1 answer
(click or scroll down)
There isn't a specific song for solving triangle measurements when given an unknown degree. However, you can use the concept of triangle inequality to solve for x in this case.
According to the triangle inequality theorem, the sum of any two sides of a triangle must be greater than the measure of the third side. In this case, we can set up the following inequalities:
75 + 41 > 3x + 19
41 + (3x + 19) > 75
75 + (3x + 19) > 41
Simplifying each inequality:
116 > 3x + 19
60 + 3x > 75
94 + 3x > 41
Solving each inequality:
97 > 3x
3x > 15
3x > -53
Dividing each inequality by 3:
32.33 > x
x > 5
x > -17.67
Therefore, x must be greater than 32.33, greater than 5, or greater than -17.67 to satisfy the triangle inequality.