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प्रश्न
Find three numbers in G.P. whose sum is 19 and product is 216.
योग
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उत्तर
Let the numbers are `a/r`, a, ar
Sum = 19
`a/r + a + ar` = 19
Product = 216
`a/r xx a xx ar` = 216
a3 = 216
= 63
a = 6
⇒ `a(1/r + 1 + r) = 19`
⇒ `6((1 + r + r^2)/r) = 19`
⇒ 6 + 6r + 6r2 = 19r
⇒ 6r2 − 13r + 6 = 0
⇒ 6r2 − 9r − 3r + 6 = 0
⇒ 3r(2r − 3) − 2(2r − 3) = 0
⇒ (2r − 3)(3r − 2) = 0
2r − 3 = 0
2r = 3
r = `3/2`
3r − 2 = 0
3r = 2
r = `2/3`
If r = `3/2` Numbers are `a/r`, a, ar
= `6/(3/2), 6, 6 xx 3/2`
= 4, 6, 9
If r = `2/3` Numbers are `a/r`, a, ar
= `6/(2/3), 6, 6 xx 2/3`
= 9, 6, 4
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