In a recent study on world happiness, participants were asked to evaluate their current lives on a scale from 0 to 10, where 0 represents the worst possible life and 10 represents the best possible life. The responses were normally distributed, with a mean of 5.3 and a standard deviation of 2.5. Answer parts (a) dash (d) below. (a) Find the probability that a randomly selected study participant's response was less than 4. The probability that a randomly selected study participant's response was less than 4 is nothing. (Round to four decimal places as needed.)

P (X < 4) = 0.3015

Step-by-step explanation:

Given:

- The ratings for current lives on a scale 0 - 10 were normally distributed with parameters mean (u) and standard deviation (s).

u = 5.3

s = 2.5

Find:

Find the probability that a randomly selected study participant's response was less than 4.

Solution:

- Declare a random variable X that follows a normally distribution with parameters u and s, mean and standard deviation respectively.

X~N (5.3, 2.5)

- To determine the probability of the rating to be less than 4 for a randomly selected study participant's response we have:

P (X < 4)

- Compute the Z-score value for the limit given:

P (Z < (4 - 5.3) / 2.5)

P (Z < - 0.52)

- Use the Z-Table to calculate the above probability as follows:

P (Z < - 0.52) = 0.3015

- Hence, the required probability is equivalent to Z-score value probability:

P (X < 4) = P (Z < - 0.52) = 0.3015