Question

Use Kepler’s first law to derive explicit expressions for the perihelion and aphelion distances for a planet in terms of the semi-major axis a, and the eccentricity e, for an elliptical orbit. r=a(1-e^2)/1+ecos(theta) Calculate these distances for Mercury. What are the perihelion and aphelion speeds of Mercury? V^2=GM(2/r-1/a)

Answer 1

Solution attached.
Solution the Orbital period of fleecury is 87.97 days. the planet's Semi major anu à ai pe=a3 the gemi masor anie in a(AU) = P² yean. Primang- 87.97 days / 365-26 days = 0.24yos. Use Kepler's law to get semimajor a mercung = 0.24 2/3 AU= 0.39 AU The velocity Venany = au x 0.39A0 0.24 yrs = 48km /sec the equation for ellepie Soal1-02) [ite coro] (Oэй ari

Closet at perikelion, 0-0 r =all-e) = 1 AU*(1-0.017). = 0.983 AU IC te) = 1 AU*(1+0.017) Sant = 1.017 AU va - amrage speed a for & pc = Vallte) = ulike) apr val l-e) = vllne) mercury - 47.4 km/s A- 57.9 Million (M) km - 0.2055 ope- 47.4 ( 1+0.2055) - 69.8km/s Pop - 4764 ( 1-0.2015) - 46.0 kmls

The total eneegy, E = 1 mv-amom E= - Grom za a encegy values divide to get the vz-AMO --CM for speed. Some v- samole valoda)