There are several boxes with coins bearing a value (1 to n) each. The coins in

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There are several boxes with coins bearing a value (1 to n) each. The coins in different boxes are grouped as follows:- 1(first box), 2+3(second box), 4+5+6(third box), 7+8+9+10(fourth box), ..... and so on. The value of the coins in the 15th box is:

Options:

A . 2098

B . 1695

C . 5675

D . 1687.5

Answer: Option B
:
B

$\begin{matrix} 1 2 & 3 4 & 5 & 6 \end{matrix}$
This equation is based on the $\frac{n (n + 1)}{2}$ pattern, where the last coin in the nth box will have the value $\frac{n (n + 1)}{2}$ .
Thus the last coin in the $15^{t h}$ box will have a value $= \frac{15 \times 16}{2} = 120$
The first coin will have a value = 106
Thus the sum $= \frac{15}{2} (106 + 120) = 1695.$

As there are 15 coins in the 15th box and it is 15 numbers ... it has to be a multiple of 15. Only option (b) satisfies this condition.

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