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STD 11 - 8. sequence and series — JEE STD 11 Science — Question

Gujarat BoardEnglish MediumSTD 11 ScienceJEESTD 11 - 8. sequence and series4 Marks
Question
Let $a, b, c, d, e$ be natural numbers in an arithmetic progression such that $a+b+c+d+e$ is the cube of an integer and $b+c+d$ is square of an integer. The least possible value of the number of digits of $c$ is

Answer

b
(b)

We have,

$a, b, c, d, e$ are natural number and in AP.

Let $D$ is common difference of $AP$.

$\therefore$ Let $c=C$

$a =C-2 D$
$b =C-D$

$d =C+D$

$e =C+2 D$

$a+b+c+d+e=5 C$

and $b+c+d=3 C$

Given, $a+b+c+d+e$ is a cube of number

$\therefore 5 C=\lambda^3$

and $b+c+d$ is a square of number

$\therefore 3 C=u^2$

From Eqs.$(i)$ and $(ii)$, we get

$\frac{\lambda^3}{5}=\frac{u^2}{3}$

$\lambda^3$ and $u^2$ is a multiple of 15

$\therefore$ Smallest possible value of $\lambda=15$ and $u=45$

$\therefore \quad c=\frac{u^2}{3}=\frac{(45)^2}{3}=675$

$\therefore$ Number of digits $=3$

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