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Determine the 'effective focal length' of the combination of two lenses of focal lengths 30 cm and -20 cm if they are placed 8.0 cm apart with their principal axes coincident. Does the answer depend on which side a beam of parallel light is incident ? Is the notion of effective focal length of this system useful at all ? (b) An object 1.5 cm in size is placed on the side of the convex lens in the above arrangement. The distance between the object and convex lens is 40 cm. Determine the magnification produced by the two lens system and size of image. |
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Answer» SOLUTION :(a) Here, `f_1 = 30 cm, f_2 = -20 cm,d= 8.0, f = ?` Let a parallel beam be incident on the convex lens first. If `2 nd` lens were ABSENT, then `:. mu_1 = oo and f_1 = 30 cm` As `(1)/(v_1)-(1)/(u_1)=(1)/(f_1)` :. `(1)/(v_1)-(1)/(oo)=(1)/(30)` or `v_1 = 30 cm` This image would now act as a VIRTUAL object for `2 nd ` lens. `:. u_2 = + (30 - 8)=+22 cm, v_2 = ? f_2 = -20 cm` As `(1)/(v_2)=(1)/(f_2)+(1)/(u_2)` :. `(1)/(v_2)=(1)/(-20)+(1)/(22)= (-11 + 10)/(220) = (-1)/(220)` `v_2 = -220 cm` `:.` Parallel incident beam would appear tom diverge from a point `220 - 4 = 216 cm` from the centre of the two lens system. (ii) Suppose a paralleol beam of light from the left is incident first on the concave lens. `:. u_1 = -oo, f_1 = -20 cm, v_1 = ?` As `(1)/(v_1)-(1)/(u_1)=(1)/(f_1) :. (1)/(v_1)=(1)/(f_1)+(1)/(u_1)=(1)/(-20)+(1)/(-oo)=(-1)/(20)` `v_1 = -20 cm` This image acts as a REAL object for the `2 nd` lens `u_2 = -(20 - 8) = -28 cm, f_2 = 30 cm, v_2 = ?` As `(1)/(v_2)-(1)/(u_2)=(1)/(f_2) :. (1)/(v_2)=(1)/(f_2)+(1)/(u_2)=(1)/(30)-(1)/(28)=(14 - 15)/(420)` `v_2 = -420 cm` `:.` The parallel beam appears to diverge from a point `420 - 4 = 416 cm`, on the left of the centre of the two lens system. From the above discussion, we observe that the answer depends on which side of the lens system the parallel beam is incident. Therefore, the notion of effective focal length does not seem to be useful here. (b) Here, `h_1 = 1.5 cm, u_1 = -40 cm, m = ?, h_2 = ?` For the `1st` lens, `(1)/(v_1)-(1)/(u_1)=(1)/(f_1)` `(1)/(v_1)=(1)/(f_1)+(1)/(u_1)=(1)/(30)-(1)/(40)=(4 - 3)/(120) = (1)/(120)` Magnitude of magnification produced by first lens, `m_1 = (v_1)/(u_1) = (120)/(40) = 3` The image formed by `1st` lens acts as virtual object for the `2nd` lens `:. u_2 = 120 - 8 = 112 cm, f_2 = -20 cm, v_2 = ?` As `(1)/(v_2)-(1)/(u_2)=(1)/(f_2) :. (1)/(v_2)=(1)/(f_2)+(1)/(u_2)=(1)/(-20)+(1)/(112)=(-112 + 20)/(112 xx 20) = (-92)/(112 xx 20)` `v_2 = (-112 xx 20)/(92)` Magnitide of magnification produced by second lens `m_2 = (v_2)/(u_2)=(112 xx 20)/(92 xx 112) = (20)/(92)` Net magnification produced by the combination `m = m_1 xx m_2 = 3 xx (20)/(92) = (60)/(92) = 0.652` `:.` Size of image, `h_1 = mh_1 = 0.652 xx 1.5 = 0.98 cm`. |
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