Given AABD with midpoints E and F, complete part of a coordinate proof of the Triangle Midsegment Theorem. B(2a, 2b) E A(0, 0) D(2c, 0) By the Midpoint Formula, the coordinates of the midpoints [ Select ,b) and F(a + c. [ Select] are:E( [Sclect] ). The slope of EF [Sclect] and the slope of AD to AD [Select] so EF is Select]
Given AABD with midpoints E and F, complete part of a coordinate proof of the Triangle Midsegment Theorem. B(2a, 2b) E A(0, 0) D(2c, 0) By the Midpoint Formula, the coordinates of the midpoints [ Select ,b) and F(a + c. [ Select] are:E( [Sclect] ). The slope of EF [Sclect] and the slope of AD to AD [Select] so EF is Select]
Given AABD with midpoints E and F, complete part of a coordinate proof of the Triangle Midsegment Theorem. B(2a, 2b) E A(0, 0) D(2c, 0) By the Midpoint Formula, the coordinates of the midpoints [ Select ,b) and F(a + c. [ Select] are:E( [Sclect] ). The slope of EF [Sclect] and the slope of AD to AD [Select] so EF is Select]
Given triangle ABD with midpoints E and F, complete part of a coordinate proof of the triangle midsegment theorem
Polygon with three sides, three angles, and three vertices. Based on the properties of each side, the types of triangles are scalene (triangle with three three different lengths and three different angles), isosceles (angle with two equal sides and two equal angles), and equilateral (three equal sides and three angles of 60°). The types of angles are acute (less than 90°); obtuse (greater than 90°); and right (90°).
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