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Question
Which term of the G.P.:
`-10, 5/sqrt(3), -5/6,....` is `-5/72`?
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Solution
For the given G.P. :
First term, a = –10
Common ratio, r = `(5/sqrt(3))/(-10) = -1/(2sqrt(3))`
If `-5/72` is the nth term of the given G.P., then `-5/(72)` = arn – 1
`\implies -5/72 = -10 xx (1/(2sqrt(3)))^(n - 1)`
`\implies 1/144 = (1/(2sqrt(3)))^(n - 1)`
`\implies 1/(2 xx 2 xx 2 xx 2 xx sqrt(3) xx sqrt(3) xx sqrt(3) xx sqrt(3)) =(1/(2sqrt3))^(n - 1)`
`\implies (1/(2sqrt3))^4=(1/(2sqrt3))^("n"-1)`
`\implies` n – 1 = 4
`\implies` n = 4 + 1
`\implies` n = 5
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