Which equation correctly represents the inverse square law for radiation intensity with distance?

Radiation intensity falls off with the square of distance. If the distance from the source is r, the intensity I is proportional to 1/r^2. For two positions with distances D1 and D2 and corresponding intensities I1 and I2, you can write I1 = k/(D1^2) and I2 = k/(D2^2). Taking the ratio gives I1/I2 = (k/D1^2)/(k/D2^2) = D2^2/D1^2. This is exactly the form I1/I2 = (D2)^2/(D1)^2, which matches the inverse-square relationship. If you use (D1/D2)^2, you’d get I1/I2 = D1^2/D2^2, the reciprocal of the correct ratio (it corresponds to I2/I1). A linear difference like D2 − D1 or other non-squared forms don’t reflect the inverse-square behavior.