Answer: He is anxious to leave because he has realized that he took part in a great deception. His hasty departure reflects his state of mind in that he starts to panic and is afraid of what will happen when the authorities find out about this deception.
Explanation:
Friar Laurence is an important character in the play, since he is involved in the main plot and is the one who helps Romeo and his wife run away together. In Lines 155-159, Laurence becomes aware that he took part in a deception - he helped Romeo's wife fake her death. He also becomes aware of the consequences of his actions, which he will face once the authorities find out what he has done. This is why he insists that Romeo's wife leaves the vault with him, but when she refuses, he hurries up to leave before the authorities arrive.
C.)
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Answer:
Both passages deal with the same theme of the inevitability of death.
Explanation:
Both of the passages share the same theme of the inevitability of death.
"On Seeing the Elgin Stone", John Keats asserts the mortality of man and that death is something man or in any case, anyone can avoid. Likewise, William Wordsworth also emphasizes the inevitability of death in his poem "Ode on Intimations of Immortality from Recollections of Early Childhood". Both poets from the same Romantic period describes how things will all meet their end, even things that are believed to be immortal will eventually fade away.
Answer:
1. b 2. a
Explanation:
I dont know for sure but after reading the summary thats what i think
<h2><u><em>
Answer:</em></u></h2>
<em />
<em />
<em />
<h2><u><em>
Explanation:</em></u></h2>
<em>Task</em>: To find the derivative of 1/rootx
<em>Rewrite</em>: To find the derivative of the function 1 / 
To find the derivative, follow these steps:
<em>(i) Rewrite the function as</em>
=> 
<em>Remember that </em><em> can be written as </em>
<em />
=> 
=> 
<em />
<em />
<em>(ii) Multiply the coefficient of </em><em> by the power of </em><em />
Coefficient of <em> </em>= 1
Power of <em> </em>=
=> ( x 1)<em />
=> ( )<em />
=> <em />
<em />
<em>(iii) Subtract 1 from the power of </em><em />
=> 
<em />
=> <em />
Therefore, the derivative of 1/root x is <em />
