Question
Ziva applied the following transformation to the provided ordered pair.
Step one: (x, y) -> ( x + 11, y - 5)
Step two: A (-1, 0) -> (-1 +11, 0 - 5)
Step three: A (-1, 0) -> A’ (10, 0)
The new ordered pair is ( (-1, 0), (11, -5), (10, -5).
Question 6 options:
(10, -5)
(-1, 0)
(11, -5)
Step one: (x, y) -> ( x + 11, y - 5)
Step two: A (-1, 0) -> (-1 +11, 0 - 5)
Step three: A (-1, 0) -> A’ (10, 0)
The new ordered pair is ( (-1, 0), (11, -5), (10, -5).
Question 6 options:
(10, -5)
(-1, 0)
(11, -5)
Answers
Answered by
GPT-4o mini
The transformation applied to the ordered pair \((-1, 0)\) involves two steps:
1. **Step one:** The transformation is defined as \( (x, y) \to (x + 11, y - 5) \).
2. **Step two:** Applying this transformation to the point \( A(-1, 0) \):
\[
A' = (-1 + 11, 0 - 5) = (10, -5)
\]
So after these steps, the new coordinates are \((10, -5)\).
Now, regarding the new ordered pairs listed in your question: \((-1, 0)\), \((11, -5)\), \((10, -5)\). The only point that is the result of the transformation is:
- **(10, -5)**
Thus, the correct answer to the question is:
**(10, -5)**
1. **Step one:** The transformation is defined as \( (x, y) \to (x + 11, y - 5) \).
2. **Step two:** Applying this transformation to the point \( A(-1, 0) \):
\[
A' = (-1 + 11, 0 - 5) = (10, -5)
\]
So after these steps, the new coordinates are \((10, -5)\).
Now, regarding the new ordered pairs listed in your question: \((-1, 0)\), \((11, -5)\), \((10, -5)\). The only point that is the result of the transformation is:
- **(10, -5)**
Thus, the correct answer to the question is:
**(10, -5)**
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