Calculate the dioptric value of a CR-39 lens with a radius of curvature of 0.645m.

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Multiple Choice

Calculate the dioptric value of a CR-39 lens with a radius of curvature of 0.645m.

To find the dioptric value of a lens, the formula used is:

[ D = \frac{1}{f} ]

where ( D ) is the power of the lens in diopters and ( f ) is the focal length in meters. The focal length can be calculated from the radius of curvature (R) using the lens maker's formula for a thin lens, which for a lens made from a material with a refractive index ( n ) is given as:

[ f = \frac{R}{n - 1} ]

For CR-39 lenses, a commonly used refractive index is approximately 1.5. So, substituting ( n ) and the radius of curvature into the formula, we proceed as follows:

Using ( R = 0.645 ) m and ( n = 1.5 ):

[ f = \frac{0.645 , m}{1.5 - 1} = \frac{0.645 , m}{0.5} = 1.29 , m ]

Now, we can calculate the power ( D ):

[ D = \frac{1}{f} = \frac{1}{1

Calculate the dioptric value of a CR-39 lens with a radius of curvature of 0.645m.

Work towards success in the ABO Advance Test. Utilize interactive flashcards and challenging quizzes with comprehensive hints and insights. Begin your journey to mastering the exam!

Calculate the dioptric value of a CR-39 lens with a radius of curvature of 0.645m.

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