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Q) Find the number of words with or without meaning which can be made using all the letters of the word AGAIN. If these words are written as in a dictionary, what will be the 50th word ❓️
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Answer:
The word fundamentalism originally referred to certain theological beliefs that developed into a movement among the Protestant groups in the United States during the 20th century. It was developed from the beliefs and values of the Fundamentalist-Modernist Controversy that was common during that period. Today, the term fundamentalism is widely used to refer to a set of theological beliefs that are recommended by certain religious groups.
History of fundamentalism
Historians have described three phases that explain the origin and development of fundamentalism. The first phase lasted from 1890 to 1925. During this period, fundamentalism began as a rebellion against the doctrines of American Protestantism, which is considered as one of the constituents of Evangelicalism.
The second phase was characterized by minimal recognition of Fundamentalism by the public. Even though, its fame declined during this phase, it did not disappear completely. The third phase was in the 1970s when it regained its fame and grew massively. Since then, different people have embraced it.
umm...what should i say...
well...wanna..be friends..?..if u are ok with that.?
umm..i don't think so...that day will come...#_#.
cause I'm nothing without them..@_@
Verified answer
Step-by-step explanation:
Question
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Find the number of words with or without meaning which can be made using all the letters of the word AGAIN. If these words are written as in a dictionary, what will be the 50
th
word?
Medium
Solution
verified
Verified by Toppr
There are 5 letters in the word AGAIN, in which A−2
∴ Required numbers of ways
=
2!
5!
=
2×1
5×4×3×2×1
=60
To get the number of words starting with A , fix A in first place and remaining 4 letters can be arranged in 4! ways = 24 ways
To get the number of word starting with G, fix G in first place and the remaining 4 letters in which A−2
∴ Number of word starting with G =
2!
4!
=12
Similarly, numbers of words starting with I=
2!
4!
=12
Total number of words so far obtained =24+12+12=48
The 49
th
word is NAAGI and 50
the word is NAAIG...
..