March 03 LASERS 51
Optical Instruments• Camera
– Image size, brightness, exposure time• The eye
– Parts and basic functions– Visual acuity, why we need optical instruments
• Microscope– Simple magnifier, compound microscope, terminology
• Telescopes– Newtonian, Galilean, terrestrial– Binoculars, field of view– Laser beam expanders– Image relaying
March 03 LASERS 51
Simple camera
• Single meniscus lens (known as landscape lens)• A large field of view is desired (since landscapes are large)
– Some attempt at reducing astigmatism, coma and field curvature is made by adjusting the shape of the lens and the position of the stop
• Spherical aberration is controlled by reducing aperture size– Large f/# (slow, landscapes don’t move)
LandscapeLens
Object
Aperture stop Field stop
Film
Image
Focal plane
light baffle
March 03 LASERS 51
Image size vs focal length
• Image size is proportional to the lens focal length– Focal length is distance from principal plane to focal point
chief ray
chief rayf
fBoth lenses have same object, at a large distance
f
principalplane
Telephoto lens
March 03 LASERS 51
Light gathering power in a cameraAperture stop
focal length
Aperture stop diameter
rays not gettingto film plane
Aperture stoprays not gettingto film plane
f=focal length
D=aperture stop diameter
f/# = f/D
Small f/#, brighter image
• Rays carry energy– More rays getting to film plane gives brighter image
• Image size and location are not affected!!!!
focal length
Aperture stop diameter
Large f/#, dimmer image
March 03 LASERS 51
Exposure of film depends on total light energy incident on film • Larger aperture
stop– More rays get to
image– Image brighter– Less time needed
for exposure of film
• Smaller aperture stop– Image not as
bright– Longer exposure
time needed
Aperture stop
focal length
D
time (milliseconds)
shutter closed
shutter open
100
Aperture stop
focal length
D
time (milliseconds)
shutter closed
shutter open
400
March 03 LASERS 51
F-stops and exposure time• f-stop refers to the aperture stop NOT FIELD STOP
– Called f-stop because it is connected with the f/number
• Number of rays collected is proportional to area of aperture, i.e. D2
– Brightness (irradiance) proportional to– Increasing f/# by 2 decreases image irradiance by 4
• Exposure=total amount of light collected by the detector (film, CCD, etc.) during time that the shutter is open– Exposure , E.T.=exposure time (shutter open time)– For larger f/#, the exposure time must be longer to get the same
total light on the detector, thus optical system is slower
2
22
/#1
fD
f=
.E.T/#
12
•
∝
f
March 03 LASERS 51
Standard F-stops• Standard f/stops in cameras change image
irradiance by 2 – Diameter of aperture changes by √2 (e.g. 5.6, 4.0, 2.8)
• Smallest possible f/# corresponds to the aperture stop fully open
Smallest f/#
Focal length Dmax= 50mm/1.7=29.4mm
Aperture settings
March 03 LASERS 51
Charge-coupled devices (CCD)• Each square represents a
separate detector– Light creates electrons in each box
as long as shutter is open– Electrons are trapped in the box
until readout begins• Electronic signals during readout
shift electrons from one box to another– One row is shifted first– First row then shifted to readout
row. Columns in readout row are then shifted to output
– Continue until all rows readout
March 03 LASERS 51
A complex optical system-the eye• Several refractive
surfaces– Cornea largest power– Lens
• gradient index• aspheric surfaces• variable power
• Aperture stop at iris is variable from ~3-7 mm
• Scattered light limited by pigment epithelium
• Detector has two different types of elements– cones for color, rods for low light levels– fovea, high concentration of cones, no rods, most acute vision
March 03 LASERS 51
Optical properties of a “standard” eye
n=1.33
n=1.33
n=1.38-1.41
• All dimensions in millimeters• Eye shown relaxed (focused at infinity)• Nodal points and principal planes differ• Primary and secondary focal lengths differ
March 03 LASERS 51
Subtend – Latin 101sub[tend 7s!b tend$8 vt.
5L subtendere < sub-, under + tendere, to stretch: see TEND26 1 to extend under or be opposite to in position !each side of a triangle subtends the opposite angle"
Sub – submarine, subordinate, subliminal, sublease, sublunar
Tend – as in to have a tendency to
extend, tendon, contend, tent Line subtends angle α at point P
Pα
L=distance to point P
d=length of line
Note, for α in radians α=d/L, approximately
March 03 LASERS 51
Visual acuity (how small an object can be seen)
Θ, angle subtended by object at eye Image on
retina
s’y’, image height y’=Θs’
• Spacing between cones (detectors) in fovea ≈ 2.5µm– For a smaller image, details in the image are not observed
• You may still be able to tell that something is there
– Minimum subtended angle = 2.5µm/17.1mm=.15mr=0.5’• 0.5’ means 0.5 minutes of arc (60 minutes = 1 degree)
To see more detail, the image must be made larger by bringing the object closer to the eye. This
increases the subtended angle.
March 03 LASERS 51
Acuity in real eyes• Typical eyes have only slightly worse resolution
– This means that the design of the lens system is very well matched to the detector
• If the cones were closer together, you wouldn’t get better resolution because the aberrations of the lens would blur the image
• If the lens were better corrected, it wouldn’t help because conespacing limits resolution
• Diffraction also plays a role in resolution– If pupil size = 4 mm, f/# ≈ 4.8 (n’=1.33) diffraction
limited spot size = ~ 5µm, resolution ~ 1’– This corresponds to 1.5 ft at a distance of 1 mile, or
0.07mm at 250mm
March 03 LASERS 51
Near point• Bringing object closer improves resolution
– Lens of the eye changes focal length so image is on the retina– Lens can only bend a limited amount
• Once lens is bent to minimum focal length, bringing object closer doesn’t improve resolution because the eye can’t focus on it
• Near point is closest point that an object can be imaged– Lens of eye is made as strong as possible (largest power,
shortest focal length)– For a standard eye the near point is at 25 cm = 250 mm– Smallest feature that can be resolved is 0.3mr*250mm=75µm– If the lens cannot be bent enough to bring the near point in to
250 mm, the eye is presbyopic (old), lens is too stiff for cilliary muscles to bend it
March 03 LASERS 51
Far point• Far point is farthest point that an object can be imaged
– Lens of eye is made as weak as possible (smallest power)• cilliary muscles relaxed, most comfortable viewing
– The far point for a standard eye is infinity
• Defects of the eye’s focusing ability at long distances– If the fully relaxed eye images an object at a distance of less
than infinity the eye is myopic (near sighted)– If the eye is not fully relaxed when viewing an object at
infinity the eye is hypermetropic (far sighted)
March 03 LASERS 51
Spectacle lenses
• Positive lens (reading glasses) also used to correct presbyopia, the inability of the lens to accommodate
• Cylindrical lenses used to correct astigmatism due to a nonsymmetric cornea
• Excimer laser can be used to ablate some of the cornea and therefore change its shape, but can’t make lens more flexible
Contact lenses work the same way. They are slightly less powerful (thin lenses in contact), and also can be thin since they are small in diameter (sag formula). Note f only depends on radii.
March 03 LASERS 51
Visual optical instruments• Very small objects cannot be resolved by the naked eye
– Best resolution when object placed at near point– “Resolved” means making out details of the object, the presence
of a very small object can be detected if it emits enough light
• Very distant objects cannot be resolved by the naked eye– Why? The angle subtended by a distant object can be small even
if the object is very large, e.g. a star– The same comment about resolution applies here. Obviously we
can see stars, but we cannot make out any details about them as we can for example make out details on the moon’s surface.
– Sometimes distant objects cannot be seen because the eye’s pupil does not collect enough light
• Visual optical intsruments solve one or the other of these problems
March 03 LASERS 51
f
h
• To examine small objects (<75µm) a simple positive lens can be used– allows the object to be brought closer to the eye– Image is produced at a point comfortable for viewing, far point– Shown as a single lens here, but may be multi-element
Image at infinity
fh
=sizeangular
Without magnifier, object at near point
mmh
250sizeangular =
Angular magnification
fmm250
Simple microscope (magnifier)
With magnifier
March 03 LASERS 51
Other ways to use a magnifier• Angular size
subtended by imageis h/s– Since s<f, the angular size is
larger than when the objectis at the focal point
• Didn’t need to find image distance or size to make this conclusion, just based on chief ray
– Since image is no longer at infinity, the eye must focus on a closer object, cilliary muscles no longer relaxed
• Angular magnification can be increased until image is at near point
– Using same logic as before angular magnification is 250mm/s
f
h
h'
s
Important: when a magnifier is specified as 10x, this refers to the case of the image at infinity
March 03 LASERS 51
image onretina
hh'
αnear point, 25 cm
hh2''
α'
parallel
fs'
α
Angular magnification demystified (I hope) Unaided eye
Using magnifier
cmhsh
25)tan( =′=′ α
fhsh =′′=′ )tan(2 α
fcm
hh 25
)tan()tan(2 =′
=′′
αα
Eye has minimum focal length
Eye focused at infinity (relaxed)
• Image on retina made larger by lens– Eye lens changes to image on retina
• Increase in size is linear magnification
March 03 LASERS 51
More on angular magnification
f
h s
s (negative)'
• Angular magnification can be larger than 25cm/f – Image will no longer be at infinity (far point)
• Can also be derived from image size on retina
)tan()tan(
ααβ
′=
cmh
25)tan( =α s
h=′)tan(α
Definition of angular magnification
α determined by near point
α’ determined by chief ray
March 03 LASERS 51
Compound microscope, for smaller objects
• Objective lens forms a real, magnified image– magnification=Mobjective
• Eyelens (also ocular or eyepiece) used to view the image– Works just like simple magnifier discussed earlier– Angular magnification=Meyepiece
• Total magnification=Mobjective*Meyepiece• The eyepiece can replaced with a camera or CCD• A reticle can be inserted at the location of the real image
– Used to measure the object for example– Will appear to be at the same plane as the object
Objective lens Eyepiece (ocular)
real, magnifiedimage from objective
March 03 LASERS 51
Microscope terminology
• Tube length = 160 mm for most standard microscopes• From Newtonian imaging equation (easiest way)
– Magnification=-160mm/f– This is (approximately) the number stamped on the side of a
microscope objective• Eyepiece magnification stamped on side is 25/f
– Be careful of units, this formula is in cm– You can use this eyepiece for larger magnification also (see
previous discussion on magnifiers and angular magnification)
working distance
tube length
focal point
focal point
realimage
March 03 LASERS 51
Infinity-corrected microscopesInfinity-correctedobjective lens Eyepiecetube lens
• Light from objective is collimated• More flexibility in layout of microscope• Gives collimated beam for placing filters,
polarizers, etc.• Infinity-corrected objectives and ordinary
objectives cannot be interchanged without sacrificing image quality
March 03 LASERS 51
Illumination in microscopesInfinity-correctedobjective lens Eyepiecetube lens
condenser lens
lightsource
• Usually the object for a microscope does not emit light itself, it must be illuminated by a separate light source
• There is more than one way of doing this depending on the particular application
• The quality of the image you obtain depends critically on proper adjustment of the illumination
• For an object which is not transparent, reflected light is used, illumination comes from other side using beam splitters
March 03 LASERS 51
Telescope-introduction
• Some objects (e.g. moon, planets, distant objects on earth) cannot be brought up close for examination
• If these objects subtend too small an angle to be resolved by the eye, we need to increase their angular size in order to examine them
• A pair of lenses arranged so that the secondary focal point of one lens coincides with the primary focal length of the other can provide the needed angular magnification– This can be called a confocal system
March 03 LASERS 51
Telescope-basic principles
• Angular magnification is Θ2/Θ1=f1/f2• Axial ray from infinite object emerges parallel to axis
– called afocal system (focal points at infinity)– axial ray height ratio = f2/f1
• Telescope with two positive lenses called Newtonian (or Keplerian)– image inverted– Objective is aperture stop and therefore entrance pupil– exit pupil behind eyelens, distance to exit pupil called eye relief– field stop at eyelens
Entrance pupilat objective
ObjectiveEyelens
Axial rayfrom distant object
Chief rayField stopat eyelens
commonfocal point
f_1f_2
Θ1
Θ2
Exitpupil
March 03 LASERS 51
Field of view of a telescopeObjective
Eyelens
Chief rayField stopat eyelensf_1
f_2
HFOV Exitpupil
De
• Always make sure you know whether you are talking about full or half angle, radians or degrees
• A field lens can be used to increase fov
HFOV=half field of view
degrees)(in 180 viewof field
radians)(in HFOV
21
21
21
ffD
ffD
e
e
+×=
+=
π
March 03 LASERS 51
Terrestrial telescope
A simple terestrial telescope
Entrance pupilField stop
Objective ErectorEyelens
Axial ray
Chief ray
• The Newtonian telescope produces an inverted image– Not much of a problem for a star, but a major annoyance if looking
at ships at sea• The erector lens is just a 1:1 imaging lens
– As a result a terrestrial telescope is longer than a Newtonian telescope with the same focal lengths
March 03 LASERS 51
Binoculars• Binoculars are essentially just a pair of terrestrial
telescopes– Normally a pair of Porro prisms is used to invert the
image rather than an erector lens. This allows the two objectives to be placed farther apart
• Binoculars are usually specified by their angular magnification and the size of their objective– (6x30) means 6x angular magnification and 30 mm
diameter objectives– Exit pupil, field of view, eye relief found just as for the
telescope
March 03 LASERS 51
Gallilean telescopeEntrance pupil
at objective
ObjectiveEyelens
Axial rayfrom distant object
Chief ray
Field stopat eyelens
commonfocal point
f_1f_2
Exitpupil
• Telescope shorter for same magnification• Image is erect• Exit pupil not accessible to eye
March 03 LASERS 51
Reflecting telescope• In principle, the reflecting telescope is just like the
refracting telescope except that the objective lens is replaced by a concave mirror
• Important differences– Much larger objectives can be made
• Lighter• Easier to support• Less material constraints
– No chromatic aberration– Different shapes can be made to compensate other
aberrations fairly easily (for example a parabola)
March 03 LASERS 51
Why a 10 meter objective?
• An earthbound telescope does not provide better resolution of objects after it gets over about 30 cm in diameter– Atmospheric turbulence is the limitation– Can be overcome by adaptive optics
• Nevertheless, the larger the objective, the more light is collected (smaller f/#) allowing fainter objects to be observed
March 03 LASERS 51
Laser beam expander
• Similar to telescope– Magnification=f2/f1 (can be smaller or larger than one!)– Focal points of the lenses coincide (collimated in/collimated out)– Not only increases size, but reduces beam divergence
• Important practical points– Flatter sides of lens face towards inside to minimize aberrations
• Plano-convex often adequate, but best-form or even multielement needed sometimes
– Internal waist can be used for spatial filter, but can cause airbreakdown or other problems for high-power lasers
f1
f2Lens 1
Lens 2
March 03 LASERS 51
Galilean beam expanderLens 1
Lens 2
f1f2
• As in Newtonian form, focal points coincide• Flatter sides also towards center
– Rule of thumb, if each surface does about the same amount of bending aberrations will be minimized
• Note that there is no internal focus and for the same magnification, this telescope is shorter
March 03 LASERS 51
Image-relay systems
f1 f1 f2 f2
• Again similar to telescope, focal points coincide• Flat sides of lenses towards inside• Can be combined with beam expander/spatial filter
for laser beams with image information on them• No Galilean form (at least not with real object)
March 03 LASERS 51
Image relay in high-power laser systems• High-power laser systems use beam expanders to
increase the beam size as the beam travels from the smaller amplifiers to the larger ones
• All high-power laser amplifier chains that I am aware of use Keplerian rather than Galilean beam expanders– In most cases, a small aperture (pinhole) is placed at the focus
• Not only functions as a spatial filter, but also blocks dangerous back reflections
– Imaging from one amplifier to the next is crucial to getting high power without damaging components
• Errors in beam due to imperfections in amplifiers, or small damage spots, etc. lead to larger variations of beam intensity out of the image plane
– The Keplerian expanders require evacuated tubes, but this is a small price to pay for not blowing up expensive laser glass
March 03 LASERS 51
Some other important optical systems• Projector system• Microscope illuminators• Energy concentrators (e.g. focus light on a detector,
or a missle)• Lighting systems• Anamorphic systems (cylindrical optics)• Catadioptric systems (reflection and refraction)• Measuring systems• Adaptive optical systems• Numerous specialize applications