Rob de Groot

Corryong Cup 2017 · Task 3 (Open) (Thu, 12 Jan 2017) · open · ranked #10 · times in Australia/Melbourne (GMT+11)

Scores computed

Made goal in 2:23:26 — 672.4 points

The flight

What the tracklog shows, and which crossings scored.

This task has no start (SSS) turnpoint — the first turnpoint is treated as the start.
Completed the task — full task distance is credited.

Day quality — points on offer

Task validity 100% of a perfect day, so 1000 of 1000 points were available.

Launch validity — did enough registered pilots launch?100%
Distance validity — did the field fly far enough relative to the nominal distance?100%
Time validity — was the winning time long enough relative to the nominal time?100%
Points on offer for the day1000 pts

1000 × 1.00 × 1.00 × 1.00 = 1000

Split between the components by the goal ratio

distance 422.4 · time 404.3 · leading 101.1 · arrival 72.2

Distance points

422.4 pts
Scored distance75.7 km

Measured along the optimized task line, up to the furthest point on course.

Best distance in class75.7 km
Made goal — full available distance points.422.4 pts

Time points

224.8 pts
Time points use the 5⁄6 speed-fraction exponent (the current FAI S7F, S7F §11.2).
Your speed section time2:23:26
Fastest time in class1:52:25
Time points fall off with the gap to the fastest time224.8 pts

speed fraction = max(0, 1 − ((T − Tbest) ÷ √Tbest)^5⁄6) = 0.556; × 404.3 available = 224.8 (times in hours)

Leading points

0 pts
Leading points reward flying out front during the speed section — the pilot with the best leading coefficient takes all available leading points, others fall off with the gap.0 pts
Measured with the classic squared-distance leading coefficient (S7F §11.3.1, the hang-gliding / GAP2016–2018 variant).

Arrival points

25.3 pts
Arrival points reward crossing the end of the speed section early relative to the other pilots who reached it.25.3 pts

Total

672.4 pts
Distance + time + leading + arrival, minus penalties672.4 pts

422.4 + 224.8 + 25.3 ≈ 672.4 — the points above are shown rounded to 0.1; the total is rounded from their exact sum.