(7) अलग-अलग पुस्तकों को शेल्फ पर कितने तरीकों से रखा जाए ताकि दो विशेष पुस्तकें न तो साथ हों और न ही दोनों सिरों पर हों?

In how many ways can (7) distinct books be arranged on a shelf so that two particular books are neither together nor both at the ends?

Explanation opens after your attempt
Correct Answer

B. (3720)

Step 1

Concept

Subtract together cases \(6!\cdot2!\) and both-end cases \(2!\cdot5!\) from (7!). There is no overlap because both-end positions are not together, so the result is (5040-1440-240=3360).

Step 2

Why this answer is correct

The correct answer is B. (3720). Subtract together cases \(6!\cdot2!\) and both-end cases \(2!\cdot5!\) from (7!). There is no overlap because both-end positions are not together, so the result is (5040-1440-240=3360).

Step 3

Exam Tip

कुल (7!) से साथ वाली \(6!\cdot2!\) और दोनों सिरों वाली \(2!\cdot5!\) व्यवस्थाएं घटाएं। overlap साथ नहीं हो सकता, इसलिए (5040-1440-240=3360) मिलता है।

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Mathematics Answer, Explanation and Revision Hints

(7) अलग-अलग पुस्तकों को शेल्फ पर कितने तरीकों से रखा जाए ताकि दो विशेष पुस्तकें न तो साथ हों और न ही दोनों सिरों पर हों? / In how many ways can (7) distinct books be arranged on a shelf so that two particular books are neither together nor both at the ends?

Correct Answer: B. (3720). Explanation: कुल (7!) से साथ वाली \(6!\cdot2!\) और दोनों सिरों वाली \(2!\cdot5!\) व्यवस्थाएं घटाएं। overlap साथ नहीं हो सकता, इसलिए (5040-1440-240=3360) मिलता है। / Subtract together cases \(6!\cdot2!\) and both-end cases \(2!\cdot5!\) from (7!). There is no overlap because both-end positions are not together, so the result is (5040-1440-240=3360).

Which concept should I revise for this Mathematics MCQ?

Subtract together cases \(6!\cdot2!\) and both-end cases \(2!\cdot5!\) from (7!). There is no overlap because both-end positions are not together, so the result is (5040-1440-240=3360).

What exam hint can help solve this Mathematics question?

कुल (7!) से साथ वाली \(6!\cdot2!\) और दोनों सिरों वाली \(2!\cdot5!\) व्यवस्थाएं घटाएं। overlap साथ नहीं हो सकता, इसलिए (5040-1440-240=3360) मिलता है।