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Probability Practice Questions - DPP for JEE
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Page 2 Also, given that, and ? 2. (c) , , ? = 3. (c) Here mean = np = 6 ; variance = npq =2 ? ; ? ; ? n =9 Now, probability of is equal to 4. (c) We have Page 3 Also, given that, and ? 2. (c) , , ? = 3. (c) Here mean = np = 6 ; variance = npq =2 ? ; ? ; ? n =9 Now, probability of is equal to 4. (c) We have ? n F n G = f [From venn diagram E c n F c n G = G – E n G – F n G] [ E, F, G are pairwise independent] = 1– P (E) – P (F) = P (E c ) – P (F) 5. (d) We have, Next, = = = P(X b) Also, 6. (b) Let E i = 0, 1, 2, ... n be the event that the bag contains exactly i white balls then p (E i ) k 2 i Page 4 Also, given that, and ? 2. (c) , , ? = 3. (c) Here mean = np = 6 ; variance = npq =2 ? ; ? ; ? n =9 Now, probability of is equal to 4. (c) We have ? n F n G = f [From venn diagram E c n F c n G = G – E n G – F n G] [ E, F, G are pairwise independent] = 1– P (E) – P (F) = P (E c ) – P (F) 5. (d) We have, Next, = = = P(X b) Also, 6. (b) Let E i = 0, 1, 2, ... n be the event that the bag contains exactly i white balls then p (E i ) k 2 i where Let A be the event that a ball drawn is white 7. (a) Let E 1 be the event that the answer is guessed, E 2 be the event that the answer is copied, E 3 be the event that the examinee knows the answer and E be the event that the examinee answers correctly. Given , Assume that events E 1 , E 2 & E 3 are exhaustive. Now, Probability of getting correct answer by guessing = (Since 4 alternatives) Probability of answering correctly by copying = and Probability of answering correctly by knowing = 1 Clearly, is the event he knew the answer to the question given that he correctly answered it. Using Baye’s theorem P Page 5 Also, given that, and ? 2. (c) , , ? = 3. (c) Here mean = np = 6 ; variance = npq =2 ? ; ? ; ? n =9 Now, probability of is equal to 4. (c) We have ? n F n G = f [From venn diagram E c n F c n G = G – E n G – F n G] [ E, F, G are pairwise independent] = 1– P (E) – P (F) = P (E c ) – P (F) 5. (d) We have, Next, = = = P(X b) Also, 6. (b) Let E i = 0, 1, 2, ... n be the event that the bag contains exactly i white balls then p (E i ) k 2 i where Let A be the event that a ball drawn is white 7. (a) Let E 1 be the event that the answer is guessed, E 2 be the event that the answer is copied, E 3 be the event that the examinee knows the answer and E be the event that the examinee answers correctly. Given , Assume that events E 1 , E 2 & E 3 are exhaustive. Now, Probability of getting correct answer by guessing = (Since 4 alternatives) Probability of answering correctly by copying = and Probability of answering correctly by knowing = 1 Clearly, is the event he knew the answer to the question given that he correctly answered it. Using Baye’s theorem P = 8. (c) Since, E and F are independent events ? ? P(E|F) P(F) = P(E) P(F) and P(F|E)P(E) = P(E)P(F) ? P(E|F) = P(E) and P(F|E) = P(F) Now, = P(E) + P(F) – P(E)P(F) ? 0.5 = 0.3 + P(F) – 0.3P(F) P(F) (1 – 0.3) = 0.5 – 0.3 ? P(E|F) – P(F|E)= P(E) – P(F) = = 9. (c) 10. (a) = and – 1 > 0 ? ratio will be independent of n and r if (1/p)–1 = 1 p = 1/2 11. (a) Let A, B and C be the events that the student is successful in tests I, II and III respectively. Then P (The student is successful)Read More
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