2020 CIME II Problems/Problem 3

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In a jar there are blue jelly beans and green jelly beans. Then, $15\%$ of the blue jelly beans are removed and $40\%$ of the green jelly beans are removed. If afterwards the total number of jelly beans is $80\%$ of the original number of jelly beans, then determine the percent of the remaining jelly beans that are blue.

Solution 1

Suppose there are $x$ jelly beans total at the beginning. Suppose further that there are $b$ blue jelly beans and $x-b$ green jelly beans. Then, after the removal, there will be $0.85b$ blue jelly beans and $0.6x-0.6b$ green jelly beans. Because the total number of jelly beans at the end is $80\%$ of the starting number, we can create an equation: \[0.6x+0.25b=0.8x\] \[0.2x=0.25b\] \[0.8x=b\] This tells us there were originally \[0.8x\] blue jelly beans and \[0.2x\] green jelly beans at the beginning, so now there must be \[0.68x\] blue and \[0.12x\] green. The percent of the remaining jelly beans that are blue is \[\frac{0.68x}{0.68x+0.12x}=\frac{68}{80}=\frac{85}{100},\] so the answer is $\boxed{085}$.

See also

2020 CIME II (ProblemsAnswer KeyResources)
Preceded by
Problem 2
Followed by
Problem 4
1 2 3 4 5 6 7 8 9 10 11 12 13 14 15
All CIME Problems and Solutions

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