2024 AMC 12B Problems/Problem 23
Problem
A right pyramid has regular octagon with side length as its base and apex Segments and are perpendicular. What is the square of the height of the pyramid?
Solution 1
To find the height of the pyramid, we need the length from the center of the octagon (denote as ) to its vertices and the length of AV.
From symmetry, we know that , therefore is a 45-45-90 triangle. Denote as so that . Doing some geometry on the isosceles trapezoid (we know this from the fact that it is a regular octagon) reveals that and .
To find the length , we cut the octagon into 8 triangles, each witha smallest angle of 45 degrees. Using the law of cosines on we find that .
Finally, using the pythagorean theorem, we can find that which is answer choice .
Solution 2 (Less computation)
Let be the center of the regular octagon. Connect , and let be the midpoint of line segment . It is easy to see that and . Hence, Hence, the answer is .
~tsun26