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There is no relationship between slope and the theorem, however the theorem does deal with the relationship between angles and sides of a triangle.
the relationship between them is that they are use in many ways of living
It depends on the relationship between the triangle and the square!
The sum of the interior angles of a triangle is equal to 180 degrees.
The three vertices of the triangle uniquely determine a circle that circumscribes the triangle. The three sides of the triangle uniquely determine the circle that inscribes the triangle.
The relationship between the area of a triangle and a rectangle is a Triangle is base times height divided by 2. Area of a rectangle is length times height.
There is no relationship between slope and the theorem, however the theorem does deal with the relationship between angles and sides of a triangle.
the relationship between them is that they are use in many ways of living
scalene
Pythagorus
It depends on the relationship between the triangle and the square!
The sum of the interior angles of a triangle is equal to 180 degrees.
They are the same size
If you're talking about convex polygons with equal sides (eg. equilateral triangles, squares, pentagons, hexagons, etc.), then the relationship is a very direct one. In those cases, there are as many lines of symmetry as there are points in the polygons. A triangle has three lines of symmetry, a square has four, a pentagon five, etc.
The answer will depend on the relationship - if any - between the rectangle and the triangle.
The three vertices of the triangle uniquely determine a circle that circumscribes the triangle. The three sides of the triangle uniquely determine the circle that inscribes the triangle.
They are the same.