Mathematics
If a, b, c are in A.P., show that : (b + c), (c + a) and (a + b) are also in A.P.
AP GP
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Answer
Given,
a, b and c are in A.P.
∴ b - a = c - b
⇒ b + b = a + c
⇒ 2b = a + c
If (b + c), (c + a) and (a + b) are in A.P., then
⇒ (a + b) - (c + a) = (c + a) - (b + c)
⇒ a + b - c - a = c + a - b - c
⇒ b - c = a - b
⇒ b + b = a + c
⇒ 2b = a + c
Since, 2b = a + c is proved above.
Hence, proved that (b + c), (c + a) and (a + b) are also in A.P.
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