A triangle is considered a stronger structural shape than a trapezoid because it distributes forces more evenly across its three sides, maintaining its shape under stress without deformation. Triangles have inherent stability; when force is applied, the shape does not change, whereas trapezoids can become unstable and distort under load. This characteristic makes triangles the preferred choice in engineering and construction for frameworks and support structures.
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No because the sum of the 2 smaller sides of a triangle must be greater than its longest side in order to construct a triangle.
There is no such triangle because in order to construct a triangle the sum of its 2 smaller sides must be greater than its longest side.
Such a triangle would be impossible to construct with the given 3 dimensions because in order to construct a triangle the sum of its 2 shortest sides must be greater than the length of its longest side.
No because in order to construct a triangle the sum of its 2 smaller sides must be greater than its longest side.
One. A triangle has 3, a trapezoid has 4.
Triangle
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No because the sum of the 2 smaller sides of a triangle must be greater than its longest side in order to construct a triangle.
There is no such triangle because in order to construct a triangle the sum of its 2 smaller sides must be greater than its longest side.
Such a triangle would be impossible to construct with the given 3 dimensions because in order to construct a triangle the sum of its 2 shortest sides must be greater than the length of its longest side.
No because in order to construct a triangle the sum of its 2 smallest sides must be greater than its longest side
No because in order to construct a triangle the sum of its 2 smaller sides must be greater than its longest side.
No the given measurements would not make a triangle because in order to construct a triangle the sum of its smallest sides must be greater than its longest side.
You cannot construct a triangle ABC if the lengths of the sides do not 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. For example, if the side lengths are 2, 3, and 6, then 2 + 3 is not greater than 6, making it impossible to form a triangle. Additionally, if any side length is zero or negative, a triangle cannot be formed.
In order to construct a triangle the sum of its 2 smallest sides must be greater than its longest side.
Square, circle, rectangle, octagon, pentagon, triangle, hexagon, trapezoid, rhombus. These are just some