That depends on what the side lengths are. Until the side lengths are known, the triangle can only be classified as a triangle.
I would place this triangle in the category of isosceles triangles, because the 10m side and the 10m side have equal lengths.
There are not any following lengths in the question to compare. Using the sizes given, and Pythagorean Theorem, the Hypotenuse of the triangle is 36.76 - which will have to do!
A scalene triangle is one type of triangle that will be formed from the given dimensions.
Yes, it is possible.
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.
I would place this triangle in the category of isosceles triangles, because the 10m side and the 10m side have equal lengths.
If you mean side lengths of 5, 4 and 1 then it is not possible to construct any triangle from the given dimensions.
Yes and the given lengths would form an isosceles triangle.
No because the given lengths don't comply with Pythagoras' theorem for a right angle triangle.
No. With the given side lengths the sum of the two shorter sides do not exceed the length of the longest side and would not meet to form a triangle
No because the given sides do not comply with Pythagoras' theorem for a right angle triangle.
There are not any following lengths in the question to compare. Using the sizes given, and Pythagorean Theorem, the Hypotenuse of the triangle is 36.76 - which will have to do!
Exactly one unique triangle exists with the given side lengths.thank u...
The triangle with side lengths of 6, 7, and 8 is classified as a scalene triangle. This is because all three sides have different lengths, and no two sides are equal. Additionally, since the lengths do not satisfy the conditions for an equilateral or isosceles triangle, scalene is the only classification that applies.
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A triangle formed from three given side lengths can be either unique or non-unique depending on the specific lengths. If the triangle inequality theorem is satisfied (the sum of the lengths of any two sides must be greater than the length of the third side), then only one unique triangle can be formed. However, if the side lengths are such that they can form a degenerate triangle (where the sum of two sides equals the third), or if two sides are equal and the third side allows for more than one valid configuration (as in some cases with isosceles triangles), more than one triangle can potentially be formed. In general, for three distinct side lengths that satisfy the triangle inequality, only one triangle exists.
A scalene triangle is one type of triangle that will be formed from the given dimensions.