Question
Correctly label the parts of the triangle. The drawing is not to scale. (1 point)
Drop target 1
Drop target 2
Drop target 3
Question 2
If CE = 101 and AE = 99, what is the correct equation to find AC?(1 point)
Responses
99+x = 101
99+x = 101
992+x2 = 1012
992+x2 = 1012
992+1012=x2
99 squared plus 101 squared is equal to x squared
99+101=x
99 plus 101 is equal to x
Question 3
Find AC(1 point)
AC =
Drop target 1
Drop target 2
Drop target 3
Question 2
If CE = 101 and AE = 99, what is the correct equation to find AC?(1 point)
Responses
99+x = 101
99+x = 101
992+x2 = 1012
992+x2 = 1012
992+1012=x2
99 squared plus 101 squared is equal to x squared
99+101=x
99 plus 101 is equal to x
Question 3
Find AC(1 point)
AC =
Answers
GPT-4o mini
To help you with your questions about the triangle:
### Question 1: Labeling the parts of the triangle
To correctly label the parts of the triangle, we typically have:
- The vertices labeled (e.g., A, B, C).
- The sides labeled with the lengths opposite those vertices (e.g., BC opposite A, CA opposite B, AB opposite C).
- The altitude, medians, or any special segments depending on the context.
Since I can't see the drawing, I can't provide specific labels, but ensure you are following the triangle notation conventions.
### Question 2: Finding the correct equation to find AC
With the given measurements:
- CE = 101
- AE = 99
If you are looking to find the length of AC, it can depend on the triangle's configuration, but in a triangle where E is the midpoint of AC, the correct equation to find AC would generally be based on the relationship of the segments. If AE + EC = AC, then:
- **99 + x = 101** is the correct equation to find AC if E is the midpoint and AC is the total length. Here, x would be the length CE.
### Question 3: Finding AC
If you solve the equation from Question 2:
1. From the equation \( 99 + x = 101 \):
- Subtract 99 from both sides:
- \( x = 101 - 99 \)
- \( x = 2 \)
If AE = 99 and CE = 2, then:
- AC would be \( AE + CE = 99 + 2 = 101 \).
So, **AC = 101**.
Let me know if you need further clarification on any points!
### Question 1: Labeling the parts of the triangle
To correctly label the parts of the triangle, we typically have:
- The vertices labeled (e.g., A, B, C).
- The sides labeled with the lengths opposite those vertices (e.g., BC opposite A, CA opposite B, AB opposite C).
- The altitude, medians, or any special segments depending on the context.
Since I can't see the drawing, I can't provide specific labels, but ensure you are following the triangle notation conventions.
### Question 2: Finding the correct equation to find AC
With the given measurements:
- CE = 101
- AE = 99
If you are looking to find the length of AC, it can depend on the triangle's configuration, but in a triangle where E is the midpoint of AC, the correct equation to find AC would generally be based on the relationship of the segments. If AE + EC = AC, then:
- **99 + x = 101** is the correct equation to find AC if E is the midpoint and AC is the total length. Here, x would be the length CE.
### Question 3: Finding AC
If you solve the equation from Question 2:
1. From the equation \( 99 + x = 101 \):
- Subtract 99 from both sides:
- \( x = 101 - 99 \)
- \( x = 2 \)
If AE = 99 and CE = 2, then:
- AC would be \( AE + CE = 99 + 2 = 101 \).
So, **AC = 101**.
Let me know if you need further clarification on any points!