Applicants for the doctoral programmes of Ambi Institute of Engineering $\text{(AIE)}$ and Bambi Institute of Engineering $\text{(BIE)}$ have to appear for a Common Entrance Test $\text{(CET)}$. The test has three sections: Physics $\text{(P)}$, Chemistry $\text{(C)}$, and Maths $\text{(M)}$. Among those appearing for $\text{CET}$, those at or above the $80$th percentile in at least two sections, and at or above the $90$th percentile overall, are selected for Advanced Entrance Test $\text{(AET)}$ conducted by $\text{(AIE)}$. $\text{AET}$ is used by $\text{AIE}$ for final selection.
For the $200$ candidates who are at or above the $90$th percentile over all based on $\text{CET}$, the following are known about their performance in $\text{CET}$:
- No one is below the $80$th percentile in all $3$ sections.
- $150$ are at or above the $80$th percentile in exactly two sections.
- The number of candidates at or above the $80$th percentile only in $\text{P}$ is the same as the number of candidates at or above the $80$th percentile only in $\text{C}$. The same is the number of candidates at or above the $80$th percentile only in $\text{M}$.
- Number of candidates below $80$th percentile in $\text{P}$: Number of candidates below $80$th percentile in $\text{C}$: Number of candidates below $80$th percentile in $\text{M}=4:2:1$.
$\text{BIE}$ uses a different process for selection. If any candidate is appearing in the $\text{AET}$ by $\text{AlE}$, $\text{BIE}$ considers their $\text{AET}$ score for final selection provided the candidate is at or above the $80$th percentile in $\text{P}$. Any other candidate at or above the $80$th percentile in $\text{P}$ in $\text{CET}$, but who is not eligible for the $\text{AET}$, is required to appear in a separate test to be conducted by $\text{BIE}$ for being considered for final selection. Altogether, there are $400$ candidates this year who are at or above the $80$th percentile in $\text{P}$.
If the number of candidates who are at or above the $90$th percentile overall and also at or above the $80$th percentile in all three sections in $\text{CET}$ is actually a multiple of $5$, what is the number of candidates who are at or above the $90$th percentile overall and at or above the $80$th percentile in both $\text{P}$ and $\text{M}$ in $\text{CET}?$
- $59$
- $60$
- $61$
- $58$