# Problem Solving With Similar Figures Essay On My Name Is Khan Lucky for you, this tutorial will teach you some great tricks for remembering what numerators and denominators are all about.Sometimes the hardest part of a word problem is figuring out how to turn the words into an equation you can solve.The road map between Steve’s home and his friend’s as well as the distances known to Steve are as shown in the figure below.Guide Steve to reach his friend’s house using the shortest path.

Make ratios from corresponding sides and set up a proportion!Therefore, $\frac = \frac = \frac = \frac \Rightarrow AB = \frac = 24m$ x = AB - 8 = 24 - 8 = 16m Hence, the new post should be placed at a distance of 16m from the existing post.Since the construction is forming right-angle triangles, we can calculate the travel distance of the product as follows: $AE = \sqrt = \sqrt = 8.54m$ Similarly, $AC = \sqrt = \sqrt = 25.63m$ which is the distance the product is currently travelling to reach the existing level.The road map can be geometrically expressed as shown by the figure below.You may notice that the two triangles ΔABC and ΔCDE are similar and therefore: $\frac = \frac = \frac$ From the problem description, we have: AB = 15km, AC = 13.13km, CD = 4.41km and DE = 5km From the above, we can calculate the following lengths: $BC = \frac = \frac = 13.23km$ $CE = \frac = \frac = 4.38km$ In order for Steve to reach his friend’s house, he may follow any of the following routes: A - Trisha wants to measure the height of a building but she does not have the tools to do so.Therefore, for identical triangles: $\frac=\frac=\frac=1$ Therefore, all identical triangles are similar. Although the above shows that we need to know the measures of the three angles or the lengths of the three sides of each triangle in order to decide whether the two triangles are similar or not, it would be sufficient, for solving problems involving similar triangles, to know only three of the above measures for each triangle.These measures can be any of the following combinations: 1) the three angles of each triangle (without the need to know the lengths of their sides).Solve the proportion to get your missing measurement. Ingredients sometimes need to be mixed using ratios such as the ratio of water to cement mix when making cement. Then think of some ratios you've encountered before!Figure out how to do all that by watching this tutorial! Numerators and denominators are the key ingredients that make fractions, so if you want to work with fractions, you have to know what numerators and denominators are.The ratio of the length of two sides of one triangle to the corresponding sides in the other triangle is the same and the angles between these sides are equal i.e.: $\frac=\frac$ and $\angle A_1 = \angle A_2$ or $\frac=\frac$ and $\angle B_1 = \angle B_2$ or $\frac=\frac$ and $\angle C_1 = \angle C_2$ Be careful not to mix similar triangles with identical triangle.Identical triangles are those having the same corresponding sides’ lengths.

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