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Bunuel
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What is the probability of rolling two fair dice and having at least 30 Dec 2016, 04:45
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71% (01:05) correct 29% (01:10) wrong based on 242 sessions

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What is the probability of rolling two fair dice and having at least one die show an even number?

A. 35/36
B. 3/4
C. 1/2
D. 1/4
E. 1/36
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B
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What is the probability of rolling two fair dice and having at least 30 Dec 2016, 09:36
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Bunuel
What is the probability of rolling two fair dice and having at least one die show an even number?

A. 35/36
B. 3/4
C. 1/2
D. 1/4
E. 1/36
Show more

P (at least one even) = 1 - P(all odd) = \(1 - \frac{1}{2}*\frac{1}{2} = 1 - \frac{1}{4} = \frac{3}{4}\)

Answer B
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What is the probability of rolling two fair dice and having at least 01 Jan 2017, 23:23
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Answer can be B. 3/4
1/2 + 1/4
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What is the probability of rolling two fair dice and having at least 03 Jan 2017, 09:46
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Probability of first one being even and second one being odd number = 3/6*3/6
Probability of first one being odd and second being even = 3/6*3/6
Probability of both being even = 3/6*3/6
Total = 3/6*3/6+3/6*3/6+3/6*3/6 = 3/4 Ans.B
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What is the probability of rolling two fair dice and having at least 30 Mar 2017, 05:53
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P (at least one even) = 1 - P(all odd) = 1- 0.5*0.5= 0.75

So the Answer is B
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What is the probability of rolling two fair dice and having at least 10 Apr 2017, 19:18
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P(success) = 1 - P(zero success) = 1 - (1/2*1/2) = 3/4

whenever the question says "at least" it's always a better approach to go for complement rule
P(success) = 1 - P(zero success)

Posted from my mobile device
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What is the probability of rolling two fair dice and having at least 10 Apr 2017, 20:37
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Bunuel
What is the probability of rolling two fair dice and having at least one die show an even number?

A. 35/36
B. 3/4
C. 1/2
D. 1/4
E. 1/36
Show more

In order to solve this question we need to know the probability of rolling an even number on each individual dice. Dices are numbered 1-6 so the probability of rolling an even number is 3/6 and 3/6. We then use the formula.

P (at least one even) = 1 - P(all odd) =

P (at least one even) = 36/36 - P(9/36) = 27/36

simplify

Thus
B. 3/4
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What is the probability of rolling two fair dice and having at least Updated on: 10 Jan 2025, 20:46
Originally posted by BrushMyQuant on 08 Oct 2022, 10:14.
Last edited by BrushMyQuant on 10 Jan 2025, 20:46, edited 1 time in total.
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↧↧↧ Detailed Video Solution to the Problem ↧↧↧


We need to find What is the probability of rolling two fair dice and having at least one die show an even number?

As we are rolling two dice => Number of cases = \(6^2\) = 36

Let's solve the problem using two methods:

Method 1:

Now there are 4 outcomes possible
(Odd, Odd), (Odd, Even), (Even Odd), (Even, Even) and there is an equal chance of each of them happening

=> P(At least one number is Even) = P((Odd, Even) or (Even Odd) or (Even, Even)) = \(\frac{3}{4}\)

Method 2:

Out of the 36 comes lets eliminate all options in which both the outcomes are odd
Both can be odd in 3*3 (=9 ways), as in the first roll we can get any number out of 1, 3, and 5. And in the second case also we have these 3 choices.

=> P(At least one number is Even) = \(\frac{36 - 9}{36}\) = \(\frac{27}{36}\) = \(\frac{3}{4}\)

So, Answer will be B
Hope it helps!

Watch the following video to learn How to Solve Dice Rolling Probability Problems

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What is the probability of rolling two fair dice and having at least 17 Oct 2022, 23:51
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no even number = 1/2*1/2=1/4

Prob of at least 1 = 1-1/4=3/4.
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What is the probability of rolling two fair dice and having at least 29 Oct 2025, 23:50
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