Answer
$0.1346
Explanation:
Find probability of each card and the value of each card and then add them together.
Probability of getting a heart = 13/52
Price of one heart =$0.30
Pay for one heart = 13/52×0.30=$0.075
Probability of getting a queen =4/52
Price of one queen =$0.55
Pay for one queen =4/52×$0.55=$0.0423
Probability of getting a queen of hearts =1/52
Price of one queen =$0.90
Pay for one queen =1/52×$0.90=$0.0173
Therefore the pay for one draw= $0.075+$0.0423+$0.0173=$0.1346
Answer:
its c i think
Step-by-step explanation:
Answer:
72 m\ p.h.
Step-by-step explanation:
we have 60 minute in one hour
we must divide 60 by 5=12
then 6*12=72!!!
it is very easy
Answer:
Step-by-step explanation:
7x^2 + 4x
Answer:
If all the books are of the same size, this is truly a simple random sampling method.
If not, the random selection of the length of shelf at which the book to be sampled will be picked favours the bigger/fatter books and the process seizes to be a simple random sampling.
Check the explanation for more clarification.
Step-by-step explanation:
In simple random sampling, each member of the population has an equal chance of being sampled. The best way to go about this is usually to truly randomize the sampling technique by assigning numbers to members of a population and randomly picking the numbers. Any member of the population that the number picked belongs to, is picked to be sampled. The best way to pick random numbers is to use a computer program to do it these days.
So, for this problem, the librarian tries as much as possible and does randomize the sampling process enough for the books. But this is indeed a simple random sampling method if all the books truly have equal chance of being selected.
In selecting the shelf, it is as random as possible, but in selecting the book, the random length on the shelf picked will represent random sampling if all the books are similar in size. If not, the bigger/fatter books have a higher chance of being selected than the thinner ones and this seizes to be a random sampling technique if all the books do not have equal chance of being picked.
