In an examination, $35$% of the candidates failed in Mathematics and $25$% in English. If $10$% failed in both Math and English then how many percent passed in both the subjects?
ATTEMPT Let $x$ be total candidates. Then $\frac{35x}{100}$ failed in Math, $\frac{x}{4}$ failed in English, $\frac{x}{10}$ failed in both.
So now i look for candidates who failed in either Math or English which is the union of the above two.
Candidates who failed in either Math or English = Candidates who failed in Maths + Candidates who failed in English - Candidates who failed in both.
SO it becomes $7x/20 + x/4 - x/10$
Now percent of candidates who passed in both are $1 - \{ 7x/20 + x/4 - x/10 \}$.
But i am kind of stuck here. Thanks.