If a1,a2,a3,…… are in a harmonic progression with a1=5 and a20=25. Then, the least positive integer n for which an<0, is
A
22
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B
23
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C
24
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D
25
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Solution
The correct option is D 25 nth term of HP, tn=1a+(n−1)n
Here, a1=5,a20=25 for HP ∴1a=5 and 1a+19d=25 ⇒15+19d=125 ⇒19d=125−15=−425 ∴d=−419×25
Since, an<0 ⇒15+(n−1)d<0 ⇒15−419×25(n−1)<0⇒(n−1)>954 ⇒n>1+954 or n>24.75 ∴ Least positive value of n = 25