A triangle with a right angle and different lengths for sides is a right, scalene triangle.
Those wouldn't be angle measurements, they would be sides. A triangle could be constructed with sides of those lengths.
An isosceles triangle has two (or more) sides of equal length, while a scalene triangle has no correlation between side lengths/angle size.
No because the given sides do not comply with Pythagoras' theorem for a right angle triangle.
It depends on what information you have. There are formulae for when you have the lengths of all three sides or two sides and the angle between them. If you have only one side and two angles (implicitly all three) you can calculate the lengths of the other sides.
A triangle with a right angle and different lengths for sides is a right, scalene triangle.
A triangle with no right angle and sides of different lengths is a scalene triangle.
The lengths of all three sides of the triangle APEX:)
i depends of the lengths of the sides
A scalene triangle has 3 sides of different lengths An isosceles triangle has 2 sides of equal lengths An equilateral triangle has 3 sides of equal lengths
Those wouldn't be angle measurements, they would be sides. A triangle could be constructed with sides of those lengths.
An isosceles triangle has two (or more) sides of equal length, while a scalene triangle has no correlation between side lengths/angle size.
If those are the lengths of the triangle's sides, then you have a "right" triangle. The angle opposite the 5-inch side is a 90-degree angle.
the angle between the two sides is used in the formula A = 1/2 a*b*sin(C) where A is area, a and b are side lengths, and C is the angle between sides. Simply use algebra to rearrange the formula to solve for C.
To find side lengths on a triangle, you need to know at least one of the sides. The possible combinations for solving* a triangle are: side, side, side; side, angle, side; angle, side, angle; angle, side, longer side. *To solve a triangle is to find the lengths of all the sides and the measures of all the angles.
proportional /congruent
No because the given sides do not comply with Pythagoras' theorem for a right angle triangle.