if a triangle has side lengths of 22,32,and 55 units what type of triangle is it
acute,obtuse,right,no solution

Answer: No solution

A 'triangle' with side lengths of 22, 32, and 55 is no solution because it cannot form a triangle. In order for it to be a triangle, the sum of the two shorter side lengths must be greater than the longest side length.

22 + 32 < 55
54 < 55

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MrRoyal MrRoyal · Answer 2 · 2022-05-13T11:19:55+02:00

The triangle with the side lengths 22 units, 32 units and 55 units has no solution

How to determine the type of triangle?

The side lengths are given as:

22 units, 32 units and 55 units

To determine the type of the triangle, we make use of the following triangle inequality

x + y > z

Where the longest side is z.

So, we have:

22 + 32 > 55

Evaluate the sum

54 > 55

The above inequality is false.

Hence, the triangle has no solution

Read more about triangle inequality at:

https://brainly.com/question/9165828

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if a triangle has side lengths of 22,32,and 55 units what type of triangle is it acute,obtuse,right,no solution

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How to determine the type of triangle?

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if a triangle has side lengths of 22,32,and 55 units what type of triangle is it
acute,obtuse,right,no solution