Lenses

SPECIFIC OBJECTIVES

To understand the difference between converging and diverging lenses; to build a working telescope.

EQUIPMENT

Lenses, lens carriers, optical bench, light source, screen, paper grid pattern.

BACKGROUND

Lenses work by bending rays of light in a phenomenon called refraction, the same process we studied in the prism experiment. Refraction occurs whenever light passes from a medium with one index of refraction to another medium with a different index of refraction. When light enters a less optically dense medium (lower index of refraction), it bends away from the perpendicular. When light enters a more optically dense medium (higher index of refraction), it bends toward the perpendicular.

$Refraction$

The surface of a lens is curved, but the law of refraction stated above still holds at every point on the curved surface.

Lens bending light ray

The figure below shows the path of some light rays from a point object through the a positive lens. You see that the lens refracts the rays passing through the edge of the lens while not refracting the ray that passes through the center of the lens. All of the rays from a point object converge at the same spot, producing a point image.

Image formation by lens

When the rays coming from the object are parallel, as occurs for very distant objects (farther away than about 50 focal lengths), an image forms at a distance from the lens called the focal length.

Parallel rays are focused by a
positive lens

Parallel rays are focused by a
positive lens

The focal length of a lens is determined by the index of refraction of the glass used and by the curvature of its surface. Once the lens is manufactured, its focal length is fixed.

In the figure of a positive eyepiece telescope below, F is the focal length of the objective lens and f is the focal length of the eye lens. The telescope has a theoretical magnifying power given by

M = - F / f

Positive eyepiece
telescope

There are two kinds of images formed by lenses, real and virtual. A real image can be projected onto a screen. A virtual image appears between the lens and the object and cannot be projected on a screen.

Virtual images can be formed by both converging and diverging lenses. Real images, however, can only be formed by converging lenses.

PROCEDURE

Positive and Negative Lenses

Place each of the four lenses on a page of text. When lifted slightly off the page, some lenses will magnify the text - these are converging or positive lenses. Others will make the text look smaller - these are diverging or negative lenses.
Hold one of the positive lenses at arm's length and look through it at some distant object. Does the image appear to hover between your eye and the lens? Or does the image appear to hover between the lens and the distant object? Is the image upright or inverted? What kind of image is this (real or virtual)?
Hold the negative lenses at arm's length and look through it at some distant object. Does the image appear to hover between your eye and the lens? Or does the image appear to hover between the lens and the distant object? Is the image upright or inverted? What kind of image is this (real or virtual)?

Determination of Focal Length

Determine the focal length of each positive lens by placing it on the optical bench between the light source and the screen.
Move the light source to one extreme on the optical bench. Move the screen to the other extreme on the bench. The vertical lines on the carriers give the position to the nearest half millimeter.
Slide the lens carrier along the optical bench until a sharp image of the source is formed on the screen.
Measure the object distance d_o between the light source and the lens, with an error estimate (the lens can be moved a certain distance with no apparent effect on the sharpness of the image). Measure the image distance d_i between the lens and the screen, with an error estimate.
Find the focal length of each positive lens using the lens grinder's equation:

1 / f = 1 / d_o + 1 / d_i
Is the image on the screen inverted or upright?
Is the image on the screen real or virtual?
Cover half of the lens with a piece of paper. What happens to the image?
Verify that the negative lens will not form an image on the screen. Therefore, this method cannot be used to determine the focal length of a negative lens.

Making a Telescope

Select the positive 200 mm focal length lens -- this will be the objective lens. Select the positive 100 mm focal length lens -- this will be the eye lens.
Remove the light source and screen from the bench. Mount the objective and eye lenses on the bench and adjust their separation to the sum of their two focal lengths. Position the optical bench so that it is aimed at something far away from you (Airline Garage).
Place your eye up close to the eye lens. Look toward the distant object through the eye lens and adjust the separation until you see a clear image. You now have a simple telescope.

An astronomical telescope consists of two convex lenses. The astronomical telescope in this experiment will form an image in the same place as as the object (see figure above).

The lenses are thin compared to the other distances involved which allows the thin lens equation to be used:

1 / f = 1 / d_o + 1 / d_i

Magnification, M, is the ratio of the image size to the object size. If the image is inverted, M is negative. The magnification for a thin lens is:

M = (- d_i / d_o)

The magnification, M, of a two-lens system is equal the product of the magnifications of the individual lenses:

M = M₁ M₂ = (- d_i1 / d_o1) (- d_i2 / d_o2)

Object at Infinity
Look through the lenses at a distant object. Adjust the distance between the lenses to focus the telescope with your eye relaxed. Estimate the observed magnification. Now calculate the magnification by taking the ratio of the focal lengths of the lenses. Compare the calculated magnification to the observed magnification.
Galilean Telescope
Make a new telescope using the -150 mm lens as the eyepiece and the +250 mm lens as the objective lens. Look through it at a distant object. Adjust the distance between the lenses to focus the telescope with your eye relaxed. How is the distance between the lenses related to their focal lengths?

How does the image viewed through this telescope differ from that of the previous telescope? Is the magnification positive or negative?

Sketch a ray diagram for this negative eyepiece telescope similar to the figure above for the positive eyepiece telescope. Make your sketch large and clear, noting any significant differences from the diagram of the positive eyepiece telescope.

What is the focal length of the negative lens? There are two ways to estimate this -- try them both and compare the results.

Analysis

For each positive lens, find the error in the focal length using

(f) / f² = ( d_o) / d_o² + ( d_i) / d_i²
For the positive eyepiece telescope, find the error in the theoretical magnification. Does your experimental value fall within this error range?
Discuss random and systematic errors in this experiment.

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