Sequences And Series Ques 59
Let $b _i>1$ for $i=1,2, \ldots, 101$. Suppose $\log _e b _1, \log _e b _2$, $\ldots, \log _e b _{101}$ are in AP with the common difference $\log _e 2$ . Suppose $a _1, a _2, \ldots, a _{101}$ are in AP, such that $a _1=b _1$ and $a _{51}=b _{51}$. If $t=b _1+b _2+\ldots+b _{51} \quad$ and $s=a _1+a _2+\ldots+a _{51}$, then
(2016 Adv.)
(a) $s>t$ and $a _{101}>b _{101}$
(b) $s>t$ and $a _{101}<b _{101}$
(c) $s<t$ and $a _{101}>b _{101}$
(d) $s<t$ and $a _{101}<b _{101}$
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Answer:
Correct Answer: 59.(b)
Solution:
- If $\log b _1, \log b _2, \ldots, \log b _{101}$ are in $AP$, with common difference $\log _e 2$, then $b _1, b _2, \ldots, b _{101}$ are in GP, with common ratio 2 .
$\therefore b _1=2^{0} b _1, b _2=2^{1} b _1, b _3=2^{2} b _1, \ldots, b _{101}=2^{100} b _1 \quad …….(i)$
Also, $a _1, a _2, \ldots, a _{101}$ are in AP.
Given, $\quad a _1=b _1$ and $a _{51}=b _{51}$
$ \begin{array}{llll} \Rightarrow & a _1+50 D=2^{50} b _1 \\ \Rightarrow & a _1+50 D=2^{50} a _1 \quad\left[\because a _1=b _1\right] . \quad …….(ii) \end{array} $
Now, $\quad t=b _1+b _2+\ldots+b _{51}$
$\Rightarrow \quad t=b _1 \frac{\left(2^{51}-1\right)}{2-1} \quad …….(iii) $
and $\quad s=a _1+a _2+\ldots+a _{51}$
$ =\frac{51}{2}\left(2 a _1+50 D\right) \quad …….(iv) $
$ \therefore \quad t=a _1\left(2^{51}-1\right) \quad\left[\because a _1=b _1\right] $
or $\quad t=2^{51} a _1-a _1<2^{51} a _1 \quad …….(i)$
and $s=\frac{51}{2}\left[a _1+\left(a _1+50 D\right)\right] \quad$ [from Eq. (ii)]
$ =\frac{51}{2}\left[a _1+2^{50} a _1\right] $
$ =\frac{51}{2} a _1+\frac{51}{2} 2^{50} a _1 $
$\therefore \quad s>2^{51} a _1 \quad …….(vi)$
From Eqs. (v) and (vi), we get $s>t$
Also, $\quad a _{101}=a _1+100 D$ and $b _{101}=2^{100} b _1$
$ \begin{aligned} & \therefore \quad a _{101}=a _1+100 (\frac{2^{50} a _1-a _1}{50}) \text { and } b _{101}=2^{100} a _1 \\ & \Rightarrow \quad a _{101}=a _1+2^{51} a _1-2 a _1=2^{51} a _1-a _1 \\ & \Rightarrow \quad a _{101}<2^{51} a _1 \text { and } b _{101}>2^{51} a _1 \\ & \Rightarrow \quad b _{101}>a _{101} \end{aligned} $
BETA
