Difference between revisions of "1993 AIME Problems/Problem 3"

Latest revision as of 23:05, 8 July 2022

Problem

The table below displays some of the results of last summer's Frostbite Falls Fishing Festival, showing how many contestants caught $n\,$ fish for various values of $n\,$ .

$\begin{array}{|c|c|c|c|c|c|c|c|c|} \hline n & 0 & 1 & 2 & 3 & \dots & 13 & 14 & 15 \\ \hline \text{number of contestants who caught} \ n \ \text{fish} & 9 & 5 & 7 & 23 & \dots & 5 & 2 & 1 \\ \hline \end{array}$

In the newspaper story covering the event, it was reported that

(a) the winner caught $15$ fish;

(b) those who caught $3$ or more fish averaged $6$ fish each;

(c) those who caught $12$ or fewer fish averaged $5$ fish each.

What was the total number of fish caught during the festival?

Solution 1

Suppose that the number of fish is $x$ and the number of contestants is $y$ . The $y-(9+5+7)=y-21$ fishers that caught $3$ or more fish caught a total of $x - \left(0\cdot(9) + 1\cdot(5) + 2\cdot(7)\right) = x - 19$ fish. Since they averaged $6$ fish,

$6 = \frac{x - 19}{y - 21} \Longrightarrow x - 19 = 6y - 126.$

Similarily, those who caught $12$ or fewer fish averaged $5$ fish per person, so

$5 = \frac{x - (13(5) + 14(2) + 15(1))}{y - 8} = \frac{x - 108}{y - 8} \Longrightarrow x - 108 = 5y - 40.$

Solving the two equation system, we find that $y = 175$ and $x = \boxed{943}$ , the answer.

Solution 2

Let $f$ be the total number of fish caught by the contestants who didn't catch $0, 1, 2, 3, 13, 14$ , or $15$ fish and let $a$ be the number of contestants who didn't catch $0, 1, 2, 3, 13, 14$ , or $15$ fish. From $\text{(b)}$ , we know that $\frac{69+f+65+28+15}{a+31}=6\implies f=6a+9$ . From $\text{(c)}$ we have $\frac{f+69+14+5}{a+44}=5\implies f=5a+132$ . Using these two equations gets us $a=123$ . Plug this back into the equation to get $f=747$ . Thus, the total number of fish caught is $5+14+69+f+65+28+15=\boxed{943}$ - Heavytoothpaste

@@ Line 1: / Line 1: @@
 == Problem ==
 The table below displays some of the results of last summer's Frostbite Falls Fishing Festival, showing how many contestants caught <math>n\,</math> fish for various values of <math>n\,</math>.
+<center><math>\begin{array}{|c|c|c|c|c|c|c|c|c|} \hline n & 0 & 1 & 2 & 3 & \dots & 13 & 14 & 15 \\
-<table border="1">
+\hline \text{number of contestants who caught} \ n \ \text{fish} & 9 & 5 & 7 & 23 & \dots & 5 & 2 & 1 \\
-<tr><td><math>n\,</math></td><td><math>0\,</math></td><td><math>1\,</math></td><td><math>2\,</math></td><td><math>3\,</math></td><td><math>\dots\,</math></td><td><math>13\,</math></td><td><math>14\,</math></td><td><math>15\,</math></td></tr>
+\hline \end{array}</math></center>
-<tr><td><math>\mbox{number of contestants who caught }n\mbox{ fish}\,</math></td><td><math>9\,</math></td><td><math>5\,</math></td><td><math>7\,</math></td><td><math>23\,</math></td><td><math>\dots\,</math></td><td><math>5\,</math></td><td><math>2\,</math></td><td><math>1\,</math></td></tr>
-</table>
 In the newspaper story covering the event, it was reported that
+:(a) the winner caught <math>15</math> fish;
+:(b) those who caught <math>3</math> or more fish averaged <math>6</math> fish each;
+:(c) those who caught <math>12</math> or fewer fish averaged <math>5</math> fish each.
+What was the total number of fish caught during the festival?
-(a) the winner caught 15 fish;
+== Solution 1==
+Suppose that the number of fish is <math>x</math> and the number of contestants is <math>y</math>. The <math>y-(9+5+7)=y-21</math> fishers that caught <math>3</math> or more fish caught a total of <math>x - \left(0\cdot(9) + 1\cdot(5) + 2\cdot(7)\right) = x - 19</math> fish. Since they averaged <math>6</math> fish, <center><math>6 = \frac{x - 19}{y - 21} \Longrightarrow x - 19 = 6y - 126.</math></center> Similarily, those who caught <math>12</math> or fewer fish averaged <math>5</math> fish per person, so <center><math>5 = \frac{x - (13(5) + 14(2) + 15(1))}{y - 8} = \frac{x - 108}{y - 8} \Longrightarrow x - 108 = 5y - 40.</math></center> Solving the two equation system, we find that <math>y = 175</math> and <math>x = \boxed{943}</math>, the answer.
-(b) those who caught 3 or more fish averaged 6 fish each;
+== Solution 2==
+Let <math>f</math> be the total number of fish caught by the contestants who didn't catch <math>0, 1, 2, 3, 13, 14</math>, or <math>15</math> fish and let <math>a</math> be the number of contestants who didn't catch <math>0, 1, 2, 3, 13, 14</math>, or <math>15</math> fish. From <math>\text{(b)}</math>, we know that <math>\frac{69+f+65+28+15}{a+31}=6\implies f=6a+9</math>. From <math>\text{(c)}</math> we have <math>\frac{f+69+14+5}{a+44}=5\implies f=5a+132</math>. Using these two equations gets us <math>a=123</math>. Plug this back into the equation to get <math>f=747</math>. Thus, the total number of fish caught is <math>5+14+69+f+65+28+15=\boxed{943}</math> - Heavytoothpaste
-(c) those who caught 12 or fewer fish averaged 5 fish each.
-What was the total number of fish caught during the festival?
-== Solution ==
-Suppose that the number of fish is <math>x</math> and the number of contestants is <math>y</math>. Of those which caught 3 or more fish (<math>y - 21</math> did that), <math>x - \left(0(9) + 1(5) + 2(7)\right) = x - 19</math> fish were caught. Since they averaged 6 fish, <math>6 = \frac{x - 19}{y - 21} \Longrightarrow x - 19 = 6y - 126</math>. Similarily, of those which caught 12 or fewer fish averaged 5 fish per person, so <math>5 = \frac{x - (13(5) + 14(2) + 15(1))}{y - 8} = \frac{x - 108}{y - 8} \Longrightarrow x - 108 = 5y - 40</math>. Solving the two equation system, we find that <math>y = 175</math> and <math>x = 943</math>, the answer.
 == See also ==
 {{AIME box|year=1993|num-b=2|num-a=4}}
+[[Category:Intermediate Algebra Problems]]
+{{MAA Notice}}

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Difference between revisions of "1993 AIME Problems/Problem 3"

Latest revision as of 23:05, 8 July 2022

Contents

Problem

Solution 1

Solution 2

See also