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Examples Similarity of Triangle- 6 Video Lecture - Class 10

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FAQs on Examples Similarity of Triangle- 6 Video Lecture - Class 10

1. What is the similarity of triangles?
Ans. The similarity of triangles refers to the property where two triangles have the same shape but may differ in size. In similar triangles, the corresponding angles are equal, and the corresponding sides are in proportion.
2. How can we prove that two triangles are similar?
Ans. Two triangles can be proven to be similar by satisfying any one of the following conditions: - Angle-Angle (AA) similarity: If two angles of one triangle are equal to two angles of another triangle, then the triangles are similar. - Side-Angle-Side (SAS) similarity: If one pair of corresponding sides is in proportion and the included angles are equal, then the triangles are similar. - Side-Side-Side (SSS) similarity: If all three pairs of corresponding sides are in proportion, then the triangles are similar.
3. How do we find the corresponding sides of similar triangles?
Ans. To find the corresponding sides of similar triangles, we can set up a proportion. By comparing the lengths of corresponding sides, we can write an equation and solve for the unknown lengths. For example, if the ratio of the lengths of two corresponding sides is 2:5, we can set up the proportion x/2 = y/5, where x and y represent the unknown lengths.
4. Can similar triangles have different areas?
Ans. Yes, similar triangles can have different areas. Although the shape and angle measurements are the same, the area of a triangle depends on the lengths of its sides. Since similar triangles can have different side lengths, their areas can also differ.
5. How can we apply the concept of similar triangles in real-life situations?
Ans. The concept of similar triangles finds applications in various real-life situations, such as: - Architecture and construction: Architects and engineers use similar triangles to scale down or up the dimensions of buildings or structures. - Map scaling: Cartographers use similar triangles to accurately represent large areas on a smaller map. - Shadow problems: By using similar triangles, we can determine the height of an object or the length of a shadow based on the length of a known shadow and its corresponding object's height.
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