The digit in the unit's place of \(3^{999}\times 7^{1000}\) is \underline{\hspace{1.5cm}.}
Show Hint
- 7
- 1
- 3
- 9
The Correct Option is A
Solution and Explanation
Step 1: Units digit of \(3^{999}\).
Cycle for powers of \(3\): \(3,9,7,1\) (period \(4\)).
\(999 \equiv 3 \pmod{4}\Rightarrow\) units digit \(=7\).
\smallskip
Step 2: Units digit of \(7^{1000}\).
Cycle for powers of \(7\): \(7,9,3,1\) (period \(4\)).
\(1000 \equiv 0 \pmod{4}\Rightarrow\) units digit \(=1\).
\smallskip
Step 3: Multiply units digits.
\(7\times 1\) has units digit \(=7\).
Final Answer: \(\boxed{7}\)
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