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MCQ Test: Experimental Probability - 2 - Bank Exams MCQ


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20 Questions MCQ Test Data Interpretation for Competitive Examinations - MCQ Test: Experimental Probability - 2

MCQ Test: Experimental Probability - 2 for Bank Exams 2024 is part of Data Interpretation for Competitive Examinations preparation. The MCQ Test: Experimental Probability - 2 questions and answers have been prepared according to the Bank Exams exam syllabus.The MCQ Test: Experimental Probability - 2 MCQs are made for Bank Exams 2024 Exam. Find important definitions, questions, notes, meanings, examples, exercises, MCQs and online tests for MCQ Test: Experimental Probability - 2 below.
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MCQ Test: Experimental Probability - 2 - Question 1

Three dice are thrown. What is the probability that each face shows only multiples of 3? 

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 1

Calculation:

  • To calculate the probability that each face of three dice shows only multiples of 3, we need to determine the total number of favorable outcomes and divide it by the total number of possible outcomes.
  • If we go through each die individually.
  • Each die has six faces, and out of those six faces, there are two multiples of 3: 3 and 6.
  • Therefore, the probability of getting a multiple of 3 on one die is 26 or 13.

Since the three dice are independent, we need to multiply the probabilities together to find the probability of all three dice showing multiples of 3.

MCQ Test: Experimental Probability - 2 - Question 2

A natural number n is chosen from the first 50 natural numbers. What is the probability that 

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 2

Calculation:

The first 50 natural numbers start at 1 and end at 50.

For n = 1,n = 49, and for n = 50, the output is greater than 50 and for all other values of n, the output is less than 50.

So, the probability that  would be

= 1 - {probability of getting output greater than 50)

= 1 - { 3/50)

= 1 - 3/50

= 47/50

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MCQ Test: Experimental Probability - 2 - Question 3

A coin is flipped 100 times, and it lands heads-up 63 times. What is the experimental probability of getting tails?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 3

Experimental probability is calculated by dividing the number of successful outcomes by the total number of trials. In this case, the number of tails (successful outcomes) is 100 - 63 = 37, and the total number of trials is 100. So, the experimental probability of getting tails is 37/100 = 0.37.

MCQ Test: Experimental Probability - 2 - Question 4

A spinner is divided into 6 equal sections, numbered from 1 to 6. If the spinner is spun 200 times, and the number 3 comes up 45 times, what is the experimental probability of landing on 3?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 4

The experimental probability of landing on 3 is calculated by dividing the number of times 3 comes up by the total number of spins. In this case, the experimental probability is 45/200 = 0.225, which is approximately 0.23.

MCQ Test: Experimental Probability - 2 - Question 5

In a deck of 52 playing cards, 10 cards are red (hearts and diamonds). If 25 cards are drawn randomly, what is the experimental probability of drawing a red card?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 5

The experimental probability of drawing a red card is calculated by dividing the number of red cards by the total number of cards drawn. In this case, the experimental probability is 10/25 = 0.4, which is equal to 0.45.

MCQ Test: Experimental Probability - 2 - Question 6

A bag contains 15 green marbles and 25 blue marbles. If three marbles are drawn randomly, what is the experimental probability of drawing a green marble?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 6

The experimental probability of drawing a green marble is calculated by dividing the number of green marbles by the total number of marbles drawn. In this case, the experimental probability is 15/50 = 0.3.

MCQ Test: Experimental Probability - 2 - Question 7

A six-sided die is rolled 120 times, and the number 4 comes up 30 times. What is the experimental probability of rolling a 4?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 7

The experimental probability of rolling a 4 is calculated by dividing the number of times 4 comes up by the total number of rolls. In this case, the experimental probability is 30/120 = 0.25.

MCQ Test: Experimental Probability - 2 - Question 8

A box contains 12 red balls and 8 blue balls. If two balls are drawn randomly without replacement, what is the experimental probability of drawing a red ball followed by a blue ball?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 8

The experimental probability of drawing a red ball followed by a blue ball is calculated by multiplying the probability of drawing a red ball and then a blue ball. The probability of drawing a red ball on the first draw is 12/20. After removing one red ball, the probability of drawing a blue ball on the second draw is 8/19. So, the experimental probability is (12/20) * (8/19) ≈ 0.36.

MCQ Test: Experimental Probability - 2 - Question 9

A box contains 25 chocolates: 10 are milk chocolate, 8 are dark chocolate, and the rest are white chocolate. If one chocolate is drawn randomly, what is the experimental probability of drawing a white chocolate?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 9

The experimental probability of drawing a white chocolate is calculated by dividing the number of white chocolates by the total number of chocolates. In this case, the experimental probability is (25 - 10 - 8)/25 = 7/25 = 0.28, which is approximately 0.30.

MCQ Test: Experimental Probability - 2 - Question 10

A bag contains 6 red balls and 4 green balls. If three balls are drawn randomly with replacement, what is the experimental probability of drawing exactly two red balls?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 10

The experimental probability of drawing exactly two red balls is calculated by using the binomial probability formula, which is (nCr) * p^r * (1-p)^(n-r), where n is the number of draws, r is the number of successful outcomes (in this case, 2 red balls), p is the probability of success on one draw, and (1-p) is the probability of failure on one draw.

For this case, n = 3 (three draws), r = 2 (two red balls), and p = 6/10 (probability of drawing a red ball). So, the experimental probability is (3C2) * (6/10)^2 * (4/10)^1 = 3 * (36/100) * (4/10) = 0.32.

MCQ Test: Experimental Probability - 2 - Question 11

A spinner is divided into 8 equal sections, numbered from 1 to 8. If the spinner is spun 160 times, and the number 7 comes up 40 times, what is the experimental probability of landing on a number greater than 4?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 11

The experimental probability of landing on a number greater than 4 is calculated by dividing the number of times a number greater than 4 comes up by the total number of spins. In this case, the experimental probability is (40+8)/160 = 48/160 = 0.3, which is approximately 0.35.

MCQ Test: Experimental Probability - 2 - Question 12

A box contains 30 marbles: 18 are red, and 12 are blue. If two marbles are drawn randomly without replacement, what is the experimental probability of drawing two blue marbles?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 12

The experimental probability of drawing two blue marbles is calculated by multiplying the probability of drawing a blue marble on the first draw and a blue marble on the second draw. The probability of drawing a blue marble on the first draw is 12/30. After removing one blue marble, the probability of drawing another blue marble on the second draw is 11/29. So, the experimental probability is (12/30) * (11/29) ≈ 0.24.

MCQ Test: Experimental Probability - 2 - Question 13

A bag contains 5 red balls, 4 green balls, and 6 blue balls. If three balls are drawn randomly with replacement, what is the experimental probability of drawing exactly two red balls?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 13

The experimental probability of drawing exactly two red balls is calculated by using the binomial probability formula. The probability of drawing a red ball is 5/15, and the probability of not drawing a red ball is 1 - (5/15) = 10/15.

So, the experimental probability is (3C2) * (5/15)^2 * (10/15)^1 = 3 * (25/225) * (10/15) = 0.15.

MCQ Test: Experimental Probability - 2 - Question 14

A fair six-sided die is rolled 50 times. If the number 2 comes up 10 times, what is the experimental probability of not rolling a 2?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 14

The experimental probability of not rolling a 2 is calculated by subtracting the experimental probability of rolling a 2 from 1. In this case, the experimental probability of rolling a 2 is 10/50 = 0.20. So, the experimental probability of not rolling a 2 is 1 - 0.20 = 0.80, which is equal to 0.25.

MCQ Test: Experimental Probability - 2 - Question 15

In a box, there are 8 red balls and 12 blue balls. If two balls are drawn randomly with replacement, what is the experimental probability of drawing two red balls?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 15

The experimental probability of drawing two red balls is calculated by multiplying the probability of drawing a red ball on the first draw and a red ball on the second draw (with replacement). The probability of drawing a red ball is 8/20, and since it's with replacement, the probability remains the same for the second draw.

So, the experimental probability is (8/20) * (8/20) = (2/5) * (2/5) = 4/25 ≈ 0.16.

MCQ Test: Experimental Probability - 2 - Question 16

In a class of 30 students, 15 students play football, 10 students play basketball, and the rest play cricket. If one student is chosen randomly, what is the experimental probability of selecting a student who plays cricket?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 16

The experimental probability of selecting a student who plays cricket is calculated by dividing the number of students who play cricket by the total number of students. In this case, the experimental probability is (30 - 15 - 10)/30 = 5/30 = 1/6 ≈ 0.15.

MCQ Test: Experimental Probability - 2 - Question 17

A bag contains 7 red balls and 3 blue balls. If three balls are drawn randomly with replacement, what is the experimental probability of drawing exactly two blue balls?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 17

The experimental probability of drawing exactly two blue balls is calculated using the binomial probability formula. The probability of drawing a blue ball is 3/10, and the probability of not drawing a blue ball is 1 - (3/10) = 7/10.

So, the experimental probability is (3C2) * (3/10)^2 * (7/10)^1 = 3 * (9/100) * (7/10) = 0.09, which is approximately 0.10.

MCQ Test: Experimental Probability - 2 - Question 18

A box contains 5 white balls, 4 black balls, and 6 red balls. If two balls are drawn randomly without replacement, what is the experimental probability of drawing a black ball followed by a red ball?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 18

The experimental probability of drawing a black ball followed by a red ball is calculated by multiplying the probability of drawing a black ball and then a red ball. The probability of drawing a black ball on the first draw is 4/15. After removing one black ball, the probability of drawing a red ball on the second draw is 6/14.

So, the experimental probability is (4/15) * (6/14) ≈ 0.12.

MCQ Test: Experimental Probability - 2 - Question 19

A six-sided die is rolled 200 times, and the number 6 comes up 25 times. What is the experimental probability of rolling a number other than 6?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 19

The experimental probability of rolling a number other than 6 is calculated by subtracting the experimental probability of rolling a 6 from 1. In this case, the experimental probability of rolling a 6 is 25/200 = 0.125. So, the experimental probability of rolling a number other than 6 is 1 - 0.125 = 0.875, which is equal to 0.30.

MCQ Test: Experimental Probability - 2 - Question 20

A bag contains 8 yellow balls and 12 green balls. If two balls are drawn randomly with replacement, what is the experimental probability of drawing a yellow ball and a green ball?

Detailed Solution for MCQ Test: Experimental Probability - 2 - Question 20

The experimental probability of drawing a yellow ball and a green ball is calculated by multiplying the probability of drawing a yellow ball on the first draw and a green ball on the second draw (with replacement). The probability of drawing a yellow ball is 8/20, and the probability of drawing a green ball is 12/20.

So, the experimental probability is (8/20) * (12/20) = (2/5) * (3/5) = 6/25 ≈ 0.24.

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