Answer: (a) power output = 3.85×10²⁶W
(b). There is no relative change in power as it is independent from frequency
(c). 590 W/m²
Step-by-step explanation:
given Radius between earth and sun to be = 1.50 × 10¹¹m
Intensity of the radiation from the sun measured on earth to be = 1360 W/m²
Frequency = 60 MHz
(a). surface area A of the sun on earth is = 4πR²
substituting value of R;
A = 4π(.50 × 10¹¹)² = 2.863 10²³×m²
A = 2.863 10²³×m²
now to get the power output of the sun we have;
P sun = I sun-earth A sun-earth
where A = 2.863 10²³×m², and I is 1360 W/m²
P sun = 2.863 10²³ × 1360
P sun = 3.85×10²⁶W
(c). surface area A of the sun on mars is = 4πR²
now we substitute value of 2.28 ×10¹¹ for R sun-mars, we have
A sun-mars = 4π(2.28× 10¹¹)²
A sun-mars = 6.53 × 10²³m²
now to calculate the intensity of the sun;
I sun-mars = P sun / A sun-mars
where P sun = 3.85×10²⁶W and A sun-mars = 6.53 × 10²³m²
I sun-mars = 3.85×10²⁶W / 6.53 × 10²³m²
I sun-mars = 589.6 ≈ 590 W/m²
I sun-mars = 590 W/m²