American Board of Opticianry (ABO) Practice Test

Disable ads (and more) with a membership for a one time $2.99 payment

Prepare for the ABO certification with our comprehensive test preparation resources. Engage with interactive quizzes and detailed questions created specifically for the ABO exam. Enhance your understanding of opticianry concepts and ace your certification test!

Practice this question and more.

A lens with a front curve of +6.50 requires what back curve to yield a corrective power of -1.00?

-7.50
-6.50
-2.00
-1.00

The correct answer is: -7.50

To determine the back curve of a lens required to achieve a specific power when given a front curve, one must apply the lensmaker's equation, which relates the front curvature, back curvature, and overall lens power. The power of a lens (P) is calculated by the formula: P = F1 + F2 Where F1 is the front surface power and F2 is the back surface power. The power of a lens is measured in diopters, and curvature is expressed as the reciprocal of the focal length in meters. In this scenario, the front curve has a power of +6.50 diopters. Since we need the total power of the lens to be -1.00 diopters, we can rearrange the lensmaker's equation: F2 = P - F1 Substituting the known values, we have: F2 = -1.00 - (+6.50) F2 = -1.00 - 6.50 F2 = -7.50 This calculation shows that to achieve an overall corrective power of -1.00 diopters with a front curvature of +6.50, the back curvature must indeed be -7.50 diopters. This relationship is critical