Answer:
(a) & (d)
Explanation:
Given
Required
Which values of x makes the inequality true
First, we need to solve the inequality
Subtract 5 from both sides
This means that for the inequality to be true, x must be greater than 9.
i.e.
From the list of given options:
<em>Option (a) is true because 21, 22 and 23 > 9</em>
<em>Option (b) is false because 6, 7 and 8 < 9</em>
<em>Option (c) is false because only 10 and 11 > 9 but 9 < 9</em>
<em>Option (d) is true because 18, 19 and 20 > 9</em>
Answer:
Torvald means that if he lets his wife does what she wants or get away with certain acts he will become the laughing stock of the town. For the time it was crucial that the man was the leader of the household so if it looks like he has lost that authority it will damage his reputation.
Explanation:
Answer:
Literal sentence.
Explanation:
A <u>literal sentence</u> have words or phrases which conveys the exact same meaning as the words or phrases. While, a <u>non-literal</u> sentence have words or phrases conveying some special meaning far apart from the actual or dictionary meaning of the words or phrases.
Since, the sentence <em><u>" Ivy's town in Florida had not received snow in over ten years."</u></em><em><u> </u></em> conveys no other meaning than the literal meaning of the sentence it's a literal sentence.
Let s(i),k denote the substring s(i)s(i+1)...s k. Let Opt(k) denote whether the sub-string s1,k can be segmented using the words in the dictionary, namely (k) =1 if the segmentation is possible and 0 otherwise. A segmentation of this sub-string s1,k is possible if only the last word (say si k) is in the dictionary theremaining substring s1,i can be segmented.
Therefore, we have equation:Opt(k) = max Opt(i) 0<i<k and s(i+1),kis a word in the dictionary
We can begin solving the above recurrence with the initial condition that Opt(0) =1 and then go on to comput eOpt(k) for k= 1, 2. The answer correspond-ing to Opt(n) is the solution and can be computed in Θ(n2) time.
The sentence that is punctuated correctly is: He wrote a quick note: "Wed., Sept. 18, Ryan's first game." Notice that the words "Wed." and "Sept." have periods at the end. These periods indicate that these words are contractions or shortened forms of the original words. Words like these should always have a period at the end of them.