A) Rs. 198
B) Rs. 120
C) Rs. 180
D) Rs. 195
Correct Answer: B
Solution :
[b] Suppose A gets Rs. x Then B gets 125% of \[x=\frac{125}{100}\times x=Rs.\frac{5x}{4}\] If B gets Rs. 120, then C gets Rs. 100. If B gets \[\text{Rs}\text{.}\frac{5x}{4}\] then, C gets \[=\text{Rs}\text{.}\left( \frac{100}{120}\times \frac{5x}{4} \right)=\text{Rs}.\,\,\frac{25x}{24}\] \[\therefore \] \[x+\frac{5x}{4}+\frac{25x}{24}=395\] \[\Rightarrow \] \[(24x+30x+25x)=(395\times 24)\] \[\Rightarrow \] \[79x=(395\times 24)\] \[\Rightarrow \] \[x=\left( \frac{395\times 24}{79} \right)=120\] Hence, A gets Rs. 120. |
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