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प्रश्न
If `(b + c - a)/(y + z - x) = (c + a - b)/(z + x - y) = (a + b - c)/(x + y - z)` then prove that each ratio is equal to `a/x = b/y = c/z`
प्रमेय
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उत्तर
`(b + c - a)/(y + z - x) = (c + a - b)/(z + x - y) = (a + b - c)/(x + y - z)`
Apply componendo,
⇒ `((b + c - a) + (c + a - b))/((y + z - x) + (z + x - y)) = ((c + a - b) + (a + b - c))/((z + x - y) + (x + y - z))`
⇒ `(2c)/(2z) = (2a)/(2x)`
⇒ `c/z = a/x` ...(1)
Apply componendo again,
⇒ `((b + c - a) + (a + b - c))/((y + z - x) + (x + y - z)) = ((b + c - a) + (c + a - b))/((y + z - x) + (z + x - y))`
⇒ `(2b)/(2y) = (2c)/(2z)`
⇒ `b/y = c/z` ...(2)
From (1) and (2):
`a/z = b/y = c/z`
Hence proved.
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