1 Experimental Approximation of Mercury Drop Velocity Using Uniform Random Probability in Jet Geometry

2 Input Parameters & Geometry of Viewing of Drops Case : Ellipse jet shape, b = ± m a = ± m y_m = ± m t = 25*14 ± 1 microsec to = 78.6 ± 62 microsec D = m θ = ± π/2 Case : Circle jet shape, b = ± m a = ± m All of the rest settings are same with ellipse case. b a y_m D Focal point Drop θ Chosen Example : 0T, 24GeV, 10Tp

3 CASE I : Elliptic Jet Shape

4 Probability Density of Angle θ Uniform in θ Uniform in Φ Uniform in s

5 Random Smapled Angle θ Uniform in θ Uniform in Φ Uniform in s

6 Histogram of Drop Velocity Uniform in θ Uniform in Φ Uniform in s

7 Gaussian Fitting of Histogram of Drop Velocity Uniform in θ Uniform in Φ Uniform in s

8 CASE II : Circular Jet Shape

9 Uniform in θ Uniform in Φ Uniform in s Probability Density of Angle θ

10 Random Smapled Angle θ Uniform in θ Uniform in Φ Uniform in s

11 Histogram of Drop Velocity Uniform in θ Uniform in Φ Uniform in s

12 Gaussian Fitting of Histogram of Drop Velocity Uniform in θ Uniform in Φ Uniform in s

13 Comparison Jet shapeP(θ) Velocity (m/s) MeanSigma Ellipse Uniform in theta Uniform in phi Uniform in position s Circle Uniform in theta Uniform in phi Uniform in position s