Relationship between the lengths and the measures of angles are related to theorems like the opposite side of the largest angle is the largest side two equal angles oppositee sides are also equal
They are of the same lengths
The Theorem of Pythagoras.
Those wouldn't be angle measurements, they would be sides. A triangle could be constructed with sides of those lengths.
The Pythagorean Theorem is not a triangle. It's a statement that describes a relationship among the lengths of the sides in any right triangle.
If it is and equilateral triangle, the perimeter is 12, otherwise it is impossible to figure out without any angle measurements or other sides lengths
They are of the same lengths
A scalene triangle is simply a triangle where all of its sides are different lengths. One example of the side lengths of a scalene triangle are: 5cm, 6cm and 7cm
i depends of the lengths of the sides
It literally doesn't matter what the lengths are of the measurements of the right triangle, as long as one of the angles is indeed 90 degrees.
Relationship between the lengths and the measures of angles are related to theorems like the opposite side of the largest angle is the largest side two equal angles oppositee sides are also equal
In a right triangle, the side lengths follow Pythagora's Theorem: a^2 + b^2 = c^2; where a and b represent the lengths of the legs and c represents the hypotenuse.
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
The Theorem of Pythagoras.
The list that accompanies the question doesn't contain any numbers that could be the lengths of the sides of a triangle.
A triangle has 3 sides. You have provided 4 measurements. There is therefore some confusion here as to what these numbers mean.
Those wouldn't be angle measurements, they would be sides. A triangle could be constructed with sides of those lengths.
The Pythagorean Theorem is not a triangle. It's a statement that describes a relationship among the lengths of the sides in any right triangle.