The area of two similar triangles is 25cm^2 and 121cm^2. If the median of the bigger triangle is 10 cm, then what will be the corresponding median of the smaller triangle?(a) \(\frac {51}{11}\)(b) \(\frac {10}{11}\)(c) \(\frac {50}{11}\)(d) \(\frac {5}{11}\)The question was posed to me in homework.My question comes from Area of Similar Triangle in section Triangles of Mathematics – Class 10

The area of two similar triangles is 25cm^2 and 121cm^2. If the median

1.	The area of two similar triangles is 25cm^2 and 121cm^2. If the median of the bigger triangle is 10 cm, then what will be the corresponding median of the smaller triangle?(a) \(\frac {51}{11}\)(b) \(\frac {10}{11}\)(c) \(\frac {50}{11}\)(d) \(\frac {5}{11}\)The question was posed to me in homework.My question comes from Area of Similar Triangle in section Triangles of Mathematics – Class 10
Answer» The correct answer is (d) \(\FRAC {5}{11}\) For explanation I would SAY: We know that the ratio of areas of SIMILAR triangles is equal to the ratio of the squares of their corresponding medians. Here the area of ∆ABC is 25cm^2 and area of ∆PQR is 121cm^2. Also, PS = 10 cm According to the theorem, \(\frac {area \, of \, triangle \, \triangle ABC}{area \, of \, triangle \, \triangle PQR}=(\frac {AD}{PS})\)^2 \(\frac {25}{121}=(\frac {AD}{10})\)^2 \(\sqrt {\frac {25}{121}}=\frac {AD}{10}\) \(\frac {AD}{10}=\frac {5}{11}\) PS = \(\frac {5}{11} × 10 = \frac {50}{11}\)

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