Newton's rings

This method for determining the wavelength of light was proposed by Sir Isaac Newton in his book Opticks, published in 1717. The experimental arrangement is shown in Figure 1.

A plano-convex lens of large radius of curvature R is placed on a plane glass plate with its curved surface downwards and is illuminated from above with a parallel beam of monochromatic light. Some of the light is reflected from the upper surface of the glass plate and some from the lower surface of the lens; interference thus occurs by division of amplitude, the fringes being localised in the air gap between the lens and plate.

At any point a distance r from the axis of the lens the path difference will be 2h,where his the distance between the lens and the plate at that point (See Figure 2). The interference fringes are circular because the system is symmetrical about the centre of the lens. The radius of any ring is given by:

(2R - h)h = r2 so r2 = 2Rh – h2

But h2 is small compared with 2Rh and so we can write: 2Rh = r2

The path difference (2h) is therefore r2/R


A phase change of occurs when the light reflects from the top surface of the plate but not at the lower surface of the lens, and therefore:

If a graph is plotted of r2 against m for the dark rings a straight line should be produced with a gradient given by:

(rm2 - r12)/(m - 1) = R

where r1 and rm are the radii of the first and m th rings respectively. (See Figure 3).

When doing the experiment it is much easier (and more accurate) to measure the diameter of the rings and then calculate their radius. A dark central spot should be obtained when viewed by reflection.

The rings can be viewed by transmission by putting the microscope below the plate, and if this is done the equations for bright and dark rings should be interchanged as two phase changes will occur, producing an effective path difference of 2. A bright central spot should be obtained.

If white light is used a few coloured rings will be seen due to the different wavelengths of the different colours of light.

Newton's rings and the refractive index of a liquid

Putting a liquid of refractive index nbetween the lens and the plate (Figure 5) will change the path difference to 2nhand give a formula for the m th dark ring of:

The radius of any given ring will be less with the liquid in place than without it.

This effect may be used to measure the refractive index of the liquid; the method is a good one since it is accurate and easy to perform, and only a small amount of the liquid is needed.

1