88. Let S be the sum, P the product and R the sum of reciprocals of n terms in a G.P. Prove that P²Rⁿ = Sⁿ.

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Payal Gupta | Contributor-Level 10

9 months ago

88. Let a and r be the first term & common ratio of the G.P.

So, S = a +ar + ar² +……… upto n terms.

$S = \frac{a (1 - r^{n})}{1 - r}$

and P = a .ar. ar² ar .... upton n terms.

$= a^{n} r^{1 + 2 + 3 + \dots + (n - 1)}$

$= a^{n} r \frac{(n - 1) (n - 1 + 1)}{2}$

$= a^{n} r \frac{n (n - 1)}{2}$

And R = sum of reciprocal of n terms ( $\frac{1}{a} + \frac{1}{a r^{n}} + . . . . . . . . . . .$ upto n terms)

$= \frac{\frac{1}{a} [{(\frac{1}{r})}^{n} - 1]}{\frac{1}{r} - 1}$ As r <1

$\frac{1}{r}$ >1

$= \frac{\frac{1}{a} [\frac{1}{r^{n}} - 1]}{\frac{1 - r}{r}} = \frac{1}{a} [\frac{1 - r^{n}}{r^{n}}] * \frac{r}{1 - r}$

$= \frac{1 - r^{n}}{a r^{n}} * \frac{r}{1 - r}$

$= \frac{1 - r^{n}}{a (1 - r) r^{n - 1}}$ …. III

Now, L.H.S. = P² Rⁿ

$= {[a^{n} r \frac{n (n - 1)}{2}]}^{2} \cdot {[\frac{1 - x^{n}}{a (1 - n) r^{n - 1}}]}^{n}$ { equation II & III}

$= a^{2 n} \cdot r^{n (n - 1)} * \frac{{[1 - r^{n}]}^{n}}{a^{n} (1 - n)^{n}} r^{n (n - 1)}$

$= a^{2 x - n} * \frac{r^{n (x - 1)}}{r^{n (n - 1)}} * \frac{{[1 - x^{n}]}^{n}}{{(1 - r)}^{n}}$

$= \frac{a^{n} {[1 - r^{n}]}^{n}}{{(1 - r)}^{n}}$

$= {[\frac{a [1 - r^{n}]}{(1 - r)}]}^{n}$

$= S^{n} =$ R.H.S { $?$ equation I}

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88. Let S be the sum, P the product and R the sum of reciprocals of n terms in a G.P. Prove that P2Rn = Sn.

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