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FASTRAC Thermal Model Analysis. By Millan Diaz-Aguado. Overview. Sun/Shade and Line of Sight Heat Flux (Earth, Albedo, Sun) Heat Flux Earth and Albedo and View Factor Simple Example (Thin Disk) Two Square Parallel Surfaces Conduction through the Solar Panel Radiation to the Structure
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FASTRAC Thermal Model Analysis By Millan Diaz-Aguado
Overview • Sun/Shade and Line of Sight • Heat Flux (Earth, Albedo, Sun) • Heat Flux Earth and Albedo and View Factor • Simple Example (Thin Disk) • Two Square Parallel Surfaces • Conduction through the Solar Panel • Radiation to the Structure • Radiation to EMI • Future work and Conclusions
Eclipsed vs. Light • Find the position of the Sun (Julian Date) and the satellite, and calculate the angle between them (Θ). • If θ1 +θ2 > Θ then there is Line of Sight
Eclipsed vs. Light • Example: i=45º Ω=45º ω=0 h=300km on July 21st 2005
Environmental Heat Flux • Solar Heat Flux ( W/m2 ) q=1350 α cos(ψ) • Where ψ is the angle between the normal of the spacecraft surface and the Sun and α is the aborptivity of the surface • Earth Blackbody Radiation q=σ (T)4 α F • Where σ is the Stefan-Boltzmann constant, T is the temperature of Earth’s blackbody, and F is the view factor • Earth Albedo q=1350 AF α F cos (θ) • Where θ is the angle between the spacecraft surface and the Sun, AF is the Albedo Factor (~at 90 min orbit)
View Factor • Shape factor for different angles between the normal of the surface of the spacecraft and its position vector h/R=0.047 • Interpolate data if angle lays between the given data
Heat Flux for a Orbiting Thin Germanium Circular Disk • Altitude 300km, i=0º, α = 0.81
Temperature for Thin Disk • To calculate the surface temperature we use a simple ODE for radiated thin plate • Where ρ is the density, ε is the emissivity, h is the width and T is the temperature of the thin plate
Thermal Model of Two Parallel Plates • Plate 1 is facing the Earth • Plate 2 is facing away from the Earth • Radiation patterns will be different • View Factor is different as the plates are square Fse=.98 ε=.85 α=.81 Width=175 μm C=0.093 W-hr/(Kg-°C) ρ=5260 Kg/m³
Surface Heat Flux A) Plate 1 B) Plate 2
Surface Temperatures A) Plate 1 B) Plate 2
Conductance Through the Solar Panel 1 2 3 4 • The Solar Panel is assumed to have a multilayer wall • The temperature of the inner aluminum surface is calculated by: • Where t1 is the temperature of the outer surface, k is the thermal conductivity, Δx is the thickness and q/A is the heat flux k12 k23 k34
Radiation Between Two Parallel Surfaces • Radiation between the solar panel with side panel and EMI boxes • Where T is the surface temperature, ε is the emissivity and σ is the Stefan-Boltzmann 1 2
Buffed Aluminum Side Panel A) Plate 1 B) Plate 2
EMI Golden Anodized Aluminum A) Plate 1 B) Plate 2
Conclusion and Future Work • Conduction: • Between aluminum side panel and EMI box • Between solar panel and aluminum side panel • Between structural elements • Thruster tank • Four other sides of the hexagon, top and bottom sides • Inner Heat Production • Subsystems and Thruster • Rotation of the satellite • MLI
