Answer:
[tex]\dfrac{5}{6}[/tex]
Step-by-step explanation:
When two dice are rolled, the sample space is
[tex]\begin{array}{cccccc}(1,1)&(1,2)&(1,3)&(1,4)&(1,5)&(1,6)\\(2,1)&(2,2)&(2,3)&(2,4)&(2,5)&(2,6)\\(3,1)&(3,2)&(3,3)&(3,4)&(3,5)&(3,6)\\(4,1)&(4,2)&(4,3)&(4,4)&(4,5)&(4,6)\\(5,1)&(5,2)&(5,3)&(5,4)&(5,5)&(5,6)\\(6,1)&(6,2)&(6,3)&(6,4)&(6,5)&(6,6)\end{array}[/tex]
In total, 36 outcomes
First, find the probability that the sum is 10 or greater:
All favorable outcomes
10: [tex](4,6),\ (5,5),\ (6,4)[/tex]
11: [tex](5,6),\ (6,5)[/tex]
12: [tex](6,6)[/tex]
In total, 6 outcomes.
The probability that the sum is 10 or greater is
[tex]P(A)=\dfrac{6}{36}=\dfrac{1}{6}[/tex]
Use the complement rule to find that the probability that the sum of the dice is less than 10:
[tex]P(A^C)=1-P(A)=1-\dfrac{1}{6}=\dfrac{5}{6}[/tex]
