Duplicate Question
The question on this page has been marked as a duplicate question.
Original Question
Show the similarity between a triangle with angles A, B, and C, where m∠A=47° and m∠B=36°, and another triangle with angles G,...Asked by yo mama jk
Show the similarity between a triangle with angles A
, B
, and C
, where m∠A=47°
and m∠B=36°
, and another triangle with angles G
, H
, and J
, where m∠G=36°
and m∠J=97°
.(1 point)
Responses
△ABC∼△HJG
triangle upper A upper B upper C similar to triangle upper H upper J upper G
△ABC∼△GHJ
triangle upper A upper B upper C similar to triangle upper G upper H upper J
△ABC∼△HGJ
triangle upper A upper B upper C similar to triangle upper H upper G upper J
△ABC∼△GJH
, B
, and C
, where m∠A=47°
and m∠B=36°
, and another triangle with angles G
, H
, and J
, where m∠G=36°
and m∠J=97°
.(1 point)
Responses
△ABC∼△HJG
triangle upper A upper B upper C similar to triangle upper H upper J upper G
△ABC∼△GHJ
triangle upper A upper B upper C similar to triangle upper G upper H upper J
△ABC∼△HGJ
triangle upper A upper B upper C similar to triangle upper H upper G upper J
△ABC∼△GJH
Answers
There are no human answers yet.
Answered by
GPT-4o mini
To determine the similarity between the triangles based on their angles, we first need to find the angles of triangle ABC and then compare them to the angles of triangle GHJ.
In triangle ABC:
- \( m∠A = 47° \)
- \( m∠B = 36° \)
We can find \( m∠C \) using the fact that the sum of the angles in a triangle is 180°:
\[
m∠C = 180° - m∠A - m∠B = 180° - 47° - 36° = 97°
\]
So the angles of triangle ABC are:
- \( m∠A = 47° \)
- \( m∠B = 36° \)
- \( m∠C = 97° \)
In triangle GHJ:
- \( m∠G = 36° \)
- \( m∠J = 97° \)
To find \( m∠H \):
\[
m∠H = 180° - m∠G - m∠J = 180° - 36° - 97° = 47°
\]
So the angles of triangle GHJ are:
- \( m∠G = 36° \)
- \( m∠H = 47° \)
- \( m∠J = 97° \)
Now we can list the angles of both triangles:
- Triangle ABC: \( 47°, 36°, 97° \)
- Triangle GHJ: \( 47°, 36°, 97° \)
Since both triangles have the same angle measures, we can conclude they are similar. Therefore:
\[
\triangle ABC \sim \triangle GHJ
\]
The correct response is:
\(\triangle ABC \sim \triangle GHJ\) (triangle upper A upper B upper C similar to triangle upper G upper H upper J).
In triangle ABC:
- \( m∠A = 47° \)
- \( m∠B = 36° \)
We can find \( m∠C \) using the fact that the sum of the angles in a triangle is 180°:
\[
m∠C = 180° - m∠A - m∠B = 180° - 47° - 36° = 97°
\]
So the angles of triangle ABC are:
- \( m∠A = 47° \)
- \( m∠B = 36° \)
- \( m∠C = 97° \)
In triangle GHJ:
- \( m∠G = 36° \)
- \( m∠J = 97° \)
To find \( m∠H \):
\[
m∠H = 180° - m∠G - m∠J = 180° - 36° - 97° = 47°
\]
So the angles of triangle GHJ are:
- \( m∠G = 36° \)
- \( m∠H = 47° \)
- \( m∠J = 97° \)
Now we can list the angles of both triangles:
- Triangle ABC: \( 47°, 36°, 97° \)
- Triangle GHJ: \( 47°, 36°, 97° \)
Since both triangles have the same angle measures, we can conclude they are similar. Therefore:
\[
\triangle ABC \sim \triangle GHJ
\]
The correct response is:
\(\triangle ABC \sim \triangle GHJ\) (triangle upper A upper B upper C similar to triangle upper G upper H upper J).
Submit Your Answer
We prioritize human answers over AI answers.
If you are human, and you can answer this question, please submit your answer.