinate plane. Both parabolas begin in quadrant 2 sloping downward from left to right, pass through quadrant 3 until reaching a common vertex on the y-axis, and then rise through quadrants 4 and 1.
According to the graph, what is the value of k? Does the transformation show a stretch or a compression?
(1 point)
Responses
0.5; stretch
0.5; stretch
0.5x
; stretch
0.5 x ; stretch
0.5x
; compression
0.5 x ; compression
0.5; compression
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine the value of \( k \) and whether the transformation shows a stretch or a compression, we need to understand how the parabolas are transformed.
When you have a parabola in standard form, such as \( y = ax^2 \), the value of \( k \) in the transformation \( y = kx^2 \) indicates whether a vertical compression or stretch is being applied:
- If \( |k| < 1 \), the parabola is compressed (it becomes "flatter").
- If \( |k| > 1 \), the parabola is stretched (it becomes narrower).
Since we are considering \( k = 0.5 \):
- Since \( 0.5 < 1 \), this indicates a compression.
Given this information, the answer would be:
**0.5; compression**
When you have a parabola in standard form, such as \( y = ax^2 \), the value of \( k \) in the transformation \( y = kx^2 \) indicates whether a vertical compression or stretch is being applied:
- If \( |k| < 1 \), the parabola is compressed (it becomes "flatter").
- If \( |k| > 1 \), the parabola is stretched (it becomes narrower).
Since we are considering \( k = 0.5 \):
- Since \( 0.5 < 1 \), this indicates a compression.
Given this information, the answer would be:
**0.5; compression**
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.