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What does the triangle inequality theorem state?
The triangle inequality theorem states that any side of a triangle is always shorter than the sum of the other two sides.
Can two sides be congruent in the triangle inequality?
no.
What is the statement of the triangle inequality theorem?
jizz in your mouth
How can you use an inequality to describe the dimensions of a figure?
A scalene triangle can be identified by the inequality of the lengths of its sides and size of its angles.
What kind of triangle it used to describe for pythagorean inequality theorem?
Obtuse
Given three positive real numbers satisfying the triangle inequalities is it always possible to find a triangle having these as the dimensions?
Sure, that is exactly what the triangle inequality tells us!
Which of the following is the statement of the Triangle Inequality Theorem?
The sum of the lengths of any two sides of a triangle is greater than the length of the third side.
What is the triangle inequality?
The triangle inequality theory means that the two short sides of a triangle has to be greater when added up,than the longer side. Ex) 2+2=4(for the two smaller sides) The longer side being 2,so the other two sides are greater.Then can also it be a trinagle.
What is the triangle inequality theory?
The triangle inequality theory means that the two short sides of a triangle has to be greater when added up,than the longer side. Ex) 2+2=4(for the two smaller sides) The longer side being 2,so the other two sides are greater.Then can also it be a trinagle.
What is a statement of the triangle inequality theorem?
The triangle inequality theorem states that for any triangle, the sum of the lengths of any two sides must be greater than the length of the third side. Specifically, if a triangle has sides of lengths (a), (b), and (c), then the following inequalities must hold: (a + b > c), (a + c > b), and (b + c > a). This theorem is fundamental in geometry as it ensures that a valid triangle can be formed with the given side lengths.
The side of a triangle 78cm 20 cm and 22cm find its area?
It is not possible to have a triangle with sides of those lengths. The two shortest sides of a triangle must always add to more than the longest side. This is known as the triangle inequality.
Is it possible for a triangle to have sides with 15150.03?
A triangle can only exist if the lengths of its sides satisfy the triangle inequality theorem, which states that the sum of the lengths of any two sides must be greater than the length of the third side. Since you've provided only one side length (15150.03), we cannot determine if a triangle is possible without the lengths of the other two sides. If you provide additional side lengths, we can assess their validity based on the triangle inequality.
