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Physics Beyond 2000 Chapter 12 Optical Instruments Geometric Optics • In this chapter, the lenses and mirrors have dimension much longer than the wavelength of light. • Effect of diffraction can be ignored. • Light is regarded as ray. http://webphysics.davidson.edu/physletprob/ch18_v4_physlets/optics4/default.html http://www.phy.ntnu.edu.tw/demolab/index.html Reflection • Laws of reflection. http://www.netzmedien.de/software/download/java/brechung/ Plane mirror • What are the properties of the image? http://www.continental.clara.net/physics/lt31.htm Note that we cannot capture a virtual image on a screen. Locate a virtual image • Method of no parallax Use a long search pin to locate the image behind the mirror. In front of the mirror, view the image in the mirror and the search pin. search pin image plane mirror object Locate a virtual image • Method of no parallax If the search pin is at the exact position of the image, the image in the mirror and the search pin always coincide even if we change the angle of view. search pin eye image in the mirror eye Locate a real image • The method of no parallax can be applied to locate the position of real images. search pin O I real image Rotation of a plane mirror Normal 1 Normal 2 Reflected ray 1 Fixed incident ray θ Reflected ray 2 2θ Mirror 1 Mirror 2 Rotate the plane mirror from position 1 to position 2 by an angle θ. The reflected ray will turn through 2θ. Rotating a plane mirror • Light-beam galvanometer. A moving mirror position 2 position 1 image 2 fixed object 2v v If the plane mirror moves at a speed v, the image moves at speed 2v. image 1 Concave mirrors • http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/Lens/ lens_e.html Spherical aberration • If the aperture of the mirror is large, the reflected rays do not all passes through the focus. • This is called spherical aberration. Spherical aberration • It can be corrected by using a parabolic mirror. Focal length f and radius of curvature R Show that r = 2f for small angles. paraxial ray θ θ h 2θ θ C F r f Images for concave mirror http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/Lens/lens_e.html Example 1 • The rays from the sun are parallel and the image of the sun is on the focal plane. C F h f θ θ Mirror formula 1 1 1 u v f for small angles θ α O θ γ β C I F r u v h Mirror formula 1 1 1 u v f for small angles Real-is-positive convention: Nature of object/image Real Object distance u positive Image distance v positive Virtual negative negative Mirror formula 1 1 1 u v f for small angles Real-is-positive convention: Nature of mirror focal length f concave positive convex negative Linear magnification m height m height of of image v object u I O C u F v Example 2 • Justify the nature of the image from the sign of image distance v. Variation of image with object distance http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/Lens/lens_e.html Variation of magnification with object distance f m u f Convex mirror 1 1 1 u v f Nature of mirror convex for small angles focal length f negative object distance u positive image distance v negative (virtual) Convex mirror http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/Lens/lens_e.html http://www.iln.net/html_p/c/453262/453270/453373/454123/56652_2079292.asp Example 3 O I u v I F Measure the focal length of concave mirror Method A •Object at infinity. •Image is at the focal plane. •Measure the distance between the mirror and the screen. C θ θ F h f Measure the focal length of concave mirror Method B •Object at the radius of curvature. •Image is at the radius of curvature. •Use the method of no parallax to locate the image. •Adjust the position of the object so that its image is coincide with the object. •Measure the distance between the object and the mirror. http://www.usafa.af.mil/dfp/physics/webphysics/Physlet_examples/concave_mirror_f.html Measure the focal length of concave mirror Method C •Object at different positions to produce real images. •Images are captured by a screen. 1 v 1 1 1 u v f 1 f 0 1 f 1 u Measure the focal length of concave mirror Method D •Object at different positions to produce real images. •Images are captured by a screen. •Calculate the linear magnification m. m 1 m .v 1 f slope = 0 -1 v 1 f Measure the focal length fm of a convex mirror • It is not possible to capture a virtual image on a screen. • Put a converging lens of focal length flens in front of the convex mirror. • Adjust the position of the object so that a real image is at the same position as the object. O P Q s I lens flens C 2.fm mirror Measure the focal length fm of a convex mirror • Measure s, the separation between the lens and the convex lens. • 2 focal length of the convex mirror is flens – s. O P Q s I lens flens C 2.fm mirror Refraction http://www.fed.cuhk.edu.hk/sci_lab/download/project/Lightrefraction/LightRefract.html http://www.netzmedien.de/software/download/java/brechung/ sin 1 1 c1 n2 sin 2 2 c2 n1 Medium 1: 1, 1, c1 and n1 1 2 Medium 2: 2, 2, c2 and n2 Refraction Snell’s law: n1.sin1 = n2.sin2 Medium 1: 1, 1, c1 and n1 1 2 Medium 2: 2, 2, c2 and n2 Refraction If n2 > n1, then medium 2 is an optically denser medium and medium 1 is an optically less dense medium Medium 1: 1, 1, c1 and n1 1 2 Medium 2: 2, 2, c2 and n2 Total internal reflection This occurs when light travels from an optically denser medium to an optically less dense medium and the angle of incidence > critical angle c. refraction with 1 < c. critical case with 2 = c. medium 1 medium 2 1 2 3 total internal reflection with 3 > c. http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/light/flashLight.html Total internal reflection n2 The critical angle c is given by sin c n1 refraction with 1 < c. critical case with 2 = c. medium 1 of n1 medium 2 of n2 1 2 3 total internal reflection with 3 > c. http://www.continental.clara.net/physics/lt23.htm Fish-eye view • http://www.fed.cuhk.edu.hk/sci_lab/ntnujav a/fishEye/fishEye.html Example 4 • The critical angle of glass with n = 1.5 is about 42o in air. • It depends also on the medium in which the glass is immersed. Reflecting prism • Angle of incidence = 45o > Critical angle = 42o. • Total internal reflection occurs inside the glass prism. • The glass prism can be used as a reflecting mirror. 45o 45o o 45 45o Optical fibre • There is total internal reflection inside the optical fibre. • Light is guided to travel in the optical fibre. Real depth and apparent depth • The image I is displaced upwards relative to the object O. air medium with refractive index n B C apparent depth I real depth O Real depth and apparent depth real depth n apparent depth air medium with refractive index n for small angles. B C apparent depth I real depth O Real depth and apparent depth Where would be the image I if we are inside the medium? Suppose that the angles are small. O air medium with refractive index n B C Measure the refractive index of glass Find the real depth and apparent depth from h1 and h2. eye travelling microscope h2 h1 h h h glass block I O1 O1 O2 real depth = h2 apparent depth = h2 – h2 Rectangular glass block The incident ray and the emergent ray are parallel. w. sin( i r ) The lateral displacement is d cos r incident ray w i r r i d emergent ray Prism Find the angle of deviation D in terms of angles of incidence (1and 2) and angles of refraction (1 and 2). D = (1 - 1)+(2 - 2) A 1 1 2 D 2 Prism Find the refracting angle A of the prism in terms of the angles of incidence and angles of refraction. A = 1+ 2 A 1 1 2 D 2 Prism The angle of deviation is a minimum Dmin when the light ray is symmetrical. Find the refractive index n of the glass prism. n A 1 1 2 D 2 sin 1 ( A Dmin ) 2 A sin 2 Small-angled prism • For a prism with small refracting angle A. • The angle of deviation D = (n - 1).A • The angle of deviation is independent of the angle of incidence. A D Convex lenses The focal lengths on both sides are equal. F f F f F’ F’ Aberration of lens • Spherical aberration. • Parallel incident rays far from the centre do not meet at the same focus as paraxial rays. http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/thickLens/thickLens.html Aberration of lens • Chromatic aberration. • Violent light bends more than red light in glass. fviolet < fred white parallel light Location of image for convex lens http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/Lens/lens_e.html Ray diagrams. Lens formula 1 1 1 u v f for thin lens. Real-is-positive convention: Nature of object/image Real Object distance u positive Image distance v positive Virtual negative negative Lens formula 1 1 1 u v f for thin lens. Real-is-positive convention: Nature of lens focal length f convex positive concave negative Lens formula: proof BP The angle of deviation D = (n – 1).A f where A is the refracting angle Note that for small angle prism (thin lens), D is independent of the angle of incidence. B D P f F Lens formula: proof Suppose that there is a real image. Prove that 1 1 1 u v f B O u F’ for thin lens. D P f F I v Interchange of locations of object and real image I O u v v u 1 1 1 u v f I O Object-image distance for real image • To produce a real image, the object-image distance d must be longer than or equal to 2.f. • Prove it. I O d Thin lenses in contact • Let f1 be the focal length of the first thin lens and f2 be the focal length of the second thin lens . • When they are in contact, the combined focal length f is given by 1 1 1 f f1 f 2 http://www.fed.cuhk.edu.hk/sci_lab/ntnujava/thinLens/thinLens.html Example 5 • The image formed by the first lens is the object of the second lens. The converging power of a lens • Definition of converging power 1 P= f Unit: dipotre (D) • For two thin lenses in contact, the combined power is D1 + D2. Concave lens • For a real object, virtual image is always formed. v is negative. • Focal length is negative. Example 6 I1 is the virtual object of the concave lens. u is negative The concave lens produces a real image I2. v is positive. u I1 v convex lens concave lens I2 Measure the focal length of convex lens • Method A. Object at infinity Image is at the focal plane. focal plane parallel rays from distant object f I Measure the focal length of convex lens Method B. Place the convex lens on a plane mirror. Adjust the position of the object so that it coincides with the image. This is method no parallax. eye object O image convex lens plane mirror Measure the focal length of convex lens Method B. The distance between the object/image and the lens = f. I O f Measure the focal length of convex lens • Method C. • Produce different real images. • Measure the object distance u and the real image distance v. 1 v 1 f 1 f 1 u Measure the focal length of convex lens • Method D. Without changing the positions of the object and the image, find the two possible positions of the lens. Measure a and d.and find f from 1 4d f object 1st position of lens d 2 a2 2nd position of lens O d a Screen position of image Measure the focal length of concave lens • Use another convex lens to help producing a virtual object for the concave lens. • Use the lens formula to calculate the focal length of the concave lens. u v O I1 I2 Optical instruments • Human eye: a convex lens with variable focal length. • Far point of a normal eye = infinity. • Near point of a normal eye = 25 cm. • Least distance of distinct vision = 25 cm. Short-sightedness • A short-sighted eye can focus objects in the range from 25 cm to 200 cm. • The far point of the short-sighted eye is 200 cm • Find the focal length of the spectacle to correct the defect. • Wearing a pair of spectacles, what is the new near point? Long-sightedness • A long-sighted eye can focus objects in the range from 200 cm to infinity. • The near point of the long-sighted eye is 200 cm • Find the focal length of the spectacle to correct the defect. • Wearing a pair of spectacles, what is the new far point? Visual angle • Visual angle of an object is the angle subtended by the object at the eye. • The bigger the visual angle, the bigger the apparent size of the object. • Most optical instruments are designed to magnify the visual angle. object eye Angular magnification M It is used to measure the magnification of an optical instrument, M • is the visual angle of the final image • is the visual angle of the object Note that the visual angles are usually small so tan sin and tan sin . Normal adjustment • An optical instrument is in normal adjustment when it forms the final image at a position which the user expects to see. • Telescope: final image at infinity (far point). • Magnifying glass: final image at 25 cm (near point). • Microscope: final image at 25 cm (near point). Magnifying glass • A magnifying glass is a convex lens. • It produces an enlarged virtual image. Magnifying glass • Without the magnifying glass, the largest visual angle of the object is with the object at the least distance of distinct vision D = 25 cm. h object h tan D eye D visual angle without optical instrument Magnifying glass • With the magnifying glass in normal adjustment, the final image is also at D. image h object u v=D h tan u eye visual angle with the optical instrument Magnifying glass Apply lens formula, With the visual angles, 1 1 1 u D f h D h u D M 1 f (1) (2) (3) the angular magnification of a magnifying glass Compound microscope • It is used to view small objects. • It consists of two convex lenses. • The objective lens and the eye-piece. Both are of short focal lengths. eye object objective lens eye-piece History of compound microscope: http://www.utmem.edu/~thjones/hist/hist_mic.htm Compound microscope • The objective lens produces a magnified real image. The object is placed near the focus of the objective lens. • This image is the object of the eye-piece. 1st image eye object objective lens eye-piece Compound microscope • The eye-piece is a magnifying glass. • It produces a magnified virtual image at D = 25 cm from the eye-piece. 1st image eye object final image objective lens eye-piece D Note that the final image is an inverted image. Compound microscope h D object D h h object eye 1st image h final h2 objective lens image D eye 1 eye-piece h2 D Compound microscope The angular magnification M of a compound microscope is h2 h2 h1 M . me .mo h h1 h where me is the linear magnification of the eye-piece and mo is the linear magnification of the objective M can be increased by using lenses of short focal lengths. Example 7 • The angular magnification = 5.5 Refracting telescope • It is used to view distant objects e.g. stars. • Two convex lenses. • The objective lens: Pointing to the object, with very long focal length. • The eyepiece: A magnifying glass. Its focal length is short eye Objective lens Eyepiece Refracting telescope • The object is at infinity. The incident rays are parallel • The objective lens produces a real image I1 on its focal plane. fo I1 Objective lens real image eye Eyepiece Refracting telescope • The first image I1 is the object of the eyepiece. • The eyepiece produces a virtual image at infinity. This is the normal adjustment. fe fo I1 Objective lens Image at infinity real image eye Eyepiece Refracting telescope In normal adjustment, the angular magnification is f0 M fe Refracting telescope • The length of the refractive telescope is fo + fe • The image is inverted. fe fo I1 Objective lens Image at infinity real image eye Eyepiece Refracting telescope • The aperture of the objective lens is large – to collect more light. – to reduce the diffraction effect. Example 8 • Note the focal lengths of the lenses. Eye ring • Eye ring is the position of the eye, at which most light enters the eye when using an optical instrument. • The image is brightest when the eye is at the eye ring. Eye ring All the light collected by the objective lens passes through the position of the eye ring. All the light enters your eye if you place your eye at the eye ring. Locating the eye ring • As the light comes from the objective lens, you may take the objective lens as the object. • The position of the eye ring is the position of the image. • Find the position of the eye ring from lens formula. 1 1 1 f u v where u is the distance from the objective lens to the eyepiece, f is the focal length of the eyepiece and v is the distance from the eye ring to the eyepiece. Locating the eye ring The position of the eye ring is L. f e d L fe Reflecting telescope • It is similar to a refracting telescope. • Light is collected by a concave mirror. plane mirror F objective (concave mirror) F’ eye piece eye Reflecting telescope fo • The angular magnification is M fe plane mirror F objective (concave mirror) F’ eye piece eye Reflecting telescope • Advantages of using a reflecting telescope: The mirror reduces less light intensity than a lens. There is not any problem of chromatic aberration and spherical aberration. It is easier to produce a large mirror than a large lens. Example 9 • Locating the eye ring. Spectrometer • It is used for spectral analysis with the aids of a diffraction grating or a glass prism. • It consists of three parts: collimator, diffraction grating/glass prism and a telescope. Spectrometer • Collimator: Place the source S near the slit. The collimator produces a parallel beam of light. collimator S Spectrometer • Diffraction grating: Use a diffraction grating to produce a spectrum of fringes. • The diffraction grating is on a turntable to measure the angles of bright fringes. m=2 diffraction grating m=1 collimator S m=0 turntable m=1 m=2 Spectrometer • Diffraction grating: Use a diffraction grating to produce a spectrum of fringes. • The diffraction grating is on a turntable to measure the angles of diffraction. m=2 diffraction grating m=1 collimator S m=0 turntable m=1 m=2 Spectrometer • Telescope: It can be rotated to any angle to view the diffraction spectrum. eye telescope diffraction grating m=1 collimator S m=0 turntable m=1 m=2 Spectrometer Telescope: the image is formed at the position of cross-wire. objective lens eye piece light from diffraction grating eye cross-wire Spectrometer • It is necessary to make a horizontal turntable. Adjust the levelling screws and use a spirit level to check the turntable. spirit level turntable levelling screw