Difference between revisions of "2022 AIME I Problems/Problem 2"

Revision as of 16:05, 2 February 2024

Problem

Find the three-digit positive integer $\underline{a}\,\underline{b}\,\underline{c}$ whose representation in base nine is $\underline{b}\,\underline{c}\,\underline{a}_{\,\text{nine}},$ where $a,$ $b,$ and $c$ are (not necessarily distinct) digits.

Solution 1

We are given that $100a + 10b + c = 81b + 9c + a,$ which rearranges to $99a = 71b + 8c.$ Taking both sides modulo $71,$ we have $\begin{align*} 28a &\equiv 8c \pmod{71} \\ 7a &\equiv 2c \pmod{71}. \end{align*}$ The only solution occurs at $(a,c)=(2,7),$ from which $b=2.$

Therefore, the requested three-digit positive integer is $\underline{a}\,\underline{b}\,\underline{c}=\boxed{227}.$

~MRENTHUSIASM

Solution 2

As shown in Solution 1, we get $99a = 71b+8c$ .

Note that $99$ and $71$ are large numbers comparatively to $8$ , so we hypothesize that $a$ and $b$ are equal and $8c$ fills the gap between them. The difference between $99$ and $71$ is $28$ , which is a multiple of $4$ . So, if we multiply this by $2$ , it will be a multiple of $8$ and thus the gap can be filled. Therefore, the only solution is $(a,b,c)=(2,2,7)$ , and the answer is $\underline{a}\,\underline{b}\,\underline{c}=\boxed{227}$ .

~KingRavi

Solution 3

As shown in Solution 1, we get $99a = 71b+8c.$

We list a few multiples of $99$ out: $99,198,297,396.$ Of course, $99$ can't be made of just $8$ 's. If we use one $71$ , we get a remainder of $28$ , which can't be made of $8$ 's either. So $99$ doesn't work. $198$ can't be made up of just $8$ 's. If we use one $71$ , we get a remainder of $127$ , which can't be made of $8$ 's. If we use two $71$ 's, we get a remainder of $56$ , which can be made of $8$ 's. Therefore we get $99\cdot2=71\cdot2+8\cdot7$ so $a=2,b=2,$ and $c=7$ . Plugging this back into the original problem shows that this answer is indeed correct. Therefore, $\underline{a}\,\underline{b}\,\underline{c}=\boxed{227}.$

~Technodoggo

Solution 4

As shown in Solution 1, we get $99a = 71b+8c$ .

We can see that $99$ is $28$ larger than $71$ , and we have an $8c$ . We can clearly see that $56$ is a multiple of $8$ , and any larger than $56$ would result in $c$ being larger than $9$ . Therefore, our only solution is $a = 2, b = 2, c = 7$ . Our answer is $\underline{a}\,\underline{b}\,\underline{c}=\boxed{227}$ .

~Arcticturn

Solution 5

As shown in Solution 1, we get $99a = 71b+8c,$ which rearranges to $99(a – b) = 8c – 28 b = 4(2c – 7b) \le 4(2\cdot 9 - 0 ) = 72.$ So $a=b, 2c = 7b \implies c=7, b=2,a=2.$

vladimir.shelomovskii@gmail.com, vvsss

Solution 6

As shown in Solution 1, we have that $99a = 71b + 8c$ .

Note that by the divisibility rule for $9$ , we have $a+b+c \equiv a \pmod{9}$ . Since $b$ and $c$ are base- $9$ digits, we can say that $b+c = 0$ or $b+c=9$ . The former possibility can be easily eliminated, and thus $b+c=9$ . Next, we write the equation from Solution 1 as $99a = 63b + 8(b+c)$ , and dividing this by $9$ gives $11a = 7b+8$ . Taking both sides modulo $7$ , we have $4a \equiv 1 \pmod{7}$ . Multiplying both sides by $2$ gives $a\equiv 2 \pmod{7}$ , which implies $a=2$ . From here, we can find that $b=2$ and $c=7$ , giving an answer of $\boxed{227}$ .

~Sedro

Video Solution by OmegaLearn

https://youtu.be/SCGzEOOICr4?t=340

~ pi_is_3.14

Video Solution (Mathematical Dexterity)

https://www.youtube.com/watch?v=z5Y4bT5rL-s

Video Solution

https://www.youtube.com/watch?v=CwSkAHR3AcM

~Steven Chen (www.professorchenedu.com)

Video Solution

https://youtu.be/MJ_M-xvwHLk?t=392

~ThePuzzlr

Video Solution by MRENTHUSIASM (English & Chinese)

https://www.youtube.com/watch?v=v4tHtlcD9ww&t=360s&ab_channel=MRENTHUSIASM

~MRENTHUSIASM

Video Solution

https://youtu.be/YcZzxez-j-c

~AMC & AIME Training

@@ Line 48: / Line 48: @@
 '''vladimir.shelomovskii@gmail.com, vvsss'''
+== Solution 6 ==
+As shown in Solution 1, we have that <math>99a = 71b + 8c</math>.
+Note that by the divisibility rule for <math>9</math>, we have <math>a+b+c \equiv a \pmod{9}</math>.  Since <math>b</math> and <math>c</math> are base-<math>9</math> digits, we can say that <math>b+c = 0</math> or <math>b+c=9</math>.  The former possibility can be easily eliminated, and thus <math>b+c=9</math>.  Next, we write the equation from Solution 1 as <math>99a = 63b + 8(b+c)</math>, and dividing this by <math>9</math> gives <math>11a = 7b+8</math>.  Taking both sides modulo <math>7</math>, we have <math>4a \equiv 1 \pmod{7}</math>.  Multiplying both sides by <math>2</math> gives <math>a\equiv 2 \pmod{7}</math>, which implies <math>a=2</math>.  From here, we can find that <math>b=2</math> and <math>c=7</math>, giving an answer of <math>\boxed{227}</math>.
+~Sedro
 == Video Solution by OmegaLearn ==

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Difference between revisions of "2022 AIME I Problems/Problem 2"

Revision as of 16:05, 2 February 2024

Contents

Problem

Solution 1

Solution 2

Solution 3

Solution 4

Solution 5

Solution 6

Video Solution by OmegaLearn

Video Solution (Mathematical Dexterity)

Video Solution

Video Solution

Video Solution by MRENTHUSIASM (English & Chinese)

Video Solution

See Also