7.1 KiB
| title | published | visible |
|---|---|---|
| new course : overview | true | true |
The mirror
What is a mirror ?
Objective
- initial : to reflect light, to focus or disperse light.
- Ultimate : to realize images, alone or as part of optical instruments.
Physical principle
- uses the phenomenon of reflection, described by the law of reflection.
Constitution
- Usually plane or curved (spherical for the most simple to realize,
parabolic or elliptical) surface, highly polished so that its surface
state deviates from its theoretical form of less than $
\lambda/10$ at each point of its surface ($\lambda$ being the wavelength in vacuum of the light to be reflected). To increase the reflectivity of the mirror (percentage of reflected light intensity per the total of the incident light intensity), the surface is most often metallized.
Interest in optics
- One of the most importante simple optical component that is used alone or combined in a series in most optical instruments : some telephotos, reflecting telescopes.
Why to study plane and spherical mirrors?
- Plane and spherical mirrors are the most technically easy to realize, so they are the most common and cheap.
- In paraxial optics, the optical properties of a plane mirror are those of a spherical mirror whose radius of curvature tends towards infinity. Plane mirror, concave and convex spherical mirror
Fig. 1. a) plane b) concave c) convex mirrors
Are plane and spherical mirrors stigmatic?
Perfect stigmatism of the plane mirror
- A plane mirror is perfectly stigmatic.
- Object and image are symmetrical on both side of the surface of the plane mirror.
$\Longrightarrow$ A real object gives a virtual image.
nbsp; A virtual object gives a real image.
Non stigmatism of the spherical mirror
- In each point of the spherical mirror, the law of reflection applies.
- A spherical mirror is not stigmatic: The rays (or their extensions) coming from an object point generally do not converge towards an image point (see Fig. 2.)
- A spherical mirrors with a limited aperture (see the angle $
\alpha$ (rad) which is reduced on Fig. 3. and 4.) and used so that angles of incidence remain small (see Fig. 4.) become quasi-stigmatic.
Fig. 2. Non stigmatism of a convexe mirror.
Fig. 3. But when we limit the aperture of the mirror
Fig. 4 . and limit the conditions of use to small angles of incidence, then a image point can almost be defined : the mirror becomes
quasi-stigmatic.
Gauss conditions / paraxial approximation and quasi-stigmatism
-
When spherical mirrors are used under the following conditions, named Gauss conditions :
- The angles of incidence are small
(the rays are slightly inclined on the optical axis, and intercept the spherical mirror in the vicinity of its vertex),
then the spherical mirrors can be considered quasi- stigmatic, and therefore they can be used to build optical images. -
Mathematically, when an angle $
i$ is small ($i < or \approx 10 ^\circ$), the following approximations can be made :
$sin(i) \approx tan (i) \approx i$ (rad), et $cos(i) \approx 1$. -
Geometrical optics limited to Gaussian conditions is called Gaussian optical or paraxial optics.
The thin spherical mirror (paraxial optics)
- We call thin spherical mirror a spherical mirror used in the Gauss conditions.
Analytical study (in paraxial optics)
-
Spherical mirror equation = conjuction equation for a spherical mirror :
$\dfrac{1}{\overline{SA_{ima}}}+\dfrac{1}{\overline{SA_{obj}}}=\dfrac{2}{\overline{SC}}$ (equ.1) -
Transverse magnification expression :
$\overline{M_T}=-\dfrac{\overline{SA_{ima}}}{\overline{SA_{obj}}}$ (equ.2)
You know $\overline{SA_{obj}}$ , calculate $\overline{SA_{ima}}$ using (equ. 1)
then $\overline{M_T}$ with (equ.2), and deduce $\overline{A_{ima}B_{ima}}$.
! USEFUL 1 :
! The conjunction equation and the transverse magnification equation for a plane mirror
! are obtained by rewriting these two equations for a spherical mirror in the limit when
! $|\overline{SC}|\longrightarrow\infty$.
! Then we get for a plane mirror : $\overline{SA_{ima}}= - \overline{SA_{obj}}$ and $\overline{M_T}=+1$.
! USEFUL 2 :
! You can find the conjunction and the transverse magnification equations for a plane or spherical mirror as well as for a plane refracting surface directly from
! those of the spherical refracting surface, with the following assumptions :
! - to go from refracting surface to mirror : $n_{eme}=-n_{inc}$
! (to memorize : medium of incidence=medium of emergence, therefor same speed of light, but direction
! of propagation reverses after reflection on the mirror)
! - to go from spherical to plane : $|\overline{SC}|\longrightarrow\infty$.
! Then we get for a plane mirror :
! $\overline{SA_{ima}}= - \overline{SA_{obj}}$ and $\overline{M_T}=+1$
Graphical study
1 - Determining object and image focal points
Positions of object focal point F and image focal point F’ are easily obtained from the conjunction equation (equ. 1).
-
Image focal length $
\overline{OF'}$ : $\left(|\overline{OA_{obj}}|\rightarrow\infty\Rightarrow A_{ima}=F'\right)$
(equ.1) $\Longrightarrow\dfrac{1}{\overline{SF'}}=\dfrac{2}{\overline{SC}}\Longrightarrow\overline{SF'}=\dfrac{\overline{SC}}{2}$ -
Object focal length $
\overline{OF}$ : $\left(|\overline{OA_{ima}}|\rightarrow\infty\Rightarrow A_{obj}=F\right)$
(equ.2) $\Longrightarrow\dfrac{1}{\overline{SF}}=\dfrac{2}{\overline{SC}}\Longrightarrow\overline{SF}=\dfrac{\overline{SC}}{2}$
2 - Thin spherical mirror representation
-
Optical axis = revolution axis of the mirror, positively oriented in the direction of propagation of the incident light.
-
Thin spherical mirror equation :
-line segment, perpendicular to the optical axis, centered on the axis with symbolic indication of the direction of curvature of the surface at its extremities, and dark or hatched area on the non-reflective side of the mirror.
-vertex S, that indicates the position of the mirror along the optical axis;
-nodal point C = center of curvature.
-object focal point F and image focal point F’.
Examples of graphical situations, with analytical results to train
- with real objects
Fig. 5. Concave mirror with object between infinity and C
Fig. 6. Concave mirror with object between C and F/F’
Fig. 7. Concave mirror with object between F/F’ and S
Fig. 8. Convex mirror