Answer:
Hope this helps
Explanation:,
John held the plate carefully.
she sang happily
he is a terrible cook
the dog is angry. It barks angrily.
she sings the song good.
Answer:
You read to find out the central idea the character or you learns
Explanation:
As you know theme is "broad idea or a message that is to be conveyed through a literary work." I think what would best work is you reading the book a couple of times and seeing what the central idea the character or you learned.
I hope this helped. I am sorry if you get this wrong.
Answer:
He wants her to read his words and poems that has been inspired by her, ... Seeing as "Amoretti 1" is the first of his sonnet cycle, this poem fits the bill. ... Lines 5-6 "Vain man," said she, "that dost in vain assay, A mortal thing so to ... Lines 7-8. For I myself shall like to this decay, And eke my name be wiped out likewise."
Explanation:
vain man, said she, that dost in vain assay a mortal thing so to immortalize; for i myself shall like to this decay, and eke my name be wiped out likewise. now read the lines from donne’s "holy sonnet 10.” one short sleep past, we wake eternally, and death shall be no more; death, thou shalt die. which statement best describes how the sonnets convey the idea of mortality? a. in both sonnets, the speakers seek to understand why mortality is so final and unavoidable. b. in both sonnets, the speakers say that people need to be immortalized to be remembered after death. c. the speaker in the first sonnet seeks immortality, while the speaker in the second emphasizes the need to accept mortality. d. the speaker in the first sonnet says mortality is inevitable, while the speaker in the second emphasizes that the soul continues on. need asap edgenutiy
Answer:
a) ∀ (All students love MAT200 and do homework.)
b) ∃ (Some students love MAT200 and don’t do homework.)
c) ∀ (All Students have friends.)
d) ∃ (Some student’s friends love MAT200.)
e) ∃ (Some students are not friends, but they love MAT200.)
Explanation:
∀ is a logical operator symbol for universal quantification in predicate logic. It asserts that the property or relation holds true for all members of the domain.
∃ is a logical operator symbol for an existential quantification in predicate logic, which asserts that the property or relation holds true for some members of the domain and not for all.