Probability that it will land on grey and then purple is [tex]0.34\;\rm{or}\;34\%[/tex].
Step-by-step explanation:
Given: it is equally probable that the pointer will land on any one of the six regions. if the pointer lands on a borderline, spin again.
According to question: if the pointer is spun twice, then we have to determine the probability that it will land on grey and the purple.
There are six regions which means there are [tex]6[/tex] equally probabilities for the pointer to land on grey and the purple.
Now, [tex]\rm{P(E)=\frac{No. \;of \;favorable \;outcomes}{Total \; number \;of \;outcomes}[/tex]
If each region has a colour the probability for it to land on is: [tex]\frac{1}{6}=\frac{1}{6}\times2= 34\%[/tex]
The numerator represents the only green or purple possibilities for there is only one region with each colour.
Therefore, probability that it will land on grey and then purple is .
Learn more about probability here:
https://brainly.com/question/9793303?referrer=searchResults
