Respuesta :
Hello Tovarmackenzie!
We can utilize the Triangle Inequality Theorem, Which states
A + B > C
A + C > B
B + C > A
With that said, we are going look for C.
We know that
12 + 7 > C
So
19 > C
OR
C < 19
So our 3rd leg has to be less than 19.
So if we make C =18.999 and Sum up all the sides, 12 + 7 + 18.999 = 37.999
this means the max perimeter is 37.999.. so we know D: 38 cannot be the perimeter.
We can utilize the Triangle Inequality Theorem, Which states
A + B > C
A + C > B
B + C > A
With that said, we are going look for C.
We know that
12 + 7 > C
So
19 > C
OR
C < 19
So our 3rd leg has to be less than 19.
So if we make C =18.999 and Sum up all the sides, 12 + 7 + 18.999 = 37.999
this means the max perimeter is 37.999.. so we know D: 38 cannot be the perimeter.
38 cannot be the perimeter of the triangle.
What is Triangle Inequality Theorem?
The sum of any two sides of a triangle is greater than or equal to the third side.
Given:
Two sides are 12 and 7.
Using Triangle Inequality Theorem, we have
In ΔABC,
- AB + BC > CA
- AC + CB > BA
- AB + CA > BC
So,
12 + 7 > C
19 > C
C < 19
So, the third side should be less than 19.
Let us take maximum possible values,
C =18.999
Then, perimeter will be,
12 + 7 + 18.999 = 37.999
Hence, 38 cannot be the perimeter.
Learn more about Triangle Inequality Theorem here:
https://brainly.com/question/309896
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