The refractive index is a ratio of the speed of light in a medium relative to its speed in a vacuum. This change in speed from one medium to another is what causes light rays to bend. This is because as light travels through another medium other than a vacuum, the atoms of that medium constantly absorb and reemit the particles of light, slowing down the speed light travels at. The refractive index ( ) can be calculated using the equation below. Show However, it is also important to note that light changes direction when it travels from one medium to another. Therefore, another method to calculate the refractive index of a medium is to apply Snell’s law, which will be very important later in our discussion of refractometers. The refractive index of any other medium is defined relative to the refractive index of a vacuum, which is assigned a value of 1. Thus, a refractive index of 1.33 for water means that light travels 1.33 times faster in a vacuum than in water. Figure 1: The refraction of light. In this diagram, light travels faster in medium A than it does in medium B. Refractive indices can be measured for different types of mediums including transparent or coloured solutions, turbid suspensions, emulsions, fine powders, ect. Factors that affect the refractive index: The two factors which affect the value of the refractive index are:
Note: These two factors are present in the equation above, How is a refractive index measured?A refractometer is used to measure the refractive index of a medium. There are many different types of refractometers, including the Abbe refractometer, which will be discussed in further detail below. A refractometer works based on the principle that light bends when it enters a different medium. This instrument measures the angle of refraction of light rays passing through the unknown sample. This measurement combined with the knowledge of the refractive index of the medium directly in contact with the unknown sample, are used to determine the refractive index of the unknown sample by applying Snell’s law described above. The following cross sectional diagram illustrates the inner-workings of a refractometer. A light source shines on the illuminating prism and light rays enter the sample moving in different directions. The largest angle of incidence produced by a light ray (θi) produces the largest possible angle of refraction (θB). The other light rays entering the refracting prism all have a smaller refraction angle and lie to the left of point C. A detector at the back of the refracting prism produces the light and dark regions. In an Abbe refractometer, a detector is not present and there is more optics but the general scheme remains the same. Samples with different refractive indexes produce different angles of refraction which will cause a shift in the borderline between the light and dark regions. The borderline’s position is then used to establish the refractive index of different samples. Figure 2: A cross-sectional diagram of part of the optical path of an Abbe refractometer. The sample thickness has been exaggerated for clarity. Refractive Index Lab Procedures
N.B. Temperature Correction
Video: This video illustrates step by step the usage of an Abbe 3L (Bausch and Lomb) refractometer. Troubleshooting FAQs: This is a good webpage for the most common problems when setting up your refractometer. Why do we need to determine refractive indices?Refractive indices have many purposes and are used most frequently to differentiate between liquid samples. Therefore, this physical quantity characterizes liquids in the same way that melting points are used to characterize solids. This measurement can serve as a means of identification of a substance by comparing its refractive index to known literature values. Furthermore, refractive indices can be used to as an estimate of the purity of a compound by comparing the substance’s refractive index to that of the pure compound. In addition, refractive indices are also used to determine the concentration of a solute in a solution by comparing the solution’s refractive index to a standard curve. Finally, refractive indices are influenced by the polarizability of a medium. The more polarizable the material, the higher the refractive index is for the substance. Thus, knowledge of the refractive index of a substance is also necessary to calculate dipole moments of that substance. The molar refractions, R, can be calculated and are characteristic of that substance and indicative of its structure. |