Difference between revisions of "2021 JMPSC Sprint Problems/Problem 15"

Latest revision as of 19:54, 7 September 2021

Problem

Find the last two digits of $10^{10}-5^{10}.$

Solution

Note that $10^{10}\equiv0\pmod{100}$ and $5^{10}\equiv25\pmod{100}$ .

$0-25=-25$ . $-25\equiv\boxed{75}\pmod{100}$

Solution 2

By multiplying out several powers of $5$ , we can observe that the last $2$ digits are always $25$ (with the exception of $5^n$ where $n \le 1$ ). Also, $10^{10}$ ends with several zeros, so the answer is $100...00 - 25 = 99...99 - 24 = 999...\boxed{75}$ .

~Mathdreams

Solution 3

$100^{10} \equiv 0 \mod 100$ $5^{10} \equiv 25 \mod 100$ Therefore, the answer is $75$

- kante314 -

@@ Line 6: / Line 6: @@
 <math>0-25=-25</math>. <math>-25\equiv\boxed{75}\pmod{100}</math>
+== Solution 2 ==
+By multiplying out several powers of <math>5</math>, we can observe that the last <math>2</math> digits are always <math>25</math> (with the exception of <math>5^n</math> where <math>n \le 1</math>). Also, <math>10^{10}</math> ends with several zeros, so the answer is <math>100...00 - 25 = 99...99 - 24 = 999...\boxed{75}</math>.
+~Mathdreams
+== Solution 3 ==
+<cmath>100^{10} \equiv 0 \mod 100</cmath><cmath>5^{10} \equiv 25 \mod 100</cmath>Therefore, the answer is <math>75</math>
+- kante314 -
+==See also==
+#[[2021 JMPSC Sprint Problems|Other 2021 JMPSC Sprint Problems]]
+#[[2021 JMPSC Sprint Answer Key|2021 JMPSC Sprint Answer Key]]
+#[[JMPSC Problems and Solutions|All JMPSC Problems and Solutions]]
+{{JMPSC Notice}}

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