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There is a hole in the middle of a small thin circular converging lens of focal length f=4 cm. The diameter of the hole is half the aperture diameter of lens. There is a point like light source A=9 cm from a wall. Where should the lens be placed from object (in cm) in order to het a single. circular illuminated spot on the wall which also has a sharp edge? |
Answer»  The distance between the lens and the image of the light-source is `i=(Of)/(O-f)` From the dimilar traingles : `(h)/(r)=(A)/(O)` and `(h)/(R)=(h)/(2r)=(O+i-A)/(i)=(O+(Of)/(O-f)-A)/((Of)/(O-f))` from the first equation `(h)/(r)` can be substituted and the followingquadratic equation can be gained for O: `2O^(2)-2AO+af=0` Its solution are: `O =(A)/(2)pm (1)/(2) sqrt(A(A-2f))` ltb rgt In our case the following two solution are gained for the possible of the light-gained: `O_(1)=6cm` and `O_(2)=3cm`. In the first case, the lens must be PLACED `6cm` from the light source. The second solution is also a CORRECT solution, though in this case the image is virtual `("A trivial solution is the" O=0)` The problem can only be solved if A gt 2f. |
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