i. If f = 0.5 m for a glass lens, what is the power of the lens ? ii. The radii of curvature of the faces of a double convex lens are 10cm and 15cm . Its focal length is 12cm. What is the refractive index of glass ? iii. A convec lens has 20 cm focal length in air. what is focal length in water ? (Refractive index of air-water = 1.33, refractive index for air-glass = 1.5)

i. If f = 0.5 m for a glass lens, what is the power of the lens ? ii.

1.	i. If f = 0.5 m for a glass lens, what is the power of the lens ? ii. The radii of curvature of the faces of a double convex lens are 10cm and 15cm . Its focal length is 12cm. What is the refractive index of glass ? iii. A convec lens has 20 cm focal length in air. what is focal length in water ? (Refractive index of air-water = 1.33, refractive index for air-glass = 1.5)
Answer» Solution :(i) Power `= +2` dioptre. (ii) Here, we have `f = +12 cm, R1 = +10 cm, R2 = -15 cm`. REFRACTIVE index of air is TAKEN as unity. We use the lens formula of EQ. (9.22). The SIGN convention has to be applied for `f, R_(1) and R_(2)` . Substituting the values, we have `(1)/(12)=(n-1)((1)/(10)-(1)/(-15))` This gives `n=1.5`. (iii) For a glass lens in air, `n_(2)=1.5, n_(1)=1, f=+20cm`. Hence, the lens formula gives `(1)/(20)=0.5[(1)/(R_(1))-(1)/(R_(2))]` For the same glass lens in water, `n_(2)=1.5, n_(1)=1.33`. Therefore, `(1.33)/(f)=(1.5-1.33)[(1)/(R_(1))-(1)/(R_(2))]` Combining these two EQUATIONS, we find `f=+78.2cm`.

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