Answer:
The probability of obtaining a sequence which is neither strictly increasing nor decreasing in 0.76.
Step-by-step explanation:
We have 10 possible outcomes on a single throw.
So, outcomes in 3 throws = [tex]10^{3} =1000[/tex] outcomes.
Let x be the number of strictly increasing arrangements.
Let y be the number of strictly decreasing arrangements.
Let z be the number of outcomes that are neither strictly decreasing nor strictly increasing
So, we have [tex]x+y+z=1000[/tex]
If we look at a strictly increasing arrangement from the other/opposite side, it will look like a strictly decreasing arrangement.
So, x = y
Hence, we can say the final equation will be :
[tex]2x+z=1000[/tex]
And for strictly increasing arrangements ,all 3 numbers will be different and it can be done in 10C3 ways.
10C3=[tex]\frac{10!}{3!7!}[/tex] = 120 ways
So, [tex]2x=2\times120=240[/tex]
Thus [tex]z=1000-240=760[/tex]
So, the probability is = [tex]\frac{760}{1000} = 0.76[/tex]
Therefore, the probability of obtaining a sequence which is neither strictly increasing nor decreasing in 0.76.
