Apply the Triangle Inequality Theorem to determine the possible whole number measures of the third side of a triangle if the first two sides measure 6 and 2. List them in ascending order.

Question

Apply the Triangle Inequality Theorem to determine the possible whole number measures of the third side of a triangle if the first two sides measure 6 and 2. List them in ascending order.

Answer 1

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.

Given that the first two sides measure 6 and 2, we have:

6 + 2 > x
8 > x

Therefore, the possible whole number measures of the third side (x) must be less than 8.

The possible whole number measures of the third side, in ascending order, are:
1, 3, 4, 5, 6, 7

Answer 2

well what is it

Answer 3

I apologize for not providing the exact answer. The possible whole number measures of the third side of the triangle, in ascending order, are:

1, 3, 4, 5, 6, 7

Answer 4

I apologize for the oversight. Let's clarify the possible whole number measures of the third side of the triangle using the Triangle Inequality Theorem.

Given that the first two sides measure 6 and 2, the third side (let's call it x) must follow the triangle inequality theorem:

6 + 2 > x
8> x

Therefore, the possible whole number measures of the third side must be less than 8. The only whole number that meets this condition and is greater than 2 is:

x = 3

Therefore, the only possible whole number measure of the third side is 3.

Answer 5

what 2 others

Answer 6

I apologize for the confusion. Let's reevaluate the possible whole number measures of the third side using the Triangle Inequality Theorem.

Given that the first two sides measure 6 and 2, the third side (let's call it x) must follow the triangle inequality theorem:

6 + 2 > x
8 > x

The possible whole number measures of the third side that are less than 8 and greater than 2 are:

3, 4, 5, 6, 7

Therefore, in ascending order, the possible whole number measures of the third side are:

3, 4, 5, 6, 7

Answer 7

what 3 are correct

Answer 8

I apologize for the errors in my previous responses. Let's determine the correct possible whole number measures of the third side of the triangle using the Triangle Inequality Theorem.

Given that the first two sides measure 6 and 2, the third side (let's call it x) must follow the triangle inequality theorem:

6 + 2 > x
8 > x

The possible whole number measures of the third side that are less than 8 and greater than 2 are:

3, 4, 5, 6, 7

In ascending order, the correct possible whole number measures of the third side are:

3, 4, 5

Apply the Triangle Inequality Theorem to determine the possible whole number measures of the third side of a triangle if the first two sides measure 6 and 2. List them in ascending order.

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.

well what is it

I apologize for not providing the exact answer. The possible whole number measures of the third side of the triangle, in ascending order, are:

which one

I apologize for the oversight. Let's clarify the possible whole number measures of the third side of the triangle using the Triangle Inequality Theorem.

what 2 others

I apologize for the confusion. Let's reevaluate the possible whole number measures of the third side using the Triangle Inequality Theorem.

what 3 are correct

I apologize for the errors in my previous responses. Let's determine the correct possible whole number measures of the third side of the triangle using the Triangle Inequality Theorem.