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Correct Answer : Semi-major axis
Explanation : Out of the six Keplerian orbital elements, semi-major axis (a) helps in determining the size of the conic orbit. It is defined as the half of the long axis of the ellipse. The orbital period and energy depend on the orbit size.
Correct Answer : Option (B) : 830.66 km
Explaination : Eccentricity (e) = 1.3Specific Energy (ε) = 199.3 km2/s2Gravitational parameter (μ) = 398,600 km3/s2We know,Semi-major axis (a) = μ/(2ε)= 398,600/(2*199.3)= 1000 kmAiming radius (Δ) = a*(e2 – 1)1/2= 1,000*(1.32 – 1)1/2= 830.66 km
Correct Answer : Option (A) : True
Explanation : True. Hyperbolic excess velocity is the relative velocity between helio-centered ellipse and earth’s orbit. It is achieved when a spacecraft accelerates to a speed more than escape velocity. Maintaining a proper hyperbolic excess is important to perform inter-planetary transfers.
Correct Answer : Option (C) : 20,000 km
Explanation : Perigee radius (rp) = 9,800 kmPerigee radius (ra) = -49,800 kmWe know, for hyperbolas,rp = a(e – 1)ra = -a(e + 1)where, a and e are semi-major axis and eccentricity, respectivelyDividing equations mentioned above and substituting the given values, we get,9800/49,800 = (e – 1)/(e + 1)0.1968(e + 1) = e – 10.8032e = 1.1968e = 1.49Substituting back into perigee radius equation, we get,Semi-major axis (a) = rp/(e – 1)= 9800/(1.49 – 1)= 20,000 km
