[vc_row][vc_column width=”2/3″][vc_column_text]**The Inverse Square Law of Illuminance**

This law states that the Illuminance (E) at any point on a plane perpendicular to the line joining the point and source is inversely proportional to the square of the distance between the source and plane

Where, I is the luminous intensity in a given direction.

Suppose a source is present with luminous intensity I in any direction. From this source two distances are taken as the radius making this source as centre. As per the above figure, these two radiuses is r_{1} and r_{2}. At distance r_{1} dA_{1} is the elementary surface area is taken. Is this direction of dA_{1}, dA_{2} is considered at r_{2} distance?

dA_{1} and dA_{2} are within same solid angle Ω with same distributed luminous flux Φ. Area dA_{1} at r_{1} receives the same amount of luminous flux as area dA_{2} at as the solid are the same.

Again solid angle for both elementary surfaces

The Illuminance at distance

The Illuminance at distance

Now, from equation (i) we get,

Now in the equation (iii),

This indicates well known inverse square law relationship for point source. It is seen that Illuminance varies inversely as the square of the illuminated point from the source. If the light source is not a point source, then we can assume this large source as the summation of many point sources. This relationship can be applied to all light sources.

**The Cosine Law of Illuminance**

The law states that Illuminance at a point on a plane is proportional to the cosine of the angle of light incident (the angle between the direction of the incident light and the normal to the plane).

It is the point source Illuminance equation. Where, I_{θ} is the luminous intensity of the source in the direction of the illuminated point, Ɵ is the angle between the normal to the plane containing the illuminated point and the line joining the source to the illuminated point, and d is the distance to the illuminated point.

But for non point source, the cosine law of Illuminance can be analyzed in term of luminous flux instead of luminous intensity. The Illuminance or the surface density of the light flux received by an elementary area varies with the distance from the light source and the angle of the elementary area with respect to the direction of the light flux. The maximum Illuminance occurs when the element of area receives the light flux normal to its surface. When the element of area is tilted with respect to the direction of the light flux, the Illuminance or flux density on the elementary surface is reduced. This can be thought of in two ways.

- The tilted elementary area (δA) cannot intercept all the light flux it previously received and so the Illuminance falls.
- If the elementary area (δA) increases, the Illuminancefalls.

For case (1) when the element δA is tilted by an angle Ɵ the amount of flux intercepted δA is given by

So the flux received by δA is reduced by a factor cosƟ. Now the Illuminance at δA is

For case (2) if all the flux intercepted by larger element δA’ :

So Illuminance becomes,

Both cases of these approach result in

AUTHORS

1.Bunty B. Bommera

2.Dakshata U. Kamble[/vc_column_text][/vc_column][vc_column width=”1/3″][/vc_column][/vc_row]