Answer:
The rario of the rotational and translational kinetic energies of Earth in its orbit is 1.81×10^-11
Explanation:
Rotational Kinetic Energy (RKE) = 1/2Iw^2
I (moment of inertia) = mr^2 = m(6.38×10^6)^2 = 40.7044×10^12m
w (angular velocity) = v/r
w^2 = v^2/r^2 = v^2/(1.5×10^12)^2 = v^2/2.25×10^24
RKE = 1/2(40.7044×10^12m × v^2/2.25×10^24) = 1/2(1.81×10^-11mv^2)
Translational Kinetic Energy (TKE) = 1/2mv^2
RKE/TKE = 1/2(1.81×10^-11mv^2) × 2/mv^2 = 1.81×10^-11
Explanation:
Write down the values given in the question
Mass of earth , m = 5.98 × 10^24 Kg
radius , r = 6.38 × 10^6 m
distance from sun , d = 1.5 × 10^11 m
a)
Rotational kinetic energy of earth on axis = 0.5 × I × w^2
Rotational kinetic energy of earth on axis = 0.5 × (2/3 × m × r^2) × (2pi / T)^2
Rotational kinetic energy of earth on axis = 0.5 × (2/3 × 5.98 × 10^24 × (6.38 × 10^6)^2) × (2pi / (24 × 3600))^2
Rotational kinetic energy of earth on axis = 4.29 × 10^29 J
the Rotational kinetic energy of earth on axis is 4.29 × 10^29 J
b)
For the earth going around the sun
Kinetic energy of earth = 0.5 × I × w^2
Kinetic energy of earth = 0.5 × m × d^2 × (2pi /T )^2
Kinetic energy of earth = 0.5 × 5.98 × 10^24 × (1.5 × 10^11) ^2 × (2pi / (365 × 24 × 3600))^2
Kinetic energy of earth = 2.671 × 10^33 J
the Kinetic energy of earth is 2.671 × 10^33 J
