Answer:
Li-Young Lee’s “For a New Citizen of These United States” appeared in the poet’s second collection, The City in Which I Love You, published in Brockport, New York, in 1990. Like the majority of Lee’s poems, this one is based on his memories of a turbulent childhood, beginning with his family’s escape from Indonesia by boat in the middle of the night when he was only two years old. The past often plays a significant role in Lee’s poetry, for it is something he feels is always there— that, unlike a country or a prison, history is inescapable. But not all of the poet’s relatives and friends who endured the same fears and upheaval of life in exile share his notion of an unavoidable past. “For a New Citizen of These United States” addresses a “you” who is not specifically identified but who appears to be an acquaintance of Lee’s from the time of their flight from Indonesia. In this poem, the person spoken to is not enamored of things from the past, as Lee is, and seems not to recall any of the events and settings that Lee describes. Although the poem’s speaker—Lee himself, in this case—pretends to accept his acquaintance’s lack of interest and real or feigned forgetfulness of their shared history, his tone of voice and subtle sarcasm make it clear that he is frustrated by the other’s attitude. This premise dominates the poem from beginning to end.
The thing which the word "reciprocate" says about the diplomats' relationship is that they are respectful of each other.
<h3>What are Context Clues?</h3>
This refers to the hints and clues which gives a person extra information about a text to better understand a concept.
Hence, we can see that context clues were used to show the usage of the word "reciprocate" and the intended meaning and this was to show that the two men respect each other so they both hosted each other.
Read more about context clues here:
brainly.com/question/26349330
Is there a certain number of sentences you have to write ?
The correct answer is B. always.
They are always coplanar if there exists a geometric plane that contains them all, which indeed exists.