Respuesta :
Answer:
[tex] p = \frac{Poissible}{total}= \frac{2836}{4215}= 0.673[/tex]
For this case this probability represent more than 50% of the participants, so we can't consider this an unusual value.
When the responses were obtained from those who decided to respond a survey posted on the internet we have some problems associated to the sampling frame, since we are not considering all the possible individuals in order to take the sample of interest, we can have undercoverage and associated bias in the results.
Step-by-step explanation:
For this case we have the following data given:
162 respondents say that they never use a credit card
1217 say that they use it sometimes
2836 say that they use it frequently
So then the total os participants for this survey is:
162+1217+2836 = 4215
And we want to calculate the probability that a randomly selected person uses a credit card frequently. Using the definition of probability we got this:
[tex] p = \frac{Poissible}{total}= \frac{2836}{4215}= 0.673[/tex]
For this case this probability represent more than 50% of the participants, so we can't consider this an unusual value.
When the responses were obtained from those who decided to respond a survey posted on the internet we have some problems associated to the sampling frame, since we are not considering all the possible individuals in order to take the sample of interest, we can have undercoverage and associated bias in the results.
