RTModel
Real-Time Microlensing Modelling by Valerio Bozza

 
OB151737
Planetary with parallax and/or orbital motion
 
Binary lens models with parallax
Model X1     χ2=30681.6    gOGLE=0.150962±0.736623

s=1.00795±0.168779    q=0.225038±0.244761    u0=0.624049±0.331157    θ=3.79636±0.270016    ρ*=0.0000101301±0.381436    tE=28.3391±7.20004    t0=7264.7±3.70615    
π=1.16157±5.93325    π||=-0.00288068±0.986043    
Model X2     χ2=30709.1    gOGLE=0.0722695±1.05426

s=0.982473±0.260403    q=0.242665±0.364927    u0=-0.661321±0.505729    θ=2.49701±0.248848    ρ*=0.00543248±0.499144    tE=29.2622±10.4433    t0=7264.47±4.54573    
π=-0.305246±7.02571    π||=-0.0236149±0.953225    
Binary lens models with parallax and orbital motion
Model O1     χ2=30640.8    gOGLE=0.144226±2.90369

s=1.0067±0.379655    q=0.230717±0.873611    u0=-0.629473±1.02815    θ=2.48861±1.22414    ρ*=0.0000104752±2.14144    tE=30.4058±106.959    t0=7264.62±14.2811    
π=-0.0465715±48.6523    π||=0.028692±4.87076    ds/dt=-0.752062±52.8363    dθ/dt=2.91263±204.03    w3=2.90869±763.961    
Binary lens models
Model L1     χ2=30889.6    gOGLE=0.0698836±0.529208

s=0.982026±0.134768    q=0.241698±0.189874    u0=0.662494±0.23273    θ=3.78561±0.19695    ρ*=0.0000101332±0.19109    tE=29.8017±5.0831    t0=7264.52±3.85315    
Model L2     χ2=31783.8    gOGLE=-0.87309±0.582371

s=0.500179±0.0581746    q=0.0449989±0.0212323    u0=1.65223±0.292361    θ=4.31809±0.155722    ρ*=0.0000101339±0.12411    tE=14.1739±1.23977    t0=7263.65±2.04715