| Thomas Hill - 1855 - 152 Seiten
...6. This Pythagorean* proposition gives us a good way of trying whether an angle is a right angle. If the sum of the squares on two sides of a triangle is just equal to the square on the third side, we may know that the angle opposite this third side is... | |
| William Thomas Brande, George William Cox - 1866 - 972 Seiten
...square on one side is equal to the sum of the squares on the other two ; according to the second, if the sum of the squares on two sides of a triangle is equal to the square on the third side, the triangle is right-angled. HYPOTHESIS. In Physics and Natural Science,... | |
| Euclid, Isaac Todhunter - 1867 - 424 Seiten
...himself the requisite figures in the cases where they are not given. 1. The tum of the squares on the sides of a triangle •is equal to twice the square on half the base, together with twice the square on the straight line which joins the vertex to the middle point... | |
| Euclid, Isaac Todhunter - 1867 - 426 Seiten
...the requisite figures in the cases where they are not given. 1. Tlie sum 'f fhe squares on the tidei of a triangle is equal to twice the square on half the base, together with twice the square on the straight line which joint the vertex to the middle point... | |
| Association for the improvement of geometrical teaching - 1876 - 66 Seiten
...is less than, equal to, or greater than, the sum of the squares on the other tsvo sides. THEOR. 12. The sum of the squares on two sides of a triangle is double the sum of the squares on half the base and on the line joining the vertex to the middle point... | |
| Queensland. Department of Public Instruction - 1909 - 144 Seiten
...given the base, the vertical angle, and the difference of the sides. 11. Prove that the difference of the squares on two sides of a triangle is equal to twice the rectangle rontainrd by the third side and the distance of its mid-point from the foot of the altitude... | |
| James McDowell - 1878 - 310 Seiten
...AC is equal to twice the rectangle under BC and DE. Q. i '.. I). 41. The sum of the squares on the sides of a triangle is equal to twice the square on half the base, together with twice tlie square on the bisector of base. In the figures to (40), the triangle... | |
| James Maurice Wilson - 1878 - 450 Seiten
...is less than, equal to, or greater than the sum of the squares on the other two sides. THEOREM 12. The sum of the squares on two sides of a triangle is double the sum of the squares on half the base and on the line joining the vertex to the middle point... | |
| Oxford univ, local exams - 1880 - 396 Seiten
...triangle, having each of the angles at the base double of the third angle. 9. The sum of the squares on the sides of a triangle is equal to twice the square on half the base, together with twice the square on the straight line which joins the middle point of the base... | |
| 1882 - 486 Seiten
...the fcot of tha perpendicular let fall from the opposite angle. This is Euclid, II. 18. 4. Prove that the sum of the squares on two sides of a triangle is double the sum of the squares on half the base and on the line joining the vertex to the middle point... | |
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