Answer
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Step 1:: To solve this problem, we need to understand the concept of reflectional symmetry in triangles.
A triangle has reflectional symmetry if there is a line of reflection that maps the triangle to itself. In other words, if you fold the triangle along a line and the two halves match up perfectly, then the triangle has reflectional symmetry.
Step 2:: Looking at the given triangle, there is no line of reflection that can map the triangle to itself.
This is because the triangle is not isosceles (it doesn't have two sides of equal length) and it's not equilateral (it doesn't have all sides of equal length). Additionally, it's not right-angled, which means it can't have a vertical line of symmetry.
Step 3:: Therefore, based on the definition and properties of the triangle, it has 0 reflectional symmetries.
Final Answer
The given triangle has 0 reflectional symmetries.
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