B: Characterization is your answer
Both poets imply that value and dignity lie in the simple beauties of life, not in ambitious pursuits.
Answer:
Social.
Explanation:
A dual relationship is described as a relationship that involves several or multiple roles or relationships between the client and the therapist other than their therapist-client relationship. 'Social dual relationship' exemplifies a type of dual relationship that involves a friendly or any other social relationship between the client and the therapist.
As per the given situation, <u>'social dual relationship' has been exemplified here as 'the client's family's insistence to Matt(therapist) to stay over for dinner' and Matt's acceptance of the offer reflects that they share a friendly and affectionate bond other than their client-therapist relationship.</u> Thus, the <u>'social'</u> dual relationship is the answer.
The statement with which René Descartes would likely agree is A. The mind and body cannot be separated, therefore physical illness and mental illness cannot be separated.
<h3>Who is Rene Descartes?</h3>
This refers to the French philosopher who was also a scientist, and mathematician and believed that the mind and body were indivisible and is popular for the quote: "Cogito Ergo Sum" which means "As I think, therefore I am"
Hence, it can be seen that Rene Descartes is very likely to agree with option A because it shows the indivisibility of the mind and body and how sicknesses, both physical and mental were bound together and could not be separated.
With this in mind, it can be seen that the most obvious answer according to the given question is option A.
Read more about Rene Descartes here:
brainly.com/question/838565
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(0,0) lies on the shaded region.The shaded region lies below the line.
Putting ,x=0 and y=0 , from option(Inequality) 1 to 4
Option 1
0 ≤ -2-----Incorrect
Option 2
0 ≤ 0.5-----Correct
Option 3
0 ≤ 0.5 -------Correct
Option 4
0 ≥ 0.5 -------Incorrect
Origin(0,0) Satisfy Inequality 2 and Inequality 3.
Equation of line cuts Positive x and positive y axis.Also, angle made by line with positive Direction of X axis is Positive.
So, Tangent of Angle will be Positive.
Option 3 ,that is Inequality 3, satisfies the shaded region.
on:
