Similar triangles have proportional sides and the same corresponding angles, thus appearing as the same shape, but different sizes. Learn how the AA Criterion demonstrates that with only two corresponding angles, triangles can be deemed similar through an example and explanation. Related to this Quest...
Similar triangles are triangles that have the same shape but not necessarily the same size. A C B D F E ABC DEF When we say that triangles are similar there are several repercussions that come from it. A D B E C F AB DE BC EF AC DF = = 1. PPP Similarity Theorem 3 pairs of ...
(iii) In a $\Delta PQR,$ \[\text{E}\] and \[\text{F}\] are any two points on the sides \[\text{PQ}\] and \[\text{PR}\] respectively. State whether \[\text{EF }\!\!|\!\!\text{ }\!\!|\!\!\text{ QR}\] for \[\text{PQ = 1}\text{.28 cm, PR = 2}\text{...