For any three positive real numbers a, b and c, if $9 (25 a^{2} + b^{2}) + 25 (c^{2} - 3 a c) = 15 b (3 a + c)$ , then

b, c and a are in A.P

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b, c and a are in G.P

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a, b, and c are in A.P

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a, b and c are in G.P

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Solution

The correct option is A b, c and a are in A.P
We have,
$225 a^{2} + 9 b^{2} + 25 c^{2} - 75 a c - 45 a b - 15 b c = 0$
$\Rightarrow (15 a)^{2} + (3 b)^{2} + (5 c)^{2} - (15 a) (5 c) - (15 a) (3 b) - (3 b) (5 c) = 0$
$\Rightarrow \frac{1}{2} [(15 a - 3 b)^{2} + (3 b - 5 c)^{2} + (5 c - 15 a)^{2}] = 0$
$\Rightarrow 15 a = 3 b, 3 b = 5 c$
and $5 c = 15 a$
$∴ 15 a = 3 b = 5 c$
$\Rightarrow \frac{a}{1} = \frac{b}{5} = \frac{c}{3} = λ (s a y)$
$\Rightarrow a = λ, b = 5 λ, c = 3 λ$
Hence, b, c and a are in AP.

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Similar questions

9 ({25 a}^{2} + b^{2}) + 25 (c^{2} - 3 a c) = 15 b (3 a + c) .

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9 (25 a^{2} + b^{2}) + 25 (c^{2} - 3 a c) = 15 b (3 a + c) .

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