The condition statements that must be met in order for three side lengths, a, b, and c, to create a triangle are:
1. a + b > c
2. b + c > a
3. a + c > b
Complete the condition statements that must be met in order for three side lengths— a , b , and c —to create a triangle.(1 point)
a
b+c and a
b−c
3 answers
can you be more specific
Yes, I can provide more specific conditions for the three side lengths a, b, and c to create a triangle.
For a triangle to be formed, the sum of the lengths of any two sides must be greater than the length of the third side. This can be expressed as:
1. a + b > c
2. b + c > a
3. a + c > b
If any of these conditions are not met, then the three side lengths a, b, and c cannot form a triangle.
For a triangle to be formed, the sum of the lengths of any two sides must be greater than the length of the third side. This can be expressed as:
1. a + b > c
2. b + c > a
3. a + c > b
If any of these conditions are not met, then the three side lengths a, b, and c cannot form a triangle.