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25 May 2018, 02:38
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35%
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67% (01:06) correct
33%
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[GMAT math practice question]
If \(x\) and \(y\) are positive integers, what is the remainder when \(3^{4x+1}+y\) is divided by \(10\)?
\(1) x=2\)
\(2) y=3\)
If \(x\) and \(y\) are positive integers, what is the remainder when \(3^{4x+1}+y\) is divided by \(10\)?
\(1) x=2\)
\(2) y=3\)
25 May 2018, 02:44
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1. Statement 1 gives us information about x only. We need the value of y to determine the units digit of the equation given. Thus, statement 1 is insufficient.
2. In statement 2, we have the value of y. 3^(4x + 1), will always have its unit digit as 3. So, ultimately the units digit becomes 6 when 3 is added to it. Thus, this statement is sufficient.
Hence, imo B.
Posted from my mobile device
2. In statement 2, we have the value of y. 3^(4x + 1), will always have its unit digit as 3. So, ultimately the units digit becomes 6 when 3 is added to it. Thus, this statement is sufficient.
Hence, imo B.
Posted from my mobile device
