Difference between revisions of "1987 AIME Problems/Problem 4"
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*<math>x - 60 < 0</math>. Then <math>y = \frac{5}{4}x-60</math>. | *<math>x - 60 < 0</math>. Then <math>y = \frac{5}{4}x-60</math>. | ||
− | The area of the region enclosed by the graph is that of the quadrilateral defined by the points <math>(48,0),\ (60,15),\ (80,0), \ (60,-15)</math>. Breaking it up into triangles and solving or using | + | The area of the region enclosed by the graph is that of the quadrilateral defined by the points <math>(48,0),\ (60,15),\ (80,0), \ (60,-15)</math>. Breaking it up into triangles and solving or using the [[Shoelace Theorem]], we get <math>2 \cdot \frac{1}{2}(80 - 48)(15) = \boxed{480}</math>. |
== Solution 2 == | == Solution 2 == | ||
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Now, let us remove the absolute values: | Now, let us remove the absolute values: | ||
− | When <math>x | + | When <math>x\ge 60</math>: <math>x-60+y=0.25x</math>. This rearranges to <math>y=-0.75x+60</math>. |
− | When <math>0 | + | When <math>0\le x<60</math>: <math>60-x+y=0.25</math>. So <math>y=1.25x-60</math>. |
When <math>x<0</math>: <math>60-x+y=-0.25x</math>. So <math>y=0.75x-60</math>. | When <math>x<0</math>: <math>60-x+y=-0.25x</math>. So <math>y=0.75x-60</math>. |
Latest revision as of 16:25, 13 February 2024
Contents
Problem
Find the area of the region enclosed by the graph of
Solution 1
Since is nonnegative, . Solving this gives us two equations: . Thus, . The maximum and minimum y value is when , which is when and . Since the graph is symmetric about the y-axis, we just need casework upon . , so we break up the condition :
- . Then .
- . Then .
The area of the region enclosed by the graph is that of the quadrilateral defined by the points . Breaking it up into triangles and solving or using the Shoelace Theorem, we get .
Solution 2
Since is the only present "term" in this equation, we know that the area must be symmetrical about the x-axis.
We'll consider the area when and we only consider the portion enclosed with . Then, we'll double that area since the graph is symmetrical.
Now, let us remove the absolute values:
When : . This rearranges to .
When : . So .
When : . So .
By simple sketching, we see the shape that looks like the image in Solution 1 (graph it out and you'll see). We see that the partial area we seek in this part is the triangle with the vertices , , . This triangle has an area of .
Simply double the area and we get as our final answer. ~hastapasta
See also
1987 AIME (Problems • Answer Key • Resources) | ||
Preceded by Problem 3 |
Followed by Problem 5 | |
1 • 2 • 3 • 4 • 5 • 6 • 7 • 8 • 9 • 10 • 11 • 12 • 13 • 14 • 15 | ||
All AIME Problems and Solutions |
The problems on this page are copyrighted by the Mathematical Association of America's American Mathematics Competitions.