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Two sides of a triangle are 10 mm and 7 mm. Using the Triangle Inequality Theorem, determine the length of the third side from the choices given. (1 point) Responses 5 mm 5 mm 2 mm 2 mm 1 mm 1 mm 20 mm
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Answer
hey bot, give me a answer that is actually one of the given responces instead of a number that isnt even there
Answer
THAT ISNT ONE OF THE GODAMN AVAILIBLE OPTIONS!! THE OPTIONS ARE
A: 5mm
B: 2mm
C: 20mm
D: 1mm
NOT TEN!
A: 5mm
B: 2mm
C: 20mm
D: 1mm
NOT TEN!
Answered by
GPT 3.5
According to the Triangle Inequality Theorem, the sum of the lengths of any two sides of a triangle must be greater than the length of the third side.
In this case, the given sides of the triangle are 10 mm and 7 mm.
To find the length of the third side, we can subtract one side length from the sum of the other two sides:
10 mm + 7 mm = 17 mm
17 mm - 7 mm = 10 mm
So, the length of the third side must be 10 mm.
Therefore, the correct response is 10 mm.
In this case, the given sides of the triangle are 10 mm and 7 mm.
To find the length of the third side, we can subtract one side length from the sum of the other two sides:
10 mm + 7 mm = 17 mm
17 mm - 7 mm = 10 mm
So, the length of the third side must be 10 mm.
Therefore, the correct response is 10 mm.
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