In: Advanced Math
When a fair die is rolled n times, the probability of getting at most two sixes is 0.532 correct to three significant figures. (a) Find the value of n. ( Can help without using a GDC or write down steps on how to find answer from GDC. not just stating .. I know the answer is 15 but l need working steps on how to get 15 clear?)
Answer:)
Suppose we roll the dice N times. The probability of getting at most two sixes, is given by:
Where X is the random variable denoting the number of sixes that we obtain in N throws of the fair die. Then, we see that :
Since, we have 5 choices for not getting six (namely 1, 2, 3, 4 and 5) in each throw, and we throw the die N times, and also each throw is independent of each other, so the probabilities multiply.
Similarly, we see that :
since we get one six and rest all throws give non-sixes, but there are N possible throws this one 6 could occur at.
And also:
since we get two sixes and rest all throws give non-sixes, but there are possible throws these two sixes could occur at.
Thus, we are given that :
and we need to solve for N.
We can at this point use a graphing calculator to graph the function on the left, and see where it intersects the line y = 0.532, as done below:
The red line is the equation on the left, and the blue line is the equation y = 0.532. We see that the intersection occurs at