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28 Nov 2019, 00:05
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E
Be sure to select an answer first to save it in the Error Log before revealing the correct answer (OA)!
Difficulty:
95%
(hard)
Question Stats:
37% (02:28) correct
63%
(02:33)
wrong
based on 255
sessions
History
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Not Attempted Yet
If \(f(n) = 1154*1156\) for some integer, n, which of the following expressions could be equal to \(f(n)\)?
A. \(3n - 2\)
B. \(5n - 2\)
C. \(5n + 3\)
D. \(7n - 2\)
E. \(11n + 10\)
Are You Up For the Challenge: 700 Level Questions
Updated on: 13 Jan 2020, 08:01
Originally posted by freedom128 on 28 Nov 2019, 08:45.
Last edited by freedom128 on 13 Jan 2020, 08:01, edited 2 times in total.
Last edited by freedom128 on 13 Jan 2020, 08:01, edited 2 times in total.
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\(f(n)=1154∗1156=(1155-1)*(1155+1)=1155^2-1=(3^2*5^2*7^2*11^2)-1\)
We understand that the units digit of \(f(n)=1155^2-1\) must be 4.
(B) f(n)=5n−2 --> units digit of the result is either 3 or 8
(C) f(n)=5n+3 --> units digit of the result is either 3 or 8
Thus, we confidently eliminate choices (B) and (C), since both choices NEVER yield results with units digit of 4
A. f(n)=3n−2
\(f(n)=3n−2=(3^2*5^2*7^2*11^2)-1\)
\(3n=(3^2*5^2*7^2*11^2)+1\)
\(n=(3*5^2*7^2*11^2)+1/3\)
--> \(n\) is NOT an integer, so we confidently eliminate choice (A), since \(n\) has to be some integer
D. f(n)=7n−2
\(f(n)=7n−2=(3^2*5^2*7^2*11^2)-1\)
\(7n=(3^2*5^2*7^2*11^2)+1\)
\(n=(3^2*5^2*7*11^2)+1/7\)
--> \(n\) is NOT an integer, so we confidently eliminate choice (D), since \(n\) has to be some integer
E. 11n+10
\(f(n)=11n+10=(3^2*5^2*7^2*11^2)-1\)
\(11n=(3^2*5^2*7^2*11^2)-11\)
\(n=(3^2*5^2*7^2*11)-1\)
--> \(n\) is an integer, so we are confident that choice (E) is the CORRECT ANSWER
Final answer is (E)
We understand that the units digit of \(f(n)=1155^2-1\) must be 4.
(B) f(n)=5n−2 --> units digit of the result is either 3 or 8
(C) f(n)=5n+3 --> units digit of the result is either 3 or 8
Thus, we confidently eliminate choices (B) and (C), since both choices NEVER yield results with units digit of 4
A. f(n)=3n−2
\(f(n)=3n−2=(3^2*5^2*7^2*11^2)-1\)
\(3n=(3^2*5^2*7^2*11^2)+1\)
\(n=(3*5^2*7^2*11^2)+1/3\)
--> \(n\) is NOT an integer, so we confidently eliminate choice (A), since \(n\) has to be some integer
D. f(n)=7n−2
\(f(n)=7n−2=(3^2*5^2*7^2*11^2)-1\)
\(7n=(3^2*5^2*7^2*11^2)+1\)
\(n=(3^2*5^2*7*11^2)+1/7\)
--> \(n\) is NOT an integer, so we confidently eliminate choice (D), since \(n\) has to be some integer
E. 11n+10
\(f(n)=11n+10=(3^2*5^2*7^2*11^2)-1\)
\(11n=(3^2*5^2*7^2*11^2)-11\)
\(n=(3^2*5^2*7^2*11)-1\)
--> \(n\) is an integer, so we are confident that choice (E) is the CORRECT ANSWER
Final answer is (E)
General Discussion
Archit3110
28 Nov 2019, 00:58
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the last two digits = 24
options a,b,c,d wont be possible
IMO E ; 11n+10
If f(n)=1154∗1156f(n)=1154∗1156 for some integer, n, which of the following expressions could be equal to f(n)f(n)?
A. 3n−2
B. 5n−2
C. 5n+3
D. 7n−2
E. 11n+10
options a,b,c,d wont be possible
IMO E ; 11n+10
If f(n)=1154∗1156f(n)=1154∗1156 for some integer, n, which of the following expressions could be equal to f(n)f(n)?
A. 3n−2
B. 5n−2
C. 5n+3
D. 7n−2
E. 11n+10
