Difference between revisions of "1982 AHSME Problems/Problem 26"

Latest revision as of 14:50, 17 June 2021

Problem 26

If the base $8$ representation of a perfect square is $ab3c$ , where $a\ne 0$ , then $c$ equals

$\text{(A)} 0\qquad \text{(B)}1 \qquad \text{(C)} 3\qquad \text{(D)} 4\qquad \text{(E)} \text{not uniquely determined}$

Solution

A perfect square will be $(8k+r)^2=64k^2+16kr+r^2\equiv r^2\pmod{16}$ where $r=0,1,...,7$ .

Notice that $r^2\equiv 1,4,9,0 \pmod{16}$ .

Now $ab3c$ in base 8 is $a8^3+b8^2+3(8)+c\equiv 8+c\pmod{16}$ . It being a perfect square means $8+c\equiv 1,4,9,0 \pmod{16}$ . That means that c can only be 1 so the answer is 1 = $\boxed{\textbf{(B)}.}$ .

Partial and Wrong Solution

From the definition of bases we have $k^2=512a+64b+24+c$ , and $k^2\equiv 24+c \pmod{64}$

If $k=8j$ , then $(8j)^2\equiv64j^2\equiv0 \pmod{64}$ , which makes $c\equiv -24\pmod{64}$

If $k=8j+1$ , then $(8j+1)\equiv 64j^2+16j+1\equiv 16j+1\equiv 24+c \implies 16j\equiv 23+c$ , which clearly can only have the solution $c\equiv 7 \pmod{64}$ , for $j\equiv 1$ . This makes $k=9$ , which doesn't have 4 digits in base 8

If $k=8j+2$ , then $(8j+1)\equiv 64j^2+32j+4\equiv 32j+4\equiv 24+c \implies 32j\equiv 20+c$ , which clearly can only have the solution $c\equiv 12 \pmod{64}$ , for $j\equiv 1$ . $c$ is greater than $9$ , and thus, this solution is invalid.

If $k=8j+3$ , then $(8j+3)\equiv 64j^2+48j+9\equiv 48j+9\equiv 24+c \implies 48j\equiv 15+c$ , which clearly has no solutions for $0\leq c<10$ .

Similarly, $k=8j+4$ yields no solutions

If $k=8j+5$ , then $(8j+5)\equiv 64j^2+80j-1\equiv 16j-1\equiv 24+c \implies 16j\equiv 25+c$ , which clearly can only have the solution $c\equiv 9 \pmod{64}$ , for $j\equiv 1$ . This makes $k=13$ , which doesn't have 4 digits in base 8.

If $k=8j+6$ , then $(8j+6)\equiv 64j^2+96j+1\equiv 32j+36\equiv 24+c \implies 16j\equiv 23+c$ , which clearly can only have the solution $c\equiv 7 \pmod{64}$ , for $j\equiv 1$ . This makes $k=9$ , which doesn't have 4 digits in base 8

@@ Line 8: / Line 8: @@
 \text{(D)} 4\qquad
 \text{(E)} \text{not uniquely determined} </math>
+== Solution ==
+A perfect square will be <math>(8k+r)^2=64k^2+16kr+r^2\equiv r^2\pmod{16}</math> where <math>r=0,1,...,7</math>.
+Notice that <math>r^2\equiv 1,4,9,0 \pmod{16}</math>.
+Now <math>ab3c</math> in base 8 is <math>a8^3+b8^2+3(8)+c\equiv 8+c\pmod{16}</math>. It being a perfect square means <math>8+c\equiv 1,4,9,0 \pmod{16}</math>. That means that c can only be 1 so the answer is 1 = <math>\boxed{\textbf{(B)}.}</math>.
 == Partial and Wrong Solution ==
-From the definition of bases we have <math>24+c\equiv k^2 \pmod{64}</math>, where <math>k^2</math> is the perfect square.
+From the definition of bases we have <math>k^2=512a+64b+24+c</math>, and <math>k^2\equiv 24+c \pmod{64}</math>
-If <math>k=8j</math>, then <math>(8j)^2\equiv64j^2\equiv0 \pmod{64}</math>
+If <math>k=8j</math>, then <math>(8j)^2\equiv64j^2\equiv0 \pmod{64}</math>, which makes <math>c\equiv -24\pmod{64}</math>
 If <math>k=8j+1</math>, then <math>(8j+1)\equiv 64j^2+16j+1\equiv 16j+1\equiv 24+c \implies 16j\equiv 23+c</math>, which clearly can only have the solution <math>c\equiv 7 \pmod{64}</math>, for <math>j\equiv 1</math>. This makes <math>k=9</math>, which doesn't have 4 digits in base 8
@@ Line 18: / Line 25: @@
 If <math>k=8j+2</math>, then <math>(8j+1)\equiv 64j^2+32j+4\equiv 32j+4\equiv 24+c \implies 32j\equiv 20+c</math>, which clearly can only have the solution <math>c\equiv 12 \pmod{64}</math>, for <math>j\equiv 1</math>. <math>c</math> is greater than <math>9</math>, and thus, this solution is invalid.
-If <math>k=8j+3</math>, then <math>(8j+1)\equiv 64j^2+48j+9\equiv 48j+9\equiv 24+c \implies 48j\equiv 15+c</math>, which clearly has no solutions for <math>c<10</math>.
+If <math>k=8j+3</math>, then <math>(8j+3)\equiv 64j^2+48j+9\equiv 48j+9\equiv 24+c \implies 48j\equiv 15+c</math>, which clearly has no solutions for <math>0\leq c<10</math>.
-Similarly, <math>k=8j+4</math>, yields no solutions
+Similarly, <math>k=8j+4</math> yields no solutions
 If <math>k=8j+5</math>, then <math>(8j+5)\equiv 64j^2+80j-1\equiv 16j-1\equiv 24+c \implies 16j\equiv 25+c</math>, which clearly can only have the solution <math>c\equiv 9 \pmod{64}</math>, for <math>j\equiv 1</math>. This makes <math>k=13</math>, which doesn't have 4 digits in base 8.
 If <math>k=8j+6</math>, then <math>(8j+6)\equiv 64j^2+96j+1\equiv 32j+36\equiv 24+c \implies 16j\equiv 23+c</math>, which clearly can only have the solution <math>c\equiv 7 \pmod{64}</math>, for <math>j\equiv 1</math>. This makes <math>k=9</math>, which doesn't have 4 digits in base 8
+==See Also==
+{{AHSME box|year=1982|num-b=25|num-a=27}}
+{{MAA Notice}}

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Difference between revisions of "1982 AHSME Problems/Problem 26"

Latest revision as of 14:50, 17 June 2021

Contents

Problem 26

Solution

Partial and Wrong Solution

See Also