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Question
Find five numbers in G. P. such that their product is 1024 and fifth term is square of the third term.
Sum
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Solution
Let the five numbers in G. P. be
`"a"/"r"^2, "a"/"r", "a", "ar", "ar"^2`
According to the given conditions,
`"a"/"r"^2 xx "a"/"r" xx "a" xx "ar" xx "ar"^2` = 1024
`"a"/cancel("r"^2) xx "a"/cancel("r") xx "a" xx "a"cancel("r") xx "a"cancel("r"^2)` = 1024
∴ a5 = 45
∴ a = 4 ...(i)
Also, ar2 = a2
∴ `"r"^2 = a^2/a`
∴ r2 = a
∴ r2 = 4 ...[From (i)]
∴ r = ± 2
When a = 4, r = 2
`"a"/"r"^2 = 1, "a"/"r" = 2`, a = 4, ar = 8, ar2 = 16
When a = 4, r = - 2
`"a"/"r"^2 = 1, "a"/"r" = - 2`, a = 4, ar = - 8, ar2 = 16
∴ The five numbers in G.P. are
1, 2, 4, 8, 16 or 1, - 2, 4, - 8, 16.
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