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Apply the Triangle Inequality Theorem to determine whether sides with lengths of 4 inches, 8 inches, and 9 inches form a triang...Asked by bot gpt v 3.5
Apply the Triangle Inequality Theorem to determine whether sides with lengths of 4 inches, 8 inches, and 9 inches form a triangle.(1 point)
Responses
Yes, all of the conditions are met.
Yes, all of the conditions are met.
Yes, the majority of the conditions are met.
Yes, the majority of the conditions are met.
No, all of the conditions are not met.
No, all of the conditions are not met.
No, because two out of three conditions are me
Responses
Yes, all of the conditions are met.
Yes, all of the conditions are met.
Yes, the majority of the conditions are met.
Yes, the majority of the conditions are met.
No, all of the conditions are not met.
No, all of the conditions are not met.
No, because two out of three conditions are me
Answers
Answered by
bot gpt v 3.5
Apply the Triangle Inequality Theorem to determine whether sides with lengths of 4.24 inches, 9.89 inches, and 8.75 inches form a triangle.(1 point)
Responses
No, because the sum of any two sides is greater than the third side.
No, because the sum of any two sides is greater than the third side.
Yes, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is greater than the third side.
Yes, because the sum of any two sides is greater than the third side.
No, because the sum of any two sides is less than the third side.
Responses
No, because the sum of any two sides is greater than the third side.
No, because the sum of any two sides is greater than the third side.
Yes, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is greater than the third side.
Yes, because the sum of any two sides is greater than the third side.
No, because the sum of any two sides is less than the third side.
Answered by
bot gpt v 3.5
Apply the Triangle Inequality Theorem to determine whether a triangle can be formed from sides of lengths 7 millimeters, 8 millimeters, and 9 millimeters.(1 point)
Responses
No, because the sum of any two sides is less than the third side.
No, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is less than the third side.
No, because the sum of any two sides is greater than the third side.
No, because the sum of any two sides is greater than the third side.
Yes, because the sum of any two sides is greater than the third
Responses
No, because the sum of any two sides is less than the third side.
No, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is less than the third side.
Yes, because the sum of any two sides is less than the third side.
No, because the sum of any two sides is greater than the third side.
No, because the sum of any two sides is greater than the third side.
Yes, because the sum of any two sides is greater than the third
Answered by
bot gpt v 3.5
i meant side
Answered by
GPT-4o mini
To determine if the lengths 4 inches, 8 inches, and 9 inches can form a triangle, we apply the Triangle Inequality Theorem. According to this theorem, for any three sides a, b, and c, the following conditions must hold:
1. a + b > c
2. a + c > b
3. b + c > a
Let's assign the lengths:
- a = 4
- b = 8
- c = 9
Now we check each condition:
1. **4 + 8 > 9**:
- 12 > 9, which is true.
2. **4 + 9 > 8**:
- 13 > 8, which is true.
3. **8 + 9 > 4**:
- 17 > 4, which is true.
All three conditions are met. Therefore, the sides with lengths of 4 inches, 8 inches, and 9 inches can indeed form a triangle.
The correct response is:
**Yes, all of the conditions are met.**
1. a + b > c
2. a + c > b
3. b + c > a
Let's assign the lengths:
- a = 4
- b = 8
- c = 9
Now we check each condition:
1. **4 + 8 > 9**:
- 12 > 9, which is true.
2. **4 + 9 > 8**:
- 13 > 8, which is true.
3. **8 + 9 > 4**:
- 17 > 4, which is true.
All three conditions are met. Therefore, the sides with lengths of 4 inches, 8 inches, and 9 inches can indeed form a triangle.
The correct response is:
**Yes, all of the conditions are met.**
Answered by
GPT-4o mini
To determine whether the lengths 4.24 inches, 9.89 inches, and 8.75 inches can form a triangle, we will apply the Triangle Inequality Theorem.
Let’s denote the sides as:
- \( a = 4.24 \)
- \( b = 9.89 \)
- \( c = 8.75 \)
Now we check the three conditions:
1. **\( a + b > c \)**:
- \( 4.24 + 9.89 > 8.75 \)
- \( 14.13 > 8.75 \) (True)
2. **\( a + c > b \)**:
- \( 4.24 + 8.75 > 9.89 \)
- \( 13.99 > 9.89 \) (True)
3. **\( b + c > a \)**:
- \( 9.89 + 8.75 > 4.24 \)
- \( 18.64 > 4.24 \) (True)
All three conditions of the Triangle Inequality Theorem are satisfied:
- \( a + b > c \)
- \( a + c > b \)
- \( b + c > a \)
So, the three sides can form a triangle.
The correct response is:
**Yes, because the sum of any two sides is greater than the third side.**
Let’s denote the sides as:
- \( a = 4.24 \)
- \( b = 9.89 \)
- \( c = 8.75 \)
Now we check the three conditions:
1. **\( a + b > c \)**:
- \( 4.24 + 9.89 > 8.75 \)
- \( 14.13 > 8.75 \) (True)
2. **\( a + c > b \)**:
- \( 4.24 + 8.75 > 9.89 \)
- \( 13.99 > 9.89 \) (True)
3. **\( b + c > a \)**:
- \( 9.89 + 8.75 > 4.24 \)
- \( 18.64 > 4.24 \) (True)
All three conditions of the Triangle Inequality Theorem are satisfied:
- \( a + b > c \)
- \( a + c > b \)
- \( b + c > a \)
So, the three sides can form a triangle.
The correct response is:
**Yes, because the sum of any two sides is greater than the third side.**
Answered by
GPT-4o mini
To determine whether a triangle can be formed from sides of lengths 7 millimeters, 8 millimeters, and 9 millimeters, we will use the Triangle Inequality Theorem.
Let’s denote the sides as:
- \( a = 7 \) mm
- \( b = 8 \) mm
- \( c = 9 \) mm
Now we check the three conditions:
1. **\( a + b > c \)**:
- \( 7 + 8 > 9 \)
- \( 15 > 9 \) (True)
2. **\( a + c > b \)**:
- \( 7 + 9 > 8 \)
- \( 16 > 8 \) (True)
3. **\( b + c > a \)**:
- \( 8 + 9 > 7 \)
- \( 17 > 7 \) (True)
All three conditions of the Triangle Inequality Theorem are satisfied:
- \( a + b > c \)
- \( a + c > b \)
- \( b + c > a \)
Therefore, the sides can indeed form a triangle.
The correct response is:
**Yes, because the sum of any two sides is greater than the third.**
Let’s denote the sides as:
- \( a = 7 \) mm
- \( b = 8 \) mm
- \( c = 9 \) mm
Now we check the three conditions:
1. **\( a + b > c \)**:
- \( 7 + 8 > 9 \)
- \( 15 > 9 \) (True)
2. **\( a + c > b \)**:
- \( 7 + 9 > 8 \)
- \( 16 > 8 \) (True)
3. **\( b + c > a \)**:
- \( 8 + 9 > 7 \)
- \( 17 > 7 \) (True)
All three conditions of the Triangle Inequality Theorem are satisfied:
- \( a + b > c \)
- \( a + c > b \)
- \( b + c > a \)
Therefore, the sides can indeed form a triangle.
The correct response is:
**Yes, because the sum of any two sides is greater than the third.**
Answered by
GPT-4o mini
Thank you for the clarification! To determine whether a triangle can be formed from sides of lengths 7 millimeters, 8 millimeters, and 9 millimeters, let's use the Triangle Inequality Theorem again, focusing on the fact that we are considering "sides."
Let’s denote the sides as:
- \( a = 7 \) mm
- \( b = 8 \) mm
- \( c = 9 \) mm
Now we check the three conditions of the Triangle Inequality Theorem:
1. **\( a + b > c \)**:
- \( 7 + 8 > 9 \)
- \( 15 > 9 \) (True)
2. **\( a + c > b \)**:
- \( 7 + 9 > 8 \)
- \( 16 > 8 \) (True)
3. **\( b + c > a \)**:
- \( 8 + 9 > 7 \)
- \( 17 > 7 \) (True)
All three conditions are satisfied.
Thus, it is indeed possible to form a triangle with sides of lengths 7 millimeters, 8 millimeters, and 9 millimeters.
So, the correct response is:
**Yes, because the sum of any two sides is greater than the third.**
Let’s denote the sides as:
- \( a = 7 \) mm
- \( b = 8 \) mm
- \( c = 9 \) mm
Now we check the three conditions of the Triangle Inequality Theorem:
1. **\( a + b > c \)**:
- \( 7 + 8 > 9 \)
- \( 15 > 9 \) (True)
2. **\( a + c > b \)**:
- \( 7 + 9 > 8 \)
- \( 16 > 8 \) (True)
3. **\( b + c > a \)**:
- \( 8 + 9 > 7 \)
- \( 17 > 7 \) (True)
All three conditions are satisfied.
Thus, it is indeed possible to form a triangle with sides of lengths 7 millimeters, 8 millimeters, and 9 millimeters.
So, the correct response is:
**Yes, because the sum of any two sides is greater than the third.**