Chris Bush Week 9: March 22 nd , 2007

1. Chris BushWeek 9: March 22nd, 2007 D&C GroupHigh Thrust Trajectories ET, dE, aM, dM, aE Bush 1

2. Orbit Diagrams Earth Taxi (LEO to HEO) HEO to HMO Bush 2

3. Final Results HEO to HMO (Outbound) HMO to HEO (Inbound) Earth Taxi (LEO to HEO) Bush 3

4. Local Gravity Bush 4

5. HEO to HMO (Outbound) • Transfer is constrained by 3 year free return trajectory. • We use 1.5 year free return trajectory that completes 2 orbits. • This orbital period specifies the semi-major axis. • Use Lambert’s equation and iteratively solve for a time of flight that allows the CTV to rendezvous with Mars for a given time of departure from Earth. • Determine the heliocentric velocity of Earth and Mars at the departure and arrival times respectively. • Determine the required deep space maneuver • Determine the required velocity of the transfer orbit at both departure and arrival • Determine v_infinity at both departure and arrival • Determine delta_v for departure and arrival • Iterate this algorithm for various departure dates to find optimal transfer windows Bush 5

6. HMO to HEO (Inbound) • Same analysis as HEO to HMO except that a free return trajectory is not specified • Semi-major axis is chosen as average of distance of Mars from sun at departure and distance of Earth from sun at arrival. Bush 6

7. Earth Taxi (LEO to HEO) • We constrain the transfer orbit to a 2 day period and an altitude of periapsis of 250 km. • Period specifies the semi-major axis. • Iteratively solve for an eccentricity that allows the transfer orbit to be tangential to both LEO and HEO. • Subsquently, we calculate the two tangential burns. Bush 7