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Complete the condition statements that must be met in order for three sides lengths-a, b, and c-to create a triangle. (1 point)...Asked by .
Complete the condition statements that must be met in order for three side lengths— a , b , and c —to create a triangle.
a__b+c and a__b−c
a__b+c and a__b−c
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GPT-4o mini
To determine whether three side lengths \( a \), \( b \), and \( c \) can form a triangle, the following triangle inequalities must be satisfied:
1. \( a < b + c \)
2. \( b < a + c \)
3. \( c < a + b \)
So, for your statements, it would be:
- \( a < b + c \)
- \( a > b - c \)
However, the second part should actually be phrased to reflect the triangle inequality rule:
- \( a + b > c \)
In summary, the correct inequalities derived from the triangle inequality are:
1. \( a < b + c \)
2. \( b < a + c \)
3. \( c < a + b \)
1. \( a < b + c \)
2. \( b < a + c \)
3. \( c < a + b \)
So, for your statements, it would be:
- \( a < b + c \)
- \( a > b - c \)
However, the second part should actually be phrased to reflect the triangle inequality rule:
- \( a + b > c \)
In summary, the correct inequalities derived from the triangle inequality are:
1. \( a < b + c \)
2. \( b < a + c \)
3. \( c < a + b \)
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