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Tips on cracking Aptitude Questions on Probability

Tips on cracking Aptitude Questions on Probability [ https://learningpundits.com/module-view/54-probability/1-tips-on-probability/ ]. <br><br>LearningPundits helps Job Seekers make great CVs [ https://learningpundits.com/module-view/1-cv-preparation-for-freshers/1-cv-writing-tips-for-freshers/ ] , master English Grammar and Vocabulary [ https://learningpundits.com/course/4-english-grammar/ ] , ace Aptitude Tests [ https://learningpundits.com/course/11-mathematical-aptitude/ ], speak fluently in a Group Discussion [ https://learningpundits.com/module-view/6-group-discussion-questions/1-tips-for-speaking-in-a-group-discussion/ ] and perform well in Interviews [ https://learningpundits.com/course/2-personal-interview/ ] We also conduct weekly online contests on Aptitude and English [ https://learningpundits.com/contest ]. We also allow Job Seekers to apply for Jobs [ https://learningpundits.com/applyForJobs ]

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Tips on cracking Aptitude Questions on Probability

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  1. 3 TIPS on cracking Aptitude Questions on Probability

  2. Tip #1: Categorize the events as mutually dependent, independent or exclusive Mutually Dependent Events: 2 or more events are that are such that the occurrence of one affects the occurrence of the other. The words ‘and’, ‘together’, ‘all’, etc. indicate that the events are mutually dependent. Example:Let a card is chosen at random from a standard deck of 52 playing cards. Without replacing it, a 2nd card is chosen. The probability of choosing any card is 1 out of 52. However, if the 1st card is not replaced, then the 2nd card is chosen from only 51 cards. Accordingly, the probability of choosing another card is 1 out of 51. Thus, these events are mutually dependent. Mutually Independent Events: 2 or more events such that the occurrence of one does not affect the occurrence of the other. If the problem is such that after each event, the sample space is restored to its original state, then the events are mutually independent. Example: In the above example, the 1st card that was drawn is replaced before drawing the 2nd card. The probability of choosing any card is 1 out of 52. Now, the 1st card is replaced, then the 2nd card is chosen from 52 cards again. Accordingly, the probability of choosing another card is 1 out of 52. Thus, these events are mutually independent. Mutually Exclusive Events: 2 or more events that cannot happen simultaneously. The indicative words are ‘or’, ‘at most’, ‘at least’, etc. Example: The events “running forward” and “running backwards” are mutually exclusive. Similarly, you can’t toss a coin and get both a heads and tails at the same time, so “tossing a heads” and “tossing a tails” are mutually exclusive.

  3. Tip #2: Probability of occurrence of mutually exclusive events is the sum of their individual probabilities Question: Three unbiased coins are tossed. What is the probability of getting at most two heads? Solution: Probability of getting at most 2 heads = Probability of getting no head + Probability of getting 1 head + Probability of getting 2 heads Probability of getting no heads = Probability of getting all tails = ( ½ )( ½ )( ½ ) = 1/8 Probability of getting 1 head = C(3,1)( ½ )( ½ )( ½ ) = 3/8 Probability of getting 2 heads = C(3,2)( ½ )( ½ )( ½ ) = 3/8 Thus, required probability = 1/8 + 3/8 + 3/8 = 7/8 Question: Two dice are thrown simultaneously. What is the probability of getting two numbers whose product is even? Solution: There might be 2 cases: both numbers are even or one is even and the other is odd. Probability that both no.s are even = (3/6)(3/6) = ¼ Probability that one is even and the other is odd = (3/6)(3/6) x 2 = ½ Probability of getting 2 no.s whose product is even = ¼ + ½ = ¾

  4. Tip #3: Probability of occurrence of mutually dependent or independent events is the product of their individual probabilities Question: Two cards are drawn together from a pack of 52 cards. What is the probability that one is a spade and one is a heart? Solution: Probability of getting a Spade = 13 / 52 = ¼ Now, probability of getting a Heart = 13/51 Since the order of getting the cards is not mentioned, both the orders count. Probability of getting a Spade and a Heart = 2 x (¼)(13/51) = 13 / 102 Question: A bag contains 4 white, 5 red and 6 blue balls. Three balls are drawn at random from the bag. Find the probability that all of them are red. Solution: Total no. of balls = 4+5+6 = 15 Probability of drawing a red ball at 1st draw = 5/15 = 1/3 Probability of drawing a red ball at 2nd draw = 4/14 = 2/7 Probability of drawing a red ball at 3rd draw = 3/13 Probability of drawing all 3 red cards = 1/3 x 2/7 x 3/13 = 2/91

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