List the sides in order from shortest to longest in xyz with m<x=50 m<y=5×+10 and m<z=5x
the sum of angles is 180
50+5x+10+5x=180
10x=120
x=12
angles: 50,70,60
longest sides are opposite largest angles: short to long, X,Z,Y
Sure, here's the order of the sides from shortest to longest:
1) The shortest side would have to be yz because y = 5x + 10.
2) The next longest side would be xy since x = 50.
3) Finally, the longest side would be xz because z = 5x.
So the order is yz, xy, and then xz.
Remember, even though y might be a straight line in the equation, there's always a funnier way to bend it.
To list the sides of the triangle xyz from shortest to longest, we need to analyze the given angle measures.
Given:
m< x = 50
m< y = 5x + 10
m< z = 5x
To determine the lengths of the sides, we need more information. Angle measures alone are not sufficient to find the side lengths of a triangle. We need either the lengths of the sides or additional information (such as similarity or congruence).
If you have additional information or if you have the lengths of the sides, please provide them so I can assist you further.
To determine the order of the sides from shortest to longest in triangle XYZ, we need to compare their lengths.
We have three angles given: m<𝑥 = 50, m<𝑦 = 5𝑥+10, and m<𝑧 = 5𝑥.
However, to determine the lengths of the sides, we also need more information, such as the lengths of other sides or additional angle measures. Without that information, we cannot directly determine the lengths of the sides or their order from shortest to longest.
Please provide any additional information or measurements to proceed with solving this problem.