Answer:
[tex]6.4\times 10^{-5} = 0.000064 = 0.0064\%[/tex].
Step-by-step explanation:
Probability that the car encounters a green light on the first day: [tex]50 \% = 0.5[/tex].
To meet the question's conditions, the car needs to encounter another green light on the second day. Given that the colors of the light on each day are "independent," the chance that there's a green light followed by another green light will be
[tex](0.5) \times 0.5 = 0.25[/tex].
To meet the condition on the fifth day, there needs to be a yellow light. The probability that the condition is met on the first four days and on the fifth day will be [tex](0.5 \times 0.5 \times 0.5 \times 0.5) \times 0.1 = 0.5^{4} \times 0.1[/tex].
To meet the condition on the sixth day, all prior days should meet the conditions. Besides, there needs to be a red light on the sixth day. [tex](0.5^{4} \times 0.1) \times 0.4[/tex]
The question asks that the condition be met on all ten days. As a result, the probability of meeting the condition will be equal to the probability on the tenth day: [tex]0.5^{4} \times 0.1 \times 0.4^{5} = 6.4\times 10^{-5} = 0.000064 = 0.0064\%[/tex].
Answer:0.17274
Step-by-step explanation:
P(G) = 50/100=0.5
P(Y) = 10/100=0.1
P(R) = 40/100=0.4
In 10 days, since they are independent,
P(G) = 0.5*0.5*0.5*0.5=0.0625
P(Y) =0.1
P(R) = 0.4*0.4*0.4*0.4*0.4=0.01024
P(G) + P(Y) + P((R)= 0.17274