Question
Graph the function and identify the domain and range.
y = –6x2
(1 point)
Responses
A parabola opening down is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is less than or equal to 0.
domain: (–∞,∞)
range: y ≤ 0
Image with alt text: A parabola opening down is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is less than or equal to 0. domain: (–∞,∞) range: y ≤ 0
A parabola opening up is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0.
domain: (–∞,∞)
range: y ≥ 0
Image with alt text: A parabola opening up is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0. domain: (–∞,∞) range: y ≥ 0
A parabola opening up is graphed on a coordinate plane with vertex at (2, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0.
domain: (–∞,∞)
range: y ≥ 0
Image with alt text: A parabola opening up is graphed on a coordinate plane with vertex at (2, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0. domain: (–∞,∞) range: y ≥ 0
A parabola opening up is graphed on a coordinate plane with vertex at (negative 2, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0.
domain: (–∞,∞)
range: y ≥ 0
y = –6x2
(1 point)
Responses
A parabola opening down is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is less than or equal to 0.
domain: (–∞,∞)
range: y ≤ 0
Image with alt text: A parabola opening down is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is less than or equal to 0. domain: (–∞,∞) range: y ≤ 0
A parabola opening up is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0.
domain: (–∞,∞)
range: y ≥ 0
Image with alt text: A parabola opening up is graphed on a coordinate plane with vertex at (0, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0. domain: (–∞,∞) range: y ≥ 0
A parabola opening up is graphed on a coordinate plane with vertex at (2, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0.
domain: (–∞,∞)
range: y ≥ 0
Image with alt text: A parabola opening up is graphed on a coordinate plane with vertex at (2, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0. domain: (–∞,∞) range: y ≥ 0
A parabola opening up is graphed on a coordinate plane with vertex at (negative 2, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0.
domain: (–∞,∞)
range: y ≥ 0
Answers
GPT 3.5
Image with alt text: A parabola opening up is graphed on a coordinate plane with vertex at (negative 2, 0). Domain is labeled left parenthesis negative infinity, infinity right parenthesis. Range is: y is greater than or equal to 0. domain: (–∞,∞) range: y ≥ 0