Answer:
Explanation:
There is plenty of evidence that Romeo and Juliet's love for one another is immature, at least at first. Romeo claims to be madly in love with another woman, Rosaline, at the start of the play.
Correct option is A.
In the portion shown, a nurse, most likely Julie's acquaintance, is conversing with Romeo to determine whether his love is genuine and to warn him. The nurse explains to Romeo that she wants him to truly love her, as seen by "if ye should lead her into a fool's paradise
As they say it would be a most nasty form of behavior" because the nurse wonders if Romeo loves Julio or is just playing with her by "leading her into fool's paradise." She also mentions that this would be a "really disgusting kind of behavior. "If you are not true to Juliet, you are behaving very terribly, says the choice that paraphrases the idea of the bolded part.
To know more about Act 2, refer to the link:
brainly.com/question/15952546
Answer: The rhyme scheme of the poem is, ABAB, CDCD, EFEF.
Explanation:
Rhyme schemes are the patterns of a line that are designed in such a way that they rhyme with each other. For example, the words game and same are rhyming words. In ‘Sonnet 5’ William Shakespeare have used ABAB, CDCD, EFEF rhyme scheme.
The first line of the poem ends with ‘frame’ (A). The second line end with the word ‘dwell’ (B). The third line end with ‘same’ (A), while the fourth line ends with ‘excel’ (B). Thus making it ABAB rhyme.
Similarly, the other lines (on-gone, there-where) make the CDCD rhyme scheme and so on.
This question is missing the options. I've found the complete question online. It is the following:
Which of the following statements is the inverse of "If you do not understand geometry, then you do not know how to reason deductively."?
A. If you reason deductively, then you understand geometry.
B. If you do not reason deductively, then you understand geometry.
C. If you understand geometry, then you reason deductively.
Answer:
The inverse of that statement is:
C. If you understand geometry, then you reason deductively.
Explanation:
To determine the inverse of a statement, we must negate both the hypothesis and the conclusion. In this case, the hypothesis is "if you do not understand geometry." It is already a negative sentence, which means its negation is "if you understand geometry." The same goes for the conclusion "then you do not know how to reason deductively." Its negation is "then you [know how to ] reason deductively." Putting them together, we have "If you understand geometry, then you reason deductively." - letter C
