The relationship between the National Response Framework (NRF) and the NIMS is: The response protocols and structures described in the NRF align with the NIMS, and all NIMS components support response.
The National Response Framework (NRF) provides a guiding principles on how a nation should uniformly respond to all types of disasters and emergencies at all jurisdictional levels.
National Incident Management System (NIMS) is a comprehensive, national approach or response to domestic incident and emergency management that is applicable at all jurisdictional levels and across functional disciplines with respect to the following:
- The federal, state and local governments.
- Non-governmental organizations (NGO).
- Families and individuals.
In conclusion, the relationship between the National Response Framework (NRF) and the National Incident Management System (NIMS) is that the response protocols and structures described in the National Response Framework (NRF) is in tandem (align) with the National Incident Management System (NIMS), as well as all NIMS components support response.
Read more on NIMS here: brainly.com/question/14420110
Lol the person who originally answered this question deleted their comment bc I said they were wrong lol. The correct answer is Adulthood
Answer:
48.9 secs or 49 secs
Explanation:
Just divide 29.6 from 1450
Answer:
a. 99.30% of the woman meet the height requirement
b. If all women are eligible except the shortest 1% and the tallest 2%, then height should be between 58.32 and 68.83
Explanation:
<em>According to the survey</em>, women's heights are normally distributed with mean 63.9 and standard deviation 2.4
a)
A branch of the military requires women's heights to be between 58 in and 80 in. We need to find the probabilities that heights fall between 58 in and 80 in in this distribution. We need to find z-scores of the values 58 in and 80 in. Z-score shows how many standard deviations far are the values from the mean. Therefore they subtracted from the mean and divided by the standard deviation:
z-score of 58 in=
= -2.458
z-score of 80 in=
= 6.708
In normal distribution 99.3% of the values have higher z-score than -2.458
0% of the values have higher z-score than 6.708. Therefore 99.3% of the woman meet the height requirement.
b)
To find the height requirement so that all women are eligible except the shortest 1% and the tallest 2%, we need to find the boundary z-score of the
shortest 1% and the tallest 2%. Thus, upper bound for z-score has to be 2.054 and lower bound is -2.326
Corresponding heights (H) can be found using the formula
and
Thus lower bound for height is 58.32 and
Upper bound for height is 68.83