(9) पुरुषों और (8) महिलाओं में से (6) व्यक्ति चुनने हैं जिनमें कम से कम (3) महिलाएं हों। कितने तरीके हैं?

From (9) men and (8) women (6) persons are to be selected with at least (3) women. How many ways are there?

Explanation opens after your attempt
Correct Answer

D. (7756)

Step 1

Concept

The number of women can be (3), (4), (5), or (6). The correct sum is \(\binom{8}{3}\binom{9}{3}+\binom{8}{4}\binom{9}{2}+\binom{8}{5}\binom{9}{1}+\binom{8}{6}=7756\).

Step 2

Why this answer is correct

The correct answer is D. (7756). The number of women can be (3), (4), (5), or (6). The correct sum is \(\binom{8}{3}\binom{9}{3}+\binom{8}{4}\binom{9}{2}+\binom{8}{5}\binom{9}{1}+\binom{8}{6}=7756\).

Step 3

Exam Tip

महिलाएं (3), (4), (5) या (6) हो सकती हैं। सही योग \(\binom{8}{3}\binom{9}{3}+\binom{8}{4}\binom{9}{2}+\binom{8}{5}\binom{9}{1}+\binom{8}{6}=7756\) है।

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Mathematics Answer, Explanation and Revision Hints

(9) पुरुषों और (8) महिलाओं में से (6) व्यक्ति चुनने हैं जिनमें कम से कम (3) महिलाएं हों। कितने तरीके हैं? / From (9) men and (8) women (6) persons are to be selected with at least (3) women. How many ways are there?

Correct Answer: D. (7756). Explanation: महिलाएं (3), (4), (5) या (6) हो सकती हैं। सही योग \(\binom{8}{3}\binom{9}{3}+\binom{8}{4}\binom{9}{2}+\binom{8}{5}\binom{9}{1}+\binom{8}{6}=7756\) है। / The number of women can be (3), (4), (5), or (6). The correct sum is \(\binom{8}{3}\binom{9}{3}+\binom{8}{4}\binom{9}{2}+\binom{8}{5}\binom{9}{1}+\binom{8}{6}=7756\).

Which concept should I revise for this Mathematics MCQ?

The number of women can be (3), (4), (5), or (6). The correct sum is \(\binom{8}{3}\binom{9}{3}+\binom{8}{4}\binom{9}{2}+\binom{8}{5}\binom{9}{1}+\binom{8}{6}=7756\).

What exam hint can help solve this Mathematics question?

महिलाएं (3), (4), (5) या (6) हो सकती हैं। सही योग \(\binom{8}{3}\binom{9}{3}+\binom{8}{4}\binom{9}{2}+\binom{8}{5}\binom{9}{1}+\binom{8}{6}=7756\) है।