| Euclid - 2001 - 420 páginas
[ Lo sentimos, el contenido de esta página está restringido. ] | |
| 2002 - 366 páginas
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| Dugald Stewart - 2006 - 504 páginas
[ Lo sentimos, el contenido de esta página está restringido. ] | |
| [ Lo sentimos, el contenido de esta página está restringido. ] | |
| 1897 - 734 páginas
...; the method is mathematically accurate, and is based upon a familiar proposition of Euclid, viz., that triangles on the same base, and between the same parallels, are equal (vide Euc. I. 37). Suppose it is required to reduce the figure ABCDEF — which is supposed to be plotted... | |
| Education Department - 1879 - 1118 páginas
...bisects it. If the diagonal also bisects the angles, show that the parallelogram is a rhombus. 2. Show that triangles on the same, base and between the same parallels are equal to each other. Hence show that a trapezium is equal in area to a triangle whose vertical height is... | |
| 464 páginas
...opposite sides of a straight line AB; join DQ, CP: prove that CDQP is a parallelogram. 4. (a) Prove that triangles on the same base and between the same parallels are equal in area. (6) FGH is a triangle, K is the mid.point of GH, and P is any point on FK ; prove that the... | |
| Thomas Hadyn Ward Hill - 190 páginas
...parallelograms on the same base and between the same parallels are equal in area. From this we have that triangles on the same base and between the same parallels are equal in area, and the converse; and also expressions for the areas of parallelograms, triangles, quadrilaterals... | |
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