(7) शिक्षकों और (9) छात्रों में से (5) लोगों का समूह बनाना है जिसमें कम से कम (2) शिक्षक हों। कितने तरीके हैं?
From (7) teachers and (9) students a group of (5) people is to be formed with at least (2) teachers. How many ways are there?
Explanation opens after your attempt
B. (3213)
Concept
Total ways are \(\binom{16}{5}=4368\). Removing the cases of (0) teacher and (1) teacher gives \(4368-\binom{9}{5}-\binom{7}{1}\binom{9}{4}=3213\).
Why this answer is correct
The correct answer is B. (3213). Total ways are \(\binom{16}{5}=4368\). Removing the cases of (0) teacher and (1) teacher gives \(4368-\binom{9}{5}-\binom{7}{1}\binom{9}{4}=3213\).
Exam Tip
कुल \(\binom{16}{5}=4368\) हैं। (0) शिक्षक और (1) शिक्षक के मामले हटाने पर \(4368-\binom{9}{5}-\binom{7}{1}\binom{9}{4}=3213\) है।
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