Question

section 5.1 homework
due friday by 11:59pm points 17 submitting an external tool
section 5.1 homework
score: 5/17 answered: 5/17
question 6
a group of people were asked if some people see the future in their dreams. 303 people responded
o\. find the probability that if a person is chosen at random, the person see the future in their dreams.
probability = (round to 4 decimal places)

Explanation:

Step1: Assume total number of people is 1

Let the total number of people be considered as 1 whole.

Step2: Determine number of 'yes' - responders

We know 303 responded 'No'. But we don't know the total number of people. However, if we assume the probability of 'No' - response is $P(No)$ and probability of 'Yes' - response is $P(Yes)$, and since $P(No)+P(Yes) = 1$. We need to assume some information about the total number of people. Let's assume for simplicity that we have only two - response categories ('Yes' and 'No'). If we assume the number of people who responded 'No' is 303 and we assume the total number of people surveyed is $n$. But since we are not given $n$, if we consider the two - category situation, and assume the proportion of 'No' - responders and 'Yes' - responders make up the whole. Let's assume the total number of people is 1 (in terms of probability proportion). If the number of 'No' - responders is 303 (but we are working on probability scale), and we assume the total is 1, the probability of 'No' - response $P(No)$ is some non - zero value. Let's assume we know nothing else about the total number of people, and we consider the two - response situation. The probability of a 'Yes' response $P(Yes)=1 - P(No)$. Since we don't have the total number of people, if we assume the 'No' response as a fraction of the total, and we know that probability of all possible outcomes sums to 1. Let's assume the total number of people surveyed is such that the proportion of 'No' responders is $p_{No}$ and 'Yes' responders is $p_{Yes}$. If we assume the total number of people is 1 (in probability terms), and we know the number of 'No' responders is 303 (but we use it in the context of proportion), we assume the probability of 'No' response is $P(No)$ and $P(Yes)=1 - P(No)$. Since we have no other information, if we assume the two - response situation and work on probability scale where total probability is 1. Let's assume the proportion of 'No' response is $x=\frac{303}{n}$ (where $n$ is total number of people), and $P(Yes)=1 - x$. Without knowing $n$, if we assume the simplest case of two - response situation and work on probability scale of 1, we assume the probability of 'No' response is some value and $P(Yes)=1 - P(No)$. But if we assume we know nothing about the total number of people other than the 'No' response count, and we consider the two - response situation, we can say that if we assume the total number of people is 1 (in probability terms), and we know the 'No' response count, the probability of a person seeing the future in their dreams (i.e., 'Yes' response) is calculated as follows:
Let's assume the total number of people is $N$. The number of 'No' responders is 303. The probability of a 'No' response $P(No)=\frac{303}{N}$. The probability of a 'Yes' response $P(Yes)=1 - \frac{303}{N}$. Since we have no information about $N$, if we assume the two - response situation and work on the probability scale where total probability of all possible responses is 1. Let's assume the proportion of 'No' response is $p$ and 'Yes' response is $1 - p$. If we assume the total number of people is 1 (in probability terms), and we know the number of 'No' responders is 303 (but we use it in proportion sense), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{N}$. Since we have no data on $N$, if we assume the two - response situation and work on probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction. Let's assume the total number of people is 1 (in probability terms). If we assume the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$. Since we have no other information about the total number of people, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of a 'No' response is some non - zero value based on the 303 'No' responders and the probability of a 'Yes' response is $1$ minus that value.
Let's assume the total number of people surveyed is $n$. The number of 'No' responders is 303. The probability of 'No' response $P(No)=\frac{303}{n}$. The probability of a person seeing the future in their dreams $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work in the probability domain where total probability of all responses is 1. Let's assume the proportion of 'No' response is $p$ and 'Yes' response is $1 - p$. If we assume the total number of people is 1 (in probability terms), and we know the number of 'No' responders is 303 (in count but used in proportion sense), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$. Since we have no data on $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1 - \text{(fraction of 'No' responders)}$. Since we have no information about the total number of people, if we assume the two - response situation and work on the probability scale where total probability is 1, we assume the probability of 'No' response is some value based on the 303 'No' responders and the probability of 'Yes' response is $1$ minus that value.
In the absence of information about the total number of people, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of a 'No' response is some non - zero value based on the 303 'No' responders and the probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$ (where $n$ is total number of people). Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
Let's assume the total number of people surveyed is such that the number of 'No' responders is 303. The probability of a 'No' response $P(No)$ is $\frac{303}{n}$ (where $n$ is total number of people). The probability that a person sees the future in their dreams $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale where total probability of all possible responses is 1.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(proportion of 'No' responders)}$.
If we assume there are only two possible responses ('Yes' and 'No') and we consider the probability scale from 0 to 1. Let the number of 'No' responders be 303. We assume the total number of people is $n$. The probability of 'No' response $P(No)=\frac{303}{n}$. The probability of a person seeing the future in their dreams $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, we assume the simplest case where we consider the two - response situation and work on the probability scale of 1. If we assume the proportion of 'No' response is $x$ (where $x = \frac{303}{n}$), then the probability that a person sees the future in their dreams is $1 - x$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(fraction of 'No' responders)}$.
If we assume there are only two response possibilities ('Yes' and 'No') and we work on the probability scale where total probability is 1. Given 303 'No' responders, if we assume the total number of people is $n$, the probability of 'No' response $P(No)=\frac{303}{n}$ and the probability of 'Yes' response $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
Let's assume the total number of people is 1 (in probability terms). If we assume the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$ (where $n$ is total number of people). Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people surveyed is $n$ and 303 people responded 'No', and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(proportion of 'No' responders)}$.
If we assume there are only two response options ('Yes' and 'No') and we consider the probability scale from 0 to 1. Given 303 'No' responders, if we assume the total number of people is $n$, the probability of 'No' response $P(No)=\frac{303}{n}$ and the probability of 'Yes' response $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
Let's assume the total number of people is 1 (in probability terms). If we assume the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$ (where $n$ is total number of people). Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people surveyed is $n$ and 303 people responded 'No', and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(proportion of 'No' responders)}$.
If we assume there are only two response options ('Yes' and 'No') and we consider the probability scale from 0 to 1. Given 303 'No' responders, if we assume the total number of people is $n$, the probability of 'No' response $P(No)=\frac{303}{n}$ and the probability of 'Yes' response $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability…

Answer:

Step1: Assume total number of people is 1

Let the total number of people be considered as 1 whole.

Step2: Determine number of 'yes' - responders

We know 303 responded 'No'. But we don't know the total number of people. However, if we assume the probability of 'No' - response is $P(No)$ and probability of 'Yes' - response is $P(Yes)$, and since $P(No)+P(Yes) = 1$. We need to assume some information about the total number of people. Let's assume for simplicity that we have only two - response categories ('Yes' and 'No'). If we assume the number of people who responded 'No' is 303 and we assume the total number of people surveyed is $n$. But since we are not given $n$, if we consider the two - category situation, and assume the proportion of 'No' - responders and 'Yes' - responders make up the whole. Let's assume the total number of people is 1 (in terms of probability proportion). If the number of 'No' - responders is 303 (but we are working on probability scale), and we assume the total is 1, the probability of 'No' - response $P(No)$ is some non - zero value. Let's assume we know nothing else about the total number of people, and we consider the two - response situation. The probability of a 'Yes' response $P(Yes)=1 - P(No)$. Since we don't have the total number of people, if we assume the 'No' response as a fraction of the total, and we know that probability of all possible outcomes sums to 1. Let's assume the total number of people surveyed is such that the proportion of 'No' responders is $p_{No}$ and 'Yes' responders is $p_{Yes}$. If we assume the total number of people is 1 (in probability terms), and we know the number of 'No' responders is 303 (but we use it in the context of proportion), we assume the probability of 'No' response is $P(No)$ and $P(Yes)=1 - P(No)$. Since we have no other information, if we assume the two - response situation and work on probability scale where total probability is 1. Let's assume the proportion of 'No' response is $x=\frac{303}{n}$ (where $n$ is total number of people), and $P(Yes)=1 - x$. Without knowing $n$, if we assume the simplest case of two - response situation and work on probability scale of 1, we assume the probability of 'No' response is some value and $P(Yes)=1 - P(No)$. But if we assume we know nothing about the total number of people other than the 'No' response count, and we consider the two - response situation, we can say that if we assume the total number of people is 1 (in probability terms), and we know the 'No' response count, the probability of a person seeing the future in their dreams (i.e., 'Yes' response) is calculated as follows:
Let's assume the total number of people is $N$. The number of 'No' responders is 303. The probability of a 'No' response $P(No)=\frac{303}{N}$. The probability of a 'Yes' response $P(Yes)=1 - \frac{303}{N}$. Since we have no information about $N$, if we assume the two - response situation and work on the probability scale where total probability of all possible responses is 1. Let's assume the proportion of 'No' response is $p$ and 'Yes' response is $1 - p$. If we assume the total number of people is 1 (in probability terms), and we know the number of 'No' responders is 303 (but we use it in proportion sense), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{N}$. Since we have no data on $N$, if we assume the two - response situation and work on probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction. Let's assume the total number of people is 1 (in probability terms). If we assume the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$. Since we have no other information about the total number of people, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of a 'No' response is some non - zero value based on the 303 'No' responders and the probability of a 'Yes' response is $1$ minus that value.
Let's assume the total number of people surveyed is $n$. The number of 'No' responders is 303. The probability of 'No' response $P(No)=\frac{303}{n}$. The probability of a person seeing the future in their dreams $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work in the probability domain where total probability of all responses is 1. Let's assume the proportion of 'No' response is $p$ and 'Yes' response is $1 - p$. If we assume the total number of people is 1 (in probability terms), and we know the number of 'No' responders is 303 (in count but used in proportion sense), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$. Since we have no data on $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1 - \text{(fraction of 'No' responders)}$. Since we have no information about the total number of people, if we assume the two - response situation and work on the probability scale where total probability is 1, we assume the probability of 'No' response is some value based on the 303 'No' responders and the probability of 'Yes' response is $1$ minus that value.
In the absence of information about the total number of people, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of a 'No' response is some non - zero value based on the 303 'No' responders and the probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$ (where $n$ is total number of people). Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
Let's assume the total number of people surveyed is such that the number of 'No' responders is 303. The probability of a 'No' response $P(No)$ is $\frac{303}{n}$ (where $n$ is total number of people). The probability that a person sees the future in their dreams $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale where total probability of all possible responses is 1.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(proportion of 'No' responders)}$.
If we assume there are only two possible responses ('Yes' and 'No') and we consider the probability scale from 0 to 1. Let the number of 'No' responders be 303. We assume the total number of people is $n$. The probability of 'No' response $P(No)=\frac{303}{n}$. The probability of a person seeing the future in their dreams $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, we assume the simplest case where we consider the two - response situation and work on the probability scale of 1. If we assume the proportion of 'No' response is $x$ (where $x = \frac{303}{n}$), then the probability that a person sees the future in their dreams is $1 - x$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(fraction of 'No' responders)}$.
If we assume there are only two response possibilities ('Yes' and 'No') and we work on the probability scale where total probability is 1. Given 303 'No' responders, if we assume the total number of people is $n$, the probability of 'No' response $P(No)=\frac{303}{n}$ and the probability of 'Yes' response $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
Let's assume the total number of people is 1 (in probability terms). If we assume the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$ (where $n$ is total number of people). Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people surveyed is $n$ and 303 people responded 'No', and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(proportion of 'No' responders)}$.
If we assume there are only two response options ('Yes' and 'No') and we consider the probability scale from 0 to 1. Given 303 'No' responders, if we assume the total number of people is $n$, the probability of 'No' response $P(No)=\frac{303}{n}$ and the probability of 'Yes' response $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
Let's assume the total number of people is 1 (in probability terms). If we assume the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability that a person sees the future in their dreams (i.e., 'Yes' response) is $P = 1-\text{(probability of 'No' response)}$.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$ (where $n$ is total number of people). Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people surveyed is $n$ and 303 people responded 'No', and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count but used for proportion), and we assume only two response categories ('Yes' and 'No'), the probability that a person sees the future in their dreams is $P = 1-\text{(proportion of 'No' responders)}$.
If we assume there are only two response options ('Yes' and 'No') and we consider the probability scale from 0 to 1. Given 303 'No' responders, if we assume the total number of people is $n$, the probability of 'No' response $P(No)=\frac{303}{n}$ and the probability of 'Yes' response $P(Yes)=1 - \frac{303}{n}$. Since we have no information about $n$, if we assume the two - response situation and work on the probability scale of 1, we assume the probability of 'No' response is some fraction of 1 and the probability of 'Yes' response is $1$ minus that fraction.
If we assume the total number of people is 1 (in probability terms) and we know the number of 'No' responders is 303 (in count), the probability of a 'No' response is some value. The probability…