Question
Which similarity criterion proves the two triangles are similar in dilation
(1 point)
Responses
AA~
AA~
SSS~
SSS~
SAS~
SAS~
AAS~
AAS~
Question 2
Explain your reasoning by proving the answer above and show your work. You may type it out or upload a picture. You must fully explain and show all work in order to receive full credit. (3 points)
0 / 10000 Word Limit
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(1 point)
Responses
AA~
AA~
SSS~
SSS~
SAS~
SAS~
AAS~
AAS~
Question 2
Explain your reasoning by proving the answer above and show your work. You may type it out or upload a picture. You must fully explain and show all work in order to receive full credit. (3 points)
0 / 10000 Word Limit
Skip to navigation
Answers
There are no human answers yet.
Answered by
GPT-4o mini
When determining if two triangles are similar under dilation, we typically refer to the Angle-Angle criterion, denoted as AA~. According to the AA criterion, if two angles of one triangle are equal to two angles of another triangle, then the two triangles are similar.
### Answer:
**AA~** (Angle-Angle Similarity)
### Explanation and Proof:
1. **Understanding Dilation:**
Dilation is a transformation that alters the size of a figure but maintains its shape. This means that the angles of the original triangle remain the same after dilation, while the sides are proportionally scaled.
2. **Identifying Angles:**
Let’s denote triangle ABC and triangle A'B'C' where triangle A'B'C' is a dilation of triangle ABC centered at a point O, with a scale factor k (where k > 0).
- Triangle ABC has angles ∠A, ∠B, and ∠C.
- Triangle A'B'C' has corresponding angles ∠A', ∠B', and ∠C'.
3. **Proving Angle Equality:**
Since dilation does not change the angles, it follows that:
- ∠A = ∠A'
- ∠B = ∠B'
- ∠C = ∠C'
4. **Applying AA Criterion:**
To prove that triangles ABC and A'B'C' are similar, we note:
- We have established that two angles of triangle ABC (∠A and ∠B) are equal to two angles of triangle A'B'C' (∠A' and ∠B').
- According to the AA similarity criterion, if two angles of one triangle are equal to two angles of another triangle, the triangles are similar.
5. **Conclusion:**
Therefore, by the AA~ criterion, triangles ABC and A'B'C' are similar.
In conclusion, the similarity criterion that proves two triangles are similar in the context of dilation is **AA~** (Angle-Angle Similarity).
### Answer:
**AA~** (Angle-Angle Similarity)
### Explanation and Proof:
1. **Understanding Dilation:**
Dilation is a transformation that alters the size of a figure but maintains its shape. This means that the angles of the original triangle remain the same after dilation, while the sides are proportionally scaled.
2. **Identifying Angles:**
Let’s denote triangle ABC and triangle A'B'C' where triangle A'B'C' is a dilation of triangle ABC centered at a point O, with a scale factor k (where k > 0).
- Triangle ABC has angles ∠A, ∠B, and ∠C.
- Triangle A'B'C' has corresponding angles ∠A', ∠B', and ∠C'.
3. **Proving Angle Equality:**
Since dilation does not change the angles, it follows that:
- ∠A = ∠A'
- ∠B = ∠B'
- ∠C = ∠C'
4. **Applying AA Criterion:**
To prove that triangles ABC and A'B'C' are similar, we note:
- We have established that two angles of triangle ABC (∠A and ∠B) are equal to two angles of triangle A'B'C' (∠A' and ∠B').
- According to the AA similarity criterion, if two angles of one triangle are equal to two angles of another triangle, the triangles are similar.
5. **Conclusion:**
Therefore, by the AA~ criterion, triangles ABC and A'B'C' are similar.
In conclusion, the similarity criterion that proves two triangles are similar in the context of dilation is **AA~** (Angle-Angle Similarity).
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