Question

Pecora and Carroll’s study of the synchronization of this property has been applied to sending secret messages. Cobweb plots can visualize why this property appears intermittently near “windows” in parameter space where it vanishes. As r approaches 3.57, this property arises as increasing (15[1])2-to-the-n (15[1])cycles appear in a recurrence relation that Robert May used to study population growth. 1D discrete maps that gain this property via the (*) period-doubling route, like the logistic (10[1])map, (-5[1])have cascading forks on their bifurcation diagrams. In phase space, systems with this property trace out fractals called strange attractors, like one named for Edward Lorenz. The double pendulum displays this property of extreme sensitivity to initial conditions. (10[1])For 10 points, name this difficult-to-predict behavior demonstrated by the butterfly effect. ■END■

ANSWER: chaos [or chaotic systems]
<VD, Physics>
= Average correct buzz position

Buzzes

PlayerTeamOpponentBuzz PositionValue
Benjamin ChapmanToronto AWaterloo Basic4215
Andrew WangIllinois BlueChicago A4315
Shahar SchwartzBerkeley PastStanford7110
Swapnil GargBerkeley ABerkeley B72-5
Anuttam RamjiBerkeley BBerkeley A11010

Summary

2024 ARCADIA at Waterloo2024-11-09Y1100%100%0%42.00
2024 ARCADIA at Illinois2024-11-09Y1100%100%0%43.00
2024 ARCADIA at UC Berkeley2024-12-06Y2100%0%50%90.50