Answer: The healthcare professionals can help equalize the unequal partnership between the adult patient and the provider by using preventive care services and promoting communication that can be directed to an institutional culture that normalizes appropriate assertive responses to stereotyping and ratifying adult patient’s life experience through health care personnel training. With this, they can educate both adult patient and the provider to become more mindful of cues that induce stereotypical thinking.
Explanation:
There are a lot of fraudulent activates on online and it is very important to guide against them. There are strategies and online resources to help you identify and respond to a potential hoax.
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First Identify that it is a hoax,
- Note that Hoaxes often booms where they are spread quickly and without consideration.
- If you notice or come in contact with a hoax through social media, the right thing to do thing to do is wait.
- The police or the school one is attending should issue a warning on the story.
Hoaxes are very common in the internet. Even with the recent digital technology, social media etc, a lot of spread of misinformation is now been spread at a faster and broader rate.
It is important that we as individuals, Parents and teachers be aware of the possibility that there may be shocking news about children and to known that the internet could be a hoax.
Learn more about Internet Hoaxes from
brainly.com/question/25915602
Answer:
to live
Explanation:
for tigers they need energy to run
Answer:
There are two rational roots for f(x)
Explanation:
We are given a function
f(x) = x^6-2x^4-5x^2+6f(x)=x6−2x4−5x2+6
To find the number of rational roots for f(x).
Let us use remainder theorem that when
f(a) =0, (x-a) is a factor of f(x) or x=a is one solution.
Substitute 1 for x
f(1) = 1-2-5+6=0
Hence x=1 is one solution.
Let us try x=-1
f(-1) = 1-2-5+6 =0
So x =-1 is also a solution and x+1 is a factor
We can write f(x) by trial and error as
f(x) = (x-1)(x+1)(x^2-3)f(x)=(x−1)(x+1)(x2−3)
We find that f(x) (x^2-3)f(x)(x2−3) factor gives two irrational solutions as
±√3.
Hence number of rational roots are 2.