Question
Which of the following sets of numbers could represent the three sides of a triangle?
Answer
Multiple Choice Answers
left curly bracket, 13, comma, 25, comma, 40, right curly bracket{13,25,40}
left curly bracket, 10, comma, 16, comma, 25, right curly bracket{10,16,25}
left curly bracket, 6, comma, 18, comma, 25, right curly bracket{6,18,25}
left curly bracket, 13, comma, 22, comma, 35, right curly bracket{13,22,35}
Answer
Multiple Choice Answers
left curly bracket, 13, comma, 25, comma, 40, right curly bracket{13,25,40}
left curly bracket, 10, comma, 16, comma, 25, right curly bracket{10,16,25}
left curly bracket, 6, comma, 18, comma, 25, right curly bracket{6,18,25}
left curly bracket, 13, comma, 22, comma, 35, right curly bracket{13,22,35}
Answers
Answered by
GPT-4o mini
To determine if a set of numbers can represent the lengths of the sides of a triangle, we can use the triangle inequality theorem. This theorem states that for any triangle with sides of lengths \(a\), \(b\), and \(c\), the following inequalities must hold:
1. \(a + b > c\)
2. \(a + c > b\)
3. \(b + c > a\)
Let’s evaluate each set of numbers:
1. **Set: {13, 25, 40}**
- \(13 + 25 = 38\) (not greater than 40)
- \(13 + 40 = 53\) (greater than 25)
- \(25 + 40 = 65\) (greater than 13)
- **This set does not satisfy the triangle inequalities.**
2. **Set: {10, 16, 25}**
- \(10 + 16 = 26\) (greater than 25)
- \(10 + 25 = 35\) (greater than 16)
- \(16 + 25 = 41\) (greater than 10)
- **This set satisfies all triangle inequalities.**
3. **Set: {6, 18, 25}**
- \(6 + 18 = 24\) (not greater than 25)
- \(6 + 25 = 31\) (greater than 18)
- \(18 + 25 = 43\) (greater than 6)
- **This set does not satisfy the triangle inequalities.**
4. **Set: {13, 22, 35}**
- \(13 + 22 = 35\) (not greater than 35)
- \(13 + 35 = 48\) (greater than 22)
- \(22 + 35 = 57\) (greater than 13)
- **This set does not satisfy the triangle inequalities.**
Based on the evaluations, the only set of numbers that could represent the lengths of the sides of a triangle is:
**{10, 16, 25}**.
1. \(a + b > c\)
2. \(a + c > b\)
3. \(b + c > a\)
Let’s evaluate each set of numbers:
1. **Set: {13, 25, 40}**
- \(13 + 25 = 38\) (not greater than 40)
- \(13 + 40 = 53\) (greater than 25)
- \(25 + 40 = 65\) (greater than 13)
- **This set does not satisfy the triangle inequalities.**
2. **Set: {10, 16, 25}**
- \(10 + 16 = 26\) (greater than 25)
- \(10 + 25 = 35\) (greater than 16)
- \(16 + 25 = 41\) (greater than 10)
- **This set satisfies all triangle inequalities.**
3. **Set: {6, 18, 25}**
- \(6 + 18 = 24\) (not greater than 25)
- \(6 + 25 = 31\) (greater than 18)
- \(18 + 25 = 43\) (greater than 6)
- **This set does not satisfy the triangle inequalities.**
4. **Set: {13, 22, 35}**
- \(13 + 22 = 35\) (not greater than 35)
- \(13 + 35 = 48\) (greater than 22)
- \(22 + 35 = 57\) (greater than 13)
- **This set does not satisfy the triangle inequalities.**
Based on the evaluations, the only set of numbers that could represent the lengths of the sides of a triangle is:
**{10, 16, 25}**.
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