Asked by s
Choose the correct statement to describe a true relationship between any point on f(x)
π
(
π₯
)
and f(βx)
π
(
β
π₯
)
.(1 point)
Responses
If (x,y)
(
π₯
,
π¦
)
is on the graph of f(x)
π
(
π₯
)
, then (x,βy)
(
π₯
,
β
π¦
)
is on the graph of f(βx)
π
(
β
π₯
)
.
If left parenthesis x comma y right parenthesis is on the graph of f left parenthesis x right parenthesis , then left parenthesis x comma negative y right parenthesis is on the graph of f left parenthesis negative x right parenthesis .
If (x,y)
(
π₯
,
π¦
(
is on the graph of f(x)
π
(
π₯
)
, then (βx,y)
(
β
π₯
,
π¦
)
is on the graph of f(βx)
π
(
β
π₯
)
.
If left parenthesis x comma y right parenthesis is on the graph of f left parenthesis x right parenthesis , then left parenthesis negative x comma y right parenthesis is on the graph of f left parenthesis negative x right parenthesis .
If (x,y)
(
π₯
,
π¦
)
is on the graph of f(x)
π
π
(
π₯
)
and f(βx)
π
(
β
π₯
)
.(1 point)
Responses
If (x,y)
(
π₯
,
π¦
)
is on the graph of f(x)
π
(
π₯
)
, then (x,βy)
(
π₯
,
β
π¦
)
is on the graph of f(βx)
π
(
β
π₯
)
.
If left parenthesis x comma y right parenthesis is on the graph of f left parenthesis x right parenthesis , then left parenthesis x comma negative y right parenthesis is on the graph of f left parenthesis negative x right parenthesis .
If (x,y)
(
π₯
,
π¦
(
is on the graph of f(x)
π
(
π₯
)
, then (βx,y)
(
β
π₯
,
π¦
)
is on the graph of f(βx)
π
(
β
π₯
)
.
If left parenthesis x comma y right parenthesis is on the graph of f left parenthesis x right parenthesis , then left parenthesis negative x comma y right parenthesis is on the graph of f left parenthesis negative x right parenthesis .
If (x,y)
(
π₯
,
π¦
)
is on the graph of f(x)
π
Answers
Answered by
GPT-4o mini
To describe the relationship between any point on \( f(x) \) and \( f(-x) \), we can focus on the definition of the function and its transformation.
Letβs analyze the options provided:
1. If \( (x, y) \) is on the graph of \( f(x) \), then \( (x, -y) \) is on the graph of \( f(-x) \).
- **Incorrect**: This describes a reflection across the x-axis, which is not what the transformation from \( f(x) \) to \( f(-x) \) does.
2. If \( (x, y) \) is on the graph of \( f(x) \), then \( (x, -y) \) is on the graph of \( f(-x) \).
- **Incorrect**: This also suggests a reflection that is not relevant to the transformation we are discussing.
3. If \( (x, y) \) is on the graph of \( f(x) \), then \( (-x, y) \) is on the graph of \( f(-x) \).
- **Correct**: This correctly states that reflecting a point over the y-axis results in a point on the graph of \( f(-x) \).
4. If \( (x, y) \) is on the graph of \( f(x) \), then \( (-x, y) \) is on the graph of \( f(-x) \).
- **Correct**: This statement is actually a repetition of the previous option (misspelled twice) but it conveys the same true reflection.
Thus, the correct statement to describe the true relationship is:
**If \( (x, y) \) is on the graph of \( f(x) \), then \( (-x, y) \) is on the graph of \( f(-x) \).**
Letβs analyze the options provided:
1. If \( (x, y) \) is on the graph of \( f(x) \), then \( (x, -y) \) is on the graph of \( f(-x) \).
- **Incorrect**: This describes a reflection across the x-axis, which is not what the transformation from \( f(x) \) to \( f(-x) \) does.
2. If \( (x, y) \) is on the graph of \( f(x) \), then \( (x, -y) \) is on the graph of \( f(-x) \).
- **Incorrect**: This also suggests a reflection that is not relevant to the transformation we are discussing.
3. If \( (x, y) \) is on the graph of \( f(x) \), then \( (-x, y) \) is on the graph of \( f(-x) \).
- **Correct**: This correctly states that reflecting a point over the y-axis results in a point on the graph of \( f(-x) \).
4. If \( (x, y) \) is on the graph of \( f(x) \), then \( (-x, y) \) is on the graph of \( f(-x) \).
- **Correct**: This statement is actually a repetition of the previous option (misspelled twice) but it conveys the same true reflection.
Thus, the correct statement to describe the true relationship is:
**If \( (x, y) \) is on the graph of \( f(x) \), then \( (-x, y) \) is on the graph of \( f(-x) \).**
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