Class 11 Mathematics - Permutations And Combinations - Derivations of formulas and their connections Easy Quiz

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क्रमबद्ध चयन के सूत्र \(^{n}P_r\) की व्युत्पत्ति में पहला गुणनखंड (n) क्यों होता है?

In the derivation of ordered selection formula \(^{n}P_r\) why is the first factor (n)?

Explanation opens after your attempt
Correct Answer

A. पहले स्थान के लिए (n) विकल्प होते हैंThere are (n) choices for the first position

Step 1

Concept

Any one of the (n) distinct objects can occupy the first position. In exams think by filling positions one by one.

Step 2

Why this answer is correct

The correct answer is A. पहले स्थान के लिए (n) विकल्प होते हैं / There are (n) choices for the first position. Any one of the (n) distinct objects can occupy the first position. In exams think by filling positions one by one.

Step 3

Exam Tip

पहले स्थान पर (n) अलग वस्तुओं में से कोई भी आ सकती है। परीक्षा में स्थानों को क्रम से भरकर सोचें।

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सूत्र (^{n}P_r=n(n-1)(n-2)\cdots(n-r+1)) में कुल कितने गुणनखंड होते हैं?

How many factors are there in (^{n}P_r=n(n-1)(n-2)\cdots(n-r+1))?

Explanation opens after your attempt
Correct Answer

B. (r)

Step 1

Concept

Since (r) positions are to be filled there are (r) factors. In exams connect the number of factors with the number of positions.

Step 2

Why this answer is correct

The correct answer is B. (r). Since (r) positions are to be filled there are (r) factors. In exams connect the number of factors with the number of positions.

Step 3

Exam Tip

क्योंकि (r) स्थान भरने हैं इसलिए (r) गुणनखंड आते हैं। परीक्षा में गुणनखंडों की संख्या को स्थानों की संख्या से जोड़ें।

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कौन-सा सूत्र \(^{n}P_r\) को फैक्टोरियल रूप में सही दिखाता है?

Which formula correctly shows \(^{n}P_r\) in factorial form?

Explanation opens after your attempt
Correct Answer

B. (^{n}P_r=\frac{n!}{(n-r)!})

Step 1

Concept

In ordered selection the remaining ((n-r)!) part is removed from (n!). In exams remember ((n-r)!) in the denominator for permutation.

Step 2

Why this answer is correct

The correct answer is B. (^{n}P_r=\frac{n!}{(n-r)!}). In ordered selection the remaining ((n-r)!) part is removed from (n!). In exams remember ((n-r)!) in the denominator for permutation.

Step 3

Exam Tip

क्रम वाले चयन में (n!) से बाकी ((n-r)!) भाग हटता है। परीक्षा में permutation के हर में ((n-r)!) याद रखें।

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सूत्र \(^{n}C_r=\frac{^{n}P_r}{r!}\) में (r!) से भाग क्यों दिया जाता है?

Why do we divide by (r!) in \(^{n}C_r=\frac{^{n}P_r}{r!}\)?

Explanation opens after your attempt
Correct Answer

D. क्योंकि क्रम को हटाना होता हैBecause order has to be removed

Step 1

Concept

In combination order is not counted so (r!) orders of selected objects are removed. In exams treat combination as selection without order.

Step 2

Why this answer is correct

The correct answer is D. क्योंकि क्रम को हटाना होता है / Because order has to be removed. In combination order is not counted so (r!) orders of selected objects are removed. In exams treat combination as selection without order.

Step 3

Exam Tip

Combination में क्रम नहीं गिना जाता इसलिए चुनी गई (r) वस्तुओं के (r!) क्रम हटते हैं। परीक्षा में combination को बिना क्रम का चयन मानें।

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कौन-सा संबंध \(^{n}P_r\) और \(^{n}C_r\) को सही जोड़ता है?

Which relation correctly connects \(^{n}P_r\) and \(^{n}C_r\)?

Explanation opens after your attempt
Correct Answer

C. \(^{n}P_r=^{n}C_r\times r!\)

Step 1

Concept

First (r) objects are chosen and then arranged in (r!) ways. In exams keep the idea of choose first and arrange later.

Step 2

Why this answer is correct

The correct answer is C. \(^{n}P_r=^{n}C_r\times r!\). First (r) objects are chosen and then arranged in (r!) ways. In exams keep the idea of choose first and arrange later.

Step 3

Exam Tip

पहले (r) वस्तुएँ चुनी जाती हैं और फिर उन्हें (r!) तरीकों से जमाया जाता है। परीक्षा में पहले चयन फिर व्यवस्था का विचार रखें।

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सूत्र (^{n}C_r=\frac{n!}{r!(n-r)!}) किस विचार से प्राप्त होता है?

Which idea gives (^{n}C_r=\frac{n!}{r!(n-r)!})?

Explanation opens after your attempt
Correct Answer

B. \(^{n}P_r\) को (r!) से भाग देनाDividing \(^{n}P_r\) by (r!)

Step 1

Concept

In combination extra orders are removed from permutation. In exams write \(^{n}P_r\) and divide by (r!).

Step 2

Why this answer is correct

The correct answer is B. \(^{n}P_r\) को (r!) से भाग देना / Dividing \(^{n}P_r\) by (r!). In combination extra orders are removed from permutation. In exams write \(^{n}P_r\) and divide by (r!).

Step 3

Exam Tip

Combination में permutation से अतिरिक्त क्रम हटाए जाते हैं। परीक्षा में \(^{n}P_r\) लिखकर (r!) से भाग दें।

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संबंध \(^{n}C_r=^{n}C_{n-r}\) का सरल कारण क्या है?

What is the simple reason for \(^{n}C_r=^{n}C_{n-r}\)?

Explanation opens after your attempt
Correct Answer

D. (r) वस्तुएँ चुनना उतना ही है जितना (n-r) वस्तुएँ छोड़नाChoosing (r) objects is same as leaving (n-r) objects

Step 1

Concept

When (r) are chosen the (n-r) objects are automatically left. In exams remember the connection between choosing and leaving.

Step 2

Why this answer is correct

The correct answer is D. (r) वस्तुएँ चुनना उतना ही है जितना (n-r) वस्तुएँ छोड़ना / Choosing (r) objects is same as leaving (n-r) objects. When (r) are chosen the (n-r) objects are automatically left. In exams remember the connection between choosing and leaving.

Step 3

Exam Tip

जब (r) चुने जाते हैं तब (n-r) वस्तुएँ अपने आप छूटती हैं। परीक्षा में चयन और त्याग का संबंध याद रखें।

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यदि \(^{10}C_3=^{10}C_k\) और \(k\neq3\) हो तो (k) का मान क्या होगा?

If \(^{10}C_3=^{10}C_k\) and \(k\neq3\) what is the value of (k)?

Explanation opens after your attempt
Correct Answer

C. (7)

Step 1

Concept

By \(^{n}C_r=^{n}C_{n-r}\) we get (k=10-3=7). In exams check the complementary index in equal combinations.

Step 2

Why this answer is correct

The correct answer is C. (7). By \(^{n}C_r=^{n}C_{n-r}\) we get (k=10-3=7). In exams check the complementary index in equal combinations.

Step 3

Exam Tip

संबंध \(^{n}C_r=^{n}C_{n-r}\) से (k=10-3=7) होगा। परीक्षा में समान combination में पूरक सूचकांक देखें।

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\(^{n}C_0=1\) क्यों होता है?

Why is \(^{n}C_0=1\)?

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Correct Answer

A. क्योंकि कोई वस्तु न चुनने का केवल (1) तरीका हैBecause there is only (1) way to choose no object

Step 1

Concept

Selecting zero objects is an empty selection and it happens in one way. In exams count empty selection as one way.

Step 2

Why this answer is correct

The correct answer is A. क्योंकि कोई वस्तु न चुनने का केवल (1) तरीका है / Because there is only (1) way to choose no object. Selecting zero objects is an empty selection and it happens in one way. In exams count empty selection as one way.

Step 3

Exam Tip

शून्य वस्तुओं का चयन खाली चयन है और वह एक ही तरह से होता है। परीक्षा में खाली चयन को भी एक तरीका मानें।

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\(^{n}C_n=1\) का सही कारण क्या है?

What is the correct reason for \(^{n}C_n=1\)?

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Correct Answer

D. सभी वस्तुएँ चुनने का केवल (1) तरीका हैThere is only (1) way to choose all objects

Step 1

Concept

Choosing all (n) objects is one fixed selection. In exams understand the all selected case as (1) way.

Step 2

Why this answer is correct

The correct answer is D. सभी वस्तुएँ चुनने का केवल (1) तरीका है / There is only (1) way to choose all objects. Choosing all (n) objects is one fixed selection. In exams understand the all selected case as (1) way.

Step 3

Exam Tip

सभी (n) वस्तुओं को चुनना एक निश्चित चयन है। परीक्षा में सभी चुनी गई स्थिति को (1) तरीका समझें।

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\(^{n}P_0=1\) किस विचार से जुड़ा है?

The identity \(^{n}P_0=1\) is connected with which idea?

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Correct Answer

D. शून्य वस्तुओं की व्यवस्था का एक खाली तरीकाOne empty way to arrange zero objects

Step 1

Concept

Filling zero positions is counted as one empty arrangement. In exams remember the use of (0!=1).

Step 2

Why this answer is correct

The correct answer is D. शून्य वस्तुओं की व्यवस्था का एक खाली तरीका / One empty way to arrange zero objects. Filling zero positions is counted as one empty arrangement. In exams remember the use of (0!=1).

Step 3

Exam Tip

शून्य स्थान भरने का एक खाली arrangement माना जाता है। परीक्षा में (0!=1) का उपयोग ध्यान रखें।

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कौन-सा कथन (0!=1) को combination formula से सही जोड़ता है?

Which statement correctly connects (0!=1) with the combination formula?

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Correct Answer

D. \(^{n}C_n=\frac{n!}{n!0!}=1\) सही रखने के लिए (0!=1) चाहिएTo keep \(^{n}C_n=\frac{n!}{n!0!}=1\) we need (0!=1)

Step 1

Concept

The formula gives \(^{n}C_n=1\) only when (0!=1). In exams understand factorial using boundary cases.

Step 2

Why this answer is correct

The correct answer is D. \(^{n}C_n=\frac{n!}{n!0!}=1\) सही रखने के लिए (0!=1) चाहिए / To keep \(^{n}C_n=\frac{n!}{n!0!}=1\) we need (0!=1). The formula gives \(^{n}C_n=1\) only when (0!=1). In exams understand factorial using boundary cases.

Step 3

Exam Tip

सूत्र में \(^{n}C_n=1\) तभी मिलता है जब (0!=1) हो। परीक्षा में सीमा मामलों से factorial समझें।

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\(^{n}P_n=n!\) क्यों होता है?

Why is \(^{n}P_n=n!\)?

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Correct Answer

A. क्योंकि (n) अलग वस्तुओं को सभी (n) स्थानों पर जमाना हैBecause (n) distinct objects are arranged in all (n) places

Step 1

Concept

Arranging all objects gives (n(n-1)\cdots1=n!). In exams connect complete arrangement with factorial.

Step 2

Why this answer is correct

The correct answer is A. क्योंकि (n) अलग वस्तुओं को सभी (n) स्थानों पर जमाना है / Because (n) distinct objects are arranged in all (n) places. Arranging all objects gives (n(n-1)\cdots1=n!). In exams connect complete arrangement with factorial.

Step 3

Exam Tip

सभी वस्तुओं की व्यवस्था (n(n-1)\cdots1=n!) होती है। परीक्षा में पूरी व्यवस्था को factorial से जोड़ें।

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यदि (5) अलग अक्षरों में से (2) अक्षरों का क्रमबद्ध चयन हो तो व्युत्पत्ति के अनुसार गुणन क्या होगा?

If (2) letters are selected in order from (5) distinct letters what multiplication follows from the derivation?

Explanation opens after your attempt
Correct Answer

B. \(5\times4\)

Step 1

Concept

There are (5) choices for the first place and (4) for the second. In exams choices decrease when repetition is not allowed.

Step 2

Why this answer is correct

The correct answer is B. \(5\times4\). There are (5) choices for the first place and (4) for the second. In exams choices decrease when repetition is not allowed.

Step 3

Exam Tip

पहले स्थान के लिए (5) और दूसरे के लिए (4) विकल्प होंगे। परीक्षा में पुनरावृत्ति न हो तो विकल्प घटते हैं।

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यदि (6) विद्यार्थियों में से (3) को पदों पर बैठाना हो तो formula connection के अनुसार कौन-सा expression सही है?

If (3) students are to be seated in positions from (6) students which expression is correct by formula connection?

Explanation opens after your attempt
Correct Answer

D. \(^{6}P_3\)

Step 1

Concept

Seating in positions depends on order so permutation is used. In exams when position seat or rank appears check order.

Step 2

Why this answer is correct

The correct answer is D. \(^{6}P_3\). Seating in positions depends on order so permutation is used. In exams when position seat or rank appears check order.

Step 3

Exam Tip

पदों पर बैठाना क्रम पर निर्भर करता है इसलिए permutation लगेगा। परीक्षा में पद सीट या rank आने पर order देखें।

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यदि (6) विद्यार्थियों में से (3) को केवल टीम के लिए चुनना हो तो कौन-सा expression सही है?

If (3) students are only to be selected for a team from (6) students which expression is correct?

Explanation opens after your attempt
Correct Answer

C. \(^{6}C_3\)

Step 1

Concept

A team has no order so combination is used. In exams remove order for words like group or committee.

Step 2

Why this answer is correct

The correct answer is C. \(^{6}C_3\). A team has no order so combination is used. In exams remove order for words like group or committee.

Step 3

Exam Tip

टीम में क्रम नहीं होता इसलिए combination लगेगा। परीक्षा में समूह या समिति शब्दों पर order हटाएँ।

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\(^{7}P_2\) को \(^{7}C_2\) से कैसे जोड़ा जाएगा?

How will \(^{7}P_2\) be connected with \(^{7}C_2\)?

Explanation opens after your attempt
Correct Answer

D. \(^{7}P_2=^{7}C_2\times2!\)

Step 1

Concept

First choose (2) objects and then arrange them in (2!) ways. In exams understand permutation as combination times arrangement.

Step 2

Why this answer is correct

The correct answer is D. \(^{7}P_2=^{7}C_2\times2!\). First choose (2) objects and then arrange them in (2!) ways. In exams understand permutation as combination times arrangement.

Step 3

Exam Tip

पहले (2) वस्तुएँ चुनें और फिर उन्हें (2!) तरीकों से जमाएँ। परीक्षा में permutation को combination गुणा व्यवस्था समझें।

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\(^{8}C_2\) का मान \(^{8}P_2\) से कैसे प्राप्त होगा?

How can the value of \(^{8}C_2\) be obtained from \(^{8}P_2\)?

Explanation opens after your attempt
Correct Answer

B. \(^{8}C_2=\frac{^{8}P_2}{2!}\)

Step 1

Concept

To get combination ordered arrangements are divided by (2!). In exams divide to remove internal orders.

Step 2

Why this answer is correct

The correct answer is B. \(^{8}C_2=\frac{^{8}P_2}{2!}\). To get combination ordered arrangements are divided by (2!). In exams divide to remove internal orders.

Step 3

Exam Tip

Combination पाने के लिए ordered arrangements को (2!) से भाग दिया जाता है। परीक्षा में internal orders हटाने के लिए भाग दें।

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कौन-सा formula \(^{n}C_1\) का सही सरलीकरण देता है?

Which formula gives the correct simplification of \(^{n}C_1\)?

Explanation opens after your attempt
Correct Answer

C. \(^{n}C_1=n\)

Step 1

Concept

There are (n) choices to select one object. In exams take single selection directly as (n).

Step 2

Why this answer is correct

The correct answer is C. \(^{n}C_1=n\). There are (n) choices to select one object. In exams take single selection directly as (n).

Step 3

Exam Tip

एक वस्तु चुनने के लिए (n) विकल्प होते हैं। परीक्षा में single selection को सीधे (n) मानें।

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कौन-सा formula \(^{n}P_1\) का सही सरलीकरण देता है?

Which formula gives the correct simplification of \(^{n}P_1\)?

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Correct Answer

A. \(^{n}P_1=n\)

Step 1

Concept

Only one position is to be filled so there are (n) choices. In exams for (r=1) permutation and combination both equal (n).

Step 2

Why this answer is correct

The correct answer is A. \(^{n}P_1=n\). Only one position is to be filled so there are (n) choices. In exams for (r=1) permutation and combination both equal (n).

Step 3

Exam Tip

एक स्थान भरना है इसलिए (n) विकल्प मिलते हैं। परीक्षा में (r=1) पर permutation और combination दोनों (n) होते हैं।

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(^{n}C_2=\frac{n(n-1)}{2}) किस सूत्र से सरल होकर आता है?

From which formula does (^{n}C_2=\frac{n(n-1)}{2}) simplify?

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Correct Answer

D. (^{n}C_2=\frac{n!}{2!(n-2)!})

Step 1

Concept

In the combination formula after cancelling ((n-2)!) the term (n(n-1)) remains. In exams remember \(^{n}C_2\) as the pair-making formula.

Step 2

Why this answer is correct

The correct answer is D. (^{n}C_2=\frac{n!}{2!(n-2)!}). In the combination formula after cancelling ((n-2)!) the term (n(n-1)) remains. In exams remember \(^{n}C_2\) as the pair-making formula.

Step 3

Exam Tip

Combination formula में ((n-2)!) कटने पर (n(n-1)) बचता है। परीक्षा में \(^{n}C_2\) को जोड़े बनाने का सूत्र मानें।

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(^{n}P_2=n(n-1)) किस विचार से मिलता है?

Which idea gives (^{n}P_2=n(n-1))?

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Correct Answer

C. दो क्रमबद्ध स्थान भरनाFilling two ordered positions

Step 1

Concept

There are (n) choices for the first place and (n-1) for the second. In exams use the multiplication principle for ordered pairs.

Step 2

Why this answer is correct

The correct answer is C. दो क्रमबद्ध स्थान भरना / Filling two ordered positions. There are (n) choices for the first place and (n-1) for the second. In exams use the multiplication principle for ordered pairs.

Step 3

Exam Tip

पहले स्थान के लिए (n) और दूसरे के लिए (n-1) विकल्प होते हैं। परीक्षा में ordered pair में multiplication principle लगाएँ।

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\(^{9}C_7\) को छोटे सूचकांक वाले रूप में कैसे लिखेंगे?

How will \(^{9}C_7\) be written using a smaller index?

Explanation opens after your attempt
Correct Answer

B. \(^{9}C_2\)

Step 1

Concept

By \(^{n}C_r=^{n}C_{n-r}\) we get \(^{9}C_7=^{9}C_2\). In exams use the smaller index to reduce calculation.

Step 2

Why this answer is correct

The correct answer is B. \(^{9}C_2\). By \(^{n}C_r=^{n}C_{n-r}\) we get \(^{9}C_7=^{9}C_2\). In exams use the smaller index to reduce calculation.

Step 3

Exam Tip

संबंध \(^{n}C_r=^{n}C_{n-r}\) से \(^{9}C_7=^{9}C_2\) है। परीक्षा में calculation घटाने के लिए छोटा index लें।

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पास्कल संबंध \(^{n}C_r=^{n-1}C_r+^{n-1}C_{r-1}\) में \(^{n-1}C_r\) किस स्थिति को दिखाता है?

In Pascal's relation \(^{n}C_r=^{n-1}C_r+^{n-1}C_{r-1}\) what does \(^{n-1}C_r\) represent?

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Correct Answer

A. विशेष वस्तु को न चुननाNot choosing the special object

Step 1

Concept

Choosing (r) from remaining (n-1) after excluding one fixed object is \(^{n-1}C_r\). In exams split cases into included and excluded.

Step 2

Why this answer is correct

The correct answer is A. विशेष वस्तु को न चुनना / Not choosing the special object. Choosing (r) from remaining (n-1) after excluding one fixed object is \(^{n-1}C_r\). In exams split cases into included and excluded.

Step 3

Exam Tip

एक निश्चित वस्तु को छोड़कर बाकी (n-1) में से (r) चुनना \(^{n-1}C_r\) है। परीक्षा में मामलों को शामिल और अलग में बाँटें।

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पास्कल संबंध \(^{n}C_r=^{n-1}C_r+^{n-1}C_{r-1}\) में \(^{n-1}C_{r-1}\) किस स्थिति को दिखाता है?

In Pascal's relation \(^{n}C_r=^{n-1}C_r+^{n-1}C_{r-1}\) what does \(^{n-1}C_{r-1}\) represent?

Explanation opens after your attempt
Correct Answer

C. विशेष वस्तु को चुनकर बाकी (r-1) चुननाChoosing the special object and then choosing remaining (r-1)

Step 1

Concept

If the special object is chosen the remaining (r-1) objects must be chosen from (n-1). In exams write the included case separately.

Step 2

Why this answer is correct

The correct answer is C. विशेष वस्तु को चुनकर बाकी (r-1) चुनना / Choosing the special object and then choosing remaining (r-1). If the special object is chosen the remaining (r-1) objects must be chosen from (n-1). In exams write the included case separately.

Step 3

Exam Tip

यदि विशेष वस्तु चुनी गई है तो बाकी (r-1) वस्तुएँ (n-1) में से चुननी होंगी। परीक्षा में included case को अलग लिखें।

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पास्कल संबंध के अनुसार \(^{6}C_2\) किसके बराबर है?

According to Pascal's relation \(^{6}C_2\) is equal to what?

Explanation opens after your attempt
Correct Answer

D. \(^{5}C_2+^{5}C_1\)

Step 1

Concept

Put (n=6) and (r=2) in \(^{n}C_r=^{n-1}C_r+^{n-1}C_{r-1}\). In exams (n) decreases by (1) in both terms.

Step 2

Why this answer is correct

The correct answer is D. \(^{5}C_2+^{5}C_1\). Put (n=6) and (r=2) in \(^{n}C_r=^{n-1}C_r+^{n-1}C_{r-1}\). In exams (n) decreases by (1) in both terms.

Step 3

Exam Tip

सूत्र \(^{n}C_r=^{n-1}C_r+^{n-1}C_{r-1}\) में (n=6) और (r=2) रखें। परीक्षा में (n) दोनों पदों में (1) कम होता है।

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किस विचार से \(^{n}C_0+^{n}C_1+\cdots+^{n}C_n=2^n\) मिलता है?

Which idea gives \(^{n}C_0+^{n}C_1+\cdots+^{n}C_n=2^n\)?

Explanation opens after your attempt
Correct Answer

B. हर वस्तु को लेना या न लेना दो विकल्प होते हैंEach object has two choices take or not take

Step 1

Concept

Each object has two choices so total subsets are \(2^n\). In exams think of subsets using include or exclude.

Step 2

Why this answer is correct

The correct answer is B. हर वस्तु को लेना या न लेना दो विकल्प होते हैं / Each object has two choices take or not take. Each object has two choices so total subsets are \(2^n\). In exams think of subsets using include or exclude.

Step 3

Exam Tip

हर वस्तु के लिए दो विकल्प होते हैं इसलिए कुल उपसमुच्चय \(2^n\) होते हैं। परीक्षा में subsets को include या exclude से सोचें।

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किस कारण से (n) वस्तुओं में से कम से कम एक वस्तु चुनने के तरीके \(2^n-1\) होते हैं?

Why are the ways to choose at least one object from (n) objects equal to \(2^n-1\)?

Explanation opens after your attempt
Correct Answer

D. क्योंकि कुल \(2^n\) selections में से खाली selection हटता हैBecause the empty selection is removed from total \(2^n\) selections

Step 1

Concept

All selections include the empty selection too. In exams subtract the empty case when at least one appears.

Step 2

Why this answer is correct

The correct answer is D. क्योंकि कुल \(2^n\) selections में से खाली selection हटता है / Because the empty selection is removed from total \(2^n\) selections. All selections include the empty selection too. In exams subtract the empty case when at least one appears.

Step 3

Exam Tip

सभी selections में खाली selection भी शामिल होता है। परीक्षा में at least one आने पर empty case घटाएँ।

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(n) अलग वस्तुओं के (r) वस्तुओं वाले उपसमुच्चयों की संख्या कौन-सा सूत्र देता है?

Which formula gives the number of subsets having (r) objects from (n) distinct objects?

Explanation opens after your attempt
Correct Answer

C. \(^{n}C_r\)

Step 1

Concept

A subset has no order so \(^{n}C_r\) is correct. In exams treat a subset as unordered selection.

Step 2

Why this answer is correct

The correct answer is C. \(^{n}C_r\). A subset has no order so \(^{n}C_r\) is correct. In exams treat a subset as unordered selection.

Step 3

Exam Tip

उपसमुच्चय में क्रम नहीं होता इसलिए \(^{n}C_r\) सही है। परीक्षा में subset को unordered selection मानें।

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(4) लड़कों में से (2) और (5) लड़कियों में से (1) चुनने का connected expression क्या है?

What is the connected expression for choosing (2) boys from (4) boys and (1) girl from (5) girls?

Explanation opens after your attempt
Correct Answer

B. \(^{4}C_2\times{}^{5}C_1\)

Step 1

Concept

Two independent selections are needed together so the multiplication principle applies. In exams the word and often means multiply.

Step 2

Why this answer is correct

The correct answer is B. \(^{4}C_2\times{}^{5}C_1\). Two independent selections are needed together so the multiplication principle applies. In exams the word and often means multiply.

Step 3

Exam Tip

दो स्वतंत्र selections साथ-साथ चाहिए इसलिए गुणन सिद्धांत लगेगा। परीक्षा में and शब्द आने पर अक्सर multiply करें।

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(8) विद्यार्थियों में से (3) चुनकर उन्हें पंक्ति में बैठाने का expression कौन-सा है?

Which expression represents choosing (3) students from (8) and arranging them in a row?

Explanation opens after your attempt
Correct Answer

A. \(^{8}C_3\times3!\)

Step 1

Concept

First choose (3) students and then arrange them in (3!) ways. In exams multiply when arrangement follows selection.

Step 2

Why this answer is correct

The correct answer is A. \(^{8}C_3\times3!\). First choose (3) students and then arrange them in (3!) ways. In exams multiply when arrangement follows selection.

Step 3

Exam Tip

पहले (3) विद्यार्थी चुनें और फिर (3!) तरीकों से जमाएँ। परीक्षा में चयन के बाद व्यवस्था हो तो multiplication करें।

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(n) अलग वस्तुओं की वृत्तीय व्यवस्था का मूल सूत्र क्या है?

What is the basic formula for circular arrangement of (n) distinct objects?

Explanation opens after your attempt
Correct Answer

D. ((n-1)!)

Step 1

Concept

Rotations are considered same in a circle so fixing one object gives ((n-1)!) arrangements. In exams fix (1) object in circular arrangement.

Step 2

Why this answer is correct

The correct answer is D. ((n-1)!). Rotations are considered same in a circle so fixing one object gives ((n-1)!) arrangements. In exams fix (1) object in circular arrangement.

Step 3

Exam Tip

वृत्त में घुमाव समान माना जाता है इसलिए एक वस्तु स्थिर करके ((n-1)!) व्यवस्थाएँ मिलती हैं। परीक्षा में circular arrangement में (1) वस्तु स्थिर करें।

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यदि (n) अलग वस्तुओं को पंक्ति में जमाने के (n!) तरीके हैं तो वृत्त में ((n-1)!) क्यों होते हैं?

If (n) distinct objects can be arranged in a row in (n!) ways why are circular arrangements ((n-1)!)?

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Correct Answer

A. क्योंकि हर वृत्तीय व्यवस्था (n) घुमावों में गिनी जाती हैBecause each circular arrangement is counted in (n) rotations

Step 1

Concept

Rotating a circle does not create a new arrangement so (n!) is divided by (n). In exams treat rotation as duplicate counting.

Step 2

Why this answer is correct

The correct answer is A. क्योंकि हर वृत्तीय व्यवस्था (n) घुमावों में गिनी जाती है / Because each circular arrangement is counted in (n) rotations. Rotating a circle does not create a new arrangement so (n!) is divided by (n). In exams treat rotation as duplicate counting.

Step 3

Exam Tip

वृत्त में घुमाने से व्यवस्था नई नहीं मानी जाती इसलिए (n!) को (n) से भाग देते हैं। परीक्षा में rotation को duplicate count समझें।

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(a) बार समान और बाकी अलग अक्षरों वाले शब्दों की व्यवस्थाओं में (a!) से भाग क्यों देते हैं?

Why do we divide by (a!) in arrangements of a word having (a) identical letters and the remaining letters distinct?

Explanation opens after your attempt
Correct Answer

A. क्योंकि समान अक्षरों के अंदरूनी क्रम अलग नहीं दिखतेBecause internal orders of identical letters are not different

Step 1

Concept

Interchanging identical letters does not create a new word. In exams divide by the factorial of identical letters.

Step 2

Why this answer is correct

The correct answer is A. क्योंकि समान अक्षरों के अंदरूनी क्रम अलग नहीं दिखते / Because internal orders of identical letters are not different. Interchanging identical letters does not create a new word. In exams divide by the factorial of identical letters.

Step 3

Exam Tip

समान अक्षरों की अदला-बदली से नया शब्द नहीं बनता। परीक्षा में identical letters के factorial से भाग दें।

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किस स्थिति में व्यवस्थाओं का सूत्र \(\frac{n!}{p!q!}\) उपयोग होगा?

In which situation is the arrangement formula \(\frac{n!}{p!q!}\) used?

Explanation opens after your attempt
Correct Answer

B. जब दो प्रकार की वस्तुएँ क्रमशः (p) और (q) बार समान होंWhen two types of objects are identical (p) and (q) times respectively

Step 1

Concept

Interchanges inside two identical groups are not counted separately so we divide by (p!q!). In exams place the factorial of each repeated group in the denominator.

Step 2

Why this answer is correct

The correct answer is B. जब दो प्रकार की वस्तुएँ क्रमशः (p) और (q) बार समान हों / When two types of objects are identical (p) and (q) times respectively. Interchanges inside two identical groups are not counted separately so we divide by (p!q!). In exams place the factorial of each repeated group in the denominator.

Step 3

Exam Tip

दो समानता समूहों की अदला-बदली अलग नहीं गिनी जाती इसलिए (p!q!) से भाग देते हैं। परीक्षा में हर repeated group का factorial हर में रखें।

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यदि पुनरावृत्ति allowed हो और (r) स्थानों पर (n) विकल्प हर बार मिलें तो कुल क्रमबद्ध व्यवस्थाएँ कितनी होंगी?

If repetition is allowed and (n) choices are available each time for (r) positions how many ordered arrangements are possible?

Explanation opens after your attempt
Correct Answer

C. \(n^r\)

Step 1

Concept

Each position independently has (n) choices so the product is \(n\times n\times\cdots\times n=n^r\). In exams choices do not decrease when repetition is allowed.

Step 2

Why this answer is correct

The correct answer is C. \(n^r\). Each position independently has (n) choices so the product is \(n\times n\times\cdots\times n=n^r\). In exams choices do not decrease when repetition is allowed.

Step 3

Exam Tip

हर स्थान पर (n) विकल्प स्वतंत्र रूप से मिलते हैं इसलिए गुणन \(n\times n\times\cdots\times n=n^r\) होता है। परीक्षा में repetition allowed हो तो विकल्प घटते नहीं हैं।

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बिना पुनरावृत्ति (r) स्थान भरने पर \(n^r\) की जगह \(^{n}P_r\) क्यों आता है?

Why does \(^{n}P_r\) appear instead of \(n^r\) when (r) positions are filled without repetition?

Explanation opens after your attempt
Correct Answer

A. क्योंकि हर अगले स्थान पर विकल्प घटते हैंBecause choices decrease at each next position

Step 1

Concept

Without repetition one object cannot be taken again. In exams pay attention to allowed and not allowed words.

Step 2

Why this answer is correct

The correct answer is A. क्योंकि हर अगले स्थान पर विकल्प घटते हैं / Because choices decrease at each next position. Without repetition one object cannot be taken again. In exams pay attention to allowed and not allowed words.

Step 3

Exam Tip

बिना पुनरावृत्ति एक वस्तु दोबारा नहीं ली जा सकती। परीक्षा में allowed और not allowed शब्दों पर ध्यान दें।

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\(^{n}C_r\) की व्युत्पत्ति में कौन-सा सिद्धांत सबसे सीधे उपयोग होता है?

Which principle is used most directly in the derivation of \(^{n}C_r\)?

Explanation opens after your attempt
Correct Answer

C. पहले क्रमबद्ध गिनती फिर अतिरिक्त (r!) क्रम हटानाCount ordered arrangements first then remove extra (r!) orders

Step 1

Concept

Combination is obtained by removing (r!) internal orders from permutation. In exams make the ordered count first and then divide.

Step 2

Why this answer is correct

The correct answer is C. पहले क्रमबद्ध गिनती फिर अतिरिक्त (r!) क्रम हटाना / Count ordered arrangements first then remove extra (r!) orders. Combination is obtained by removing (r!) internal orders from permutation. In exams make the ordered count first and then divide.

Step 3

Exam Tip

Combination को permutation से (r!) आंतरिक क्रम हटाकर निकाला जाता है। परीक्षा में पहले ordered count बनाकर फिर divide करें।

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यदि (^{n}P_r=\frac{n!}{(n-r)!}) है तो \(^{n}P_{r-1}\) किसके बराबर होगा?

If (^{n}P_r=\frac{n!}{(n-r)!}) then what is \(^{n}P_{r-1}\)?

Explanation opens after your attempt
Correct Answer

A. (\frac{n!}{(n-r+1)!})

Step 1

Concept

Putting (r-1) makes the denominator ((n-r+1)!). In exams watch signs carefully while substituting.

Step 2

Why this answer is correct

The correct answer is A. (\frac{n!}{(n-r+1)!}). Putting (r-1) makes the denominator ((n-r+1)!). In exams watch signs carefully while substituting.

Step 3

Exam Tip

(r-1) रखने पर हर ((n-r+1)!) बनता है। परीक्षा में substitution करते समय signs ध्यान से देखें।

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\(^{n}C_r\) और \(^{n}C_{r-1}\) के बीच कौन-सा अनुपात सही है?

Which ratio between \(^{n}C_r\) and \(^{n}C_{r-1}\) is correct?

Explanation opens after your attempt
Correct Answer

B. \(\frac{^{n}C_r}{^{n}C_{r-1}}=\frac{n-r+1}{r}\)

Step 1

Concept

Simplifying the factorial formula gives the ratio \(\frac{n-r+1}{r}\). In exams ratio method is useful for adjacent combinations.

Step 2

Why this answer is correct

The correct answer is B. \(\frac{^{n}C_r}{^{n}C_{r-1}}=\frac{n-r+1}{r}\). Simplifying the factorial formula gives the ratio \(\frac{n-r+1}{r}\). In exams ratio method is useful for adjacent combinations.

Step 3

Exam Tip

Factorial formula से सरल करने पर अनुपात \(\frac{n-r+1}{r}\) मिलता है। परीक्षा में adjacent combinations में ratio method उपयोगी है।

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\(^{n}P_r\) और \(^{n}P_{r-1}\) के बीच कौन-सा संबंध सही है?

Which relation between \(^{n}P_r\) and \(^{n}P_{r-1}\) is correct?

Explanation opens after your attempt
Correct Answer

B. \(^{n}P_r=^{n}P_{r-1}\times(n-r+1)\)

Step 1

Concept

For the (r)th position (n-r+1) choices are added as a factor. In exams identify the factor of the next position.

Step 2

Why this answer is correct

The correct answer is B. \(^{n}P_r=^{n}P_{r-1}\times(n-r+1)\). For the (r)th position (n-r+1) choices are added as a factor. In exams identify the factor of the next position.

Step 3

Exam Tip

(r)वें स्थान के लिए (n-r+1) विकल्प जुड़ते हैं। परीक्षा में next position का factor अलग पहचानें।

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\(^{n}C_r=\frac{n}{r},^{n-1}C_{r-1}\) किस व्युत्पत्ति से जुड़ा है?

The formula \(^{n}C_r=\frac{n}{r},^{n-1}C_{r-1}\) is connected with which derivation?

Explanation opens after your attempt
Correct Answer

A. एक chosen object को चिह्नित करके double counting करनाDouble counting by marking one chosen object

Step 1

Concept

In each (r)-selection one of the (r) chosen objects can be marked. In exams understand this relation through marked object counting.

Step 2

Why this answer is correct

The correct answer is A. एक chosen object को चिह्नित करके double counting करना / Double counting by marking one chosen object. In each (r)-selection one of the (r) chosen objects can be marked. In exams understand this relation through marked object counting.

Step 3

Exam Tip

हर (r)-selection में (r) chosen objects में से एक चिह्नित हो सकता है। परीक्षा में marked object वाली counting से यह relation समझें।

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\(^{n}C_r=\frac{n-r+1}{r},^{n}C_{r-1}\) किससे मिलता है?

From what do we get \(^{n}C_r=\frac{n-r+1}{r},^{n}C_{r-1}\)?

Explanation opens after your attempt
Correct Answer

B. Adjacent combination ratio सेFrom adjacent combination ratio

Step 1

Concept

It is obtained by simplifying the ratio of \(^{n}C_r\) and \(^{n}C_{r-1}\). In exams use ratio for consecutive (C) terms.

Step 2

Why this answer is correct

The correct answer is B. Adjacent combination ratio से / From adjacent combination ratio. It is obtained by simplifying the ratio of \(^{n}C_r\) and \(^{n}C_{r-1}\). In exams use ratio for consecutive (C) terms.

Step 3

Exam Tip

यह \(^{n}C_r\) और \(^{n}C_{r-1}\) के अनुपात को सरल करके मिलता है। परीक्षा में consecutive (C) terms पर ratio लगाएँ।

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किस expression से \(^{n}P_r\) को पहले चयन और फिर व्यवस्था के रूप में दिखाया जा सकता है?

Which expression shows \(^{n}P_r\) as selection first and arrangement later?

Explanation opens after your attempt
Correct Answer

C. \(^{n}C_r\times r!\)

Step 1

Concept

There are \(^{n}C_r\) ways to choose (r) objects and then (r!) arrangements. In exams write ordered selection as choose and arrange.

Step 2

Why this answer is correct

The correct answer is C. \(^{n}C_r\times r!\). There are \(^{n}C_r\) ways to choose (r) objects and then (r!) arrangements. In exams write ordered selection as choose and arrange.

Step 3

Exam Tip

पहले (r) वस्तुएँ चुनने के \(^{n}C_r\) तरीके हैं और फिर (r!) व्यवस्थाएँ हैं। परीक्षा में ordered selection को choose and arrange लिखें।

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यदि (7) वस्तुओं में से (4) चुनी जाएँ तो छोड़ने वाली वस्तुओं की संख्या से कौन-सा समान combination बनेगा?

If (4) objects are chosen from (7) objects which equal combination is formed by the number of objects left?

Explanation opens after your attempt
Correct Answer

B. \(^{7}C_3\)

Step 1

Concept

Choosing (4) means leaving (3) so \(^{7}C_4=^{7}C_3\). In exams look at both chosen and not chosen.

Step 2

Why this answer is correct

The correct answer is B. \(^{7}C_3\). Choosing (4) means leaving (3) so \(^{7}C_4=^{7}C_3\). In exams look at both chosen and not chosen.

Step 3

Exam Tip

(4) चुनने का अर्थ (3) छोड़ना है इसलिए \(^{7}C_4=^{7}C_3\) है। परीक्षा में chosen और not chosen दोनों देखें।

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\(^{12}P_3\) की व्युत्पत्ति में अंतिम गुणनखंड कौन-सा होगा?

In the derivation of \(^{12}P_3\) what will be the last factor?

Explanation opens after your attempt
Correct Answer

C. (10)

Step 1

Concept

The three position factors are (12), (11), and (10). In exams see (n-r+1) as the last factor.

Step 2

Why this answer is correct

The correct answer is C. (10). The three position factors are (12), (11), and (10). In exams see (n-r+1) as the last factor.

Step 3

Exam Tip

तीन स्थानों के factors (12), (11), (10) होंगे। परीक्षा में (n-r+1) को last factor के रूप में देखें।

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\(^{11}C_8\) को calculation के लिए किस रूप में लिखना सबसे आसान होगा?

Which form is easiest for calculation of \(^{11}C_8\)?

Explanation opens after your attempt
Correct Answer

A. \(^{11}C_3\)

Step 1

Concept

Because \(^{11}C_8=^{11}C_{3}\) and (3) is the smaller index. In exams replace large (r) by (n-r).

Step 2

Why this answer is correct

The correct answer is A. \(^{11}C_3\). Because \(^{11}C_8=^{11}C_{3}\) and (3) is the smaller index. In exams replace large (r) by (n-r).

Step 3

Exam Tip

क्योंकि \(^{11}C_8=^{11}C_{3}\) और (3) छोटा index है। परीक्षा में बड़े (r) को (n-r) से बदलें।

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(6) अलग पुस्तकों को शेल्फ पर जमाने की formula connection क्या है?

What is the formula connection for arranging (6) distinct books on a shelf?

Explanation opens after your attempt
Correct Answer

C. \(^{6}P_6=6!\)

Step 1

Concept

The row arrangement of all (6) distinct books is \(^{6}P_6=6!\). In exams connect all distinct arrangement with factorial.

Step 2

Why this answer is correct

The correct answer is C. \(^{6}P_6=6!\). The row arrangement of all (6) distinct books is \(^{6}P_6=6!\). In exams connect all distinct arrangement with factorial.

Step 3

Exam Tip

सभी (6) अलग पुस्तकों की पंक्ति व्यवस्था \(^{6}P_6=6!\) होती है। परीक्षा में all distinct arrangement को factorial से जोड़ें।

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(5) अलग रंगों में से (3) रंग चुनकर झंडे में ऊपर से नीचे लगाने का सही connected expression क्या है?

What is the correct connected expression for choosing (3) colours from (5) distinct colours and placing them from top to bottom in a flag?

Explanation opens after your attempt
Correct Answer

B. \(^{5}C_3\times3!\)

Step 1

Concept

Order is important when placing from top to bottom so the chosen (3) colours are arranged in (3!) ways. In exams add arrangement when positions appear.

Step 2

Why this answer is correct

The correct answer is B. \(^{5}C_3\times3!\). Order is important when placing from top to bottom so the chosen (3) colours are arranged in (3!) ways. In exams add arrangement when positions appear.

Step 3

Exam Tip

ऊपर से नीचे लगाने में क्रम महत्वपूर्ण है इसलिए चुने हुए (3) रंगों को (3!) तरीकों से लगाया जाएगा। परीक्षा में positions दिखें तो arrangement जोड़ें।

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यदि (n) वस्तुओं में से (r) चुनी जाती हैं तो न चुनी गई वस्तुओं की संख्या कौन-सी है?

If (r) objects are chosen from (n) objects what is the number of objects not chosen?

Explanation opens after your attempt
Correct Answer

C. (n-r)

Step 1

Concept

Chosen and not chosen objects together make (n) so the remaining number is (n-r). In exams this idea connects to \(^{n}C_r=^{n}C_{n-r}\).

Step 2

Why this answer is correct

The correct answer is C. (n-r). Chosen and not chosen objects together make (n) so the remaining number is (n-r). In exams this idea connects to \(^{n}C_r=^{n}C_{n-r}\).

Step 3

Exam Tip

चुनी गई और न चुनी गई वस्तुओं की कुल संख्या (n) होती है इसलिए बाकी (n-r) हैं। परीक्षा में यही विचार \(^{n}C_r=^{n}C_{n-r}\) से जुड़ता है।

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Class 11 Mathematics Quiz FAQs

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