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Janaky Narayanan PC 5213 AY 2004-05/Semester 2
II.3 CIRCULAR DICHROISM
Light is an electromagnetic wave which oscillates periodically in both time and space. In the wave, the electric and magnetic vectors, which are proportional to each other in magnitude, are mutually perpendicular and also perpendicular to the direction of propagation. Non-polarized light consists of vibrations in many different polarization directions. In other words, the plane containing the oscillating electric vector and the propagation direction keeps changing with time. In linearly polarized light the sinusoidal oscillations of the electric vector are confined to one plane. In circularly polarized light, the magnitude of the electric vector remains constant, but it traces out a helix as a function of time. It is useful to apply the principle of superposition to analyze the state of polarization of a light beam. Circularly polarized light can be represented as the sum of two orthogonal linearly polarized light in which the amplitudes are equal and the phases are shifted by ± π/2.
Superposition of two Simple Harmonic Motions (SHM) at right angles to each other
Let the vibrations be given by
x = a sin t (1)
y = b sin (t +) (2)
where a and b are the amplitudes of the two SHM of same frequency, , executed in perpendicular directions and is their phase difference.
Now, y/b = sin (t + ) = sin t cos + cost sin.(3)
From (1) = sint and ( cos2 + sin2 = 1)
Substituting in (3),
or
Squaring,
Rearranging the terms,
sin2 =
i.e., (4) General equation for an ellipse.
Special cases:
If = 0;
or
or Equation of a straight line through originwith + slope
If = ; Equation of a straight line through originwith – slope.
If = /2 or 3/2; Equation to a standard ellipse.
If = /2 or 3/2 and a = b; y2 + x2 = a2 Equation to a circle.
Thus two perpendicular vibrations of equal amplitude and phase difference /2 or 3/2 on superposition will form circular vibration.
If = /2, and a = b, equations (1) and (2) can be written as
x = a sint and
y = a sin(t + /2), or, y = a cost,
Resultant is circular vibration in clock-wise direction (right circular).
Similarly if = 3/2, and a = b,
x = a sint, and
y = a sin(t + 3/2) or y = -a cost,
Resultant is circular vibration in counter clock-wise direction (left circular).
Adding right and left circular vibrations of equal amplitudes, the resultant is
Y = (a sint + a cost) + (a sint –a cost) = 2a sint linear vibration
Sum of two circular vibrations of equal amplitudes one clockwise and the other counterclockwise will give linear vibration.
Stereochemistry and Chirality
The three dimensional spatial arrangement of the atoms of a molecule is termed its stereochemistry. A molecule may be identified first by its chemical formula, then by its chemical structure, and finally by its molecular structure. For example, C2H6O is the chemical formula of ethyl alcohol. CH3-CH2-OH is the chemical structure of ethyl alcohol. The molecular structure is determined by the three dimensional arrangement of the atoms in space. The word “conformation” describes the different arrangements of atoms that are obtained when parts of the molecule are rotated about one of the bonds. A change in the conformation necessarily does not involve any breaking of covalent bonds. Groups that are connected by a single bond can undergo rotation leading to different relative orientations with respect to each other. For example, in ethyl alcohol, depending on the angle of rotation about the C-C bond, the relative orientations of hydrogen atoms and the hydroxyl group will vary.
In some molecules the differences in the arrangement of the atoms may not affect many of the physical properties of the molecules such as melting point, density, refractive index, etc., but may affect the interaction of the molecules with polarized light. Such molecules are said to be optically active and are called optical isomers. Optically active molecules rotate the plane of polarization of the plane polarized light incident on them in different directions. Levorotatory molecules rotate the plane towards left and dextrorotatory molecules rotate the plane towards right. Levorotation is designated as (-) and dextrorotation is denoted by (+). These optically active molecules may differ in their biological behavior. For example, only one of the optical isomers of aspargine is sweet to taste. Louis Pasteur showed that the difference in action between two optical isomers is due to the difference in molecular architecture, i.e. due to the differences in the arrangement of the atoms in space. The two alanine molecules shown in figure have the same number of atoms but differ in the stereochemistry and hence are known as stereoisomers.
D-alanine L-alanine
A molecule or other object that is different from its own mirror image, i.e., non-superimposable on its mirror image is chiral(eg. a pair of shoes, hands). Molecules that are identical to their mirror image are achiral. A chiral molecule and its mirror image molecules are enantiomers. Thus pairs of isomers which are non-superimposable images of each other are called enantiomers. Most chiral molecules contain one or more chiral centers. A chiral center is an atom in tetrahedral hybridization with four all–different groups bonded to it. Thus compounds with four substitutions at a carbon atom (Cabcd) will exhibit optical activity. Such a carbon atom is generally is known as an asymmetric carbon and a molecule containing such an atom is a chiral molecule (eg. -carbon atom in alanine). A mixture of two isomers, which have optical activity opposite to each other, is on the whole optically inactive since the effect of one is annulled by the other. Such a mixture is known as a racemic mixture. A combination of equal amounts of enantiomers is a racemic mixture. A pair of enantiomers may display distinct toxicity to humans with one enantiomer being toxic and the other non-toxic. Eg, thalidomide – one of the enantiomers of this drug was responsible for the deformity of the limbs in babies born in 1950’s. Stereoisomers not related to each other as enantiomers are called diastereoisomers. Diastereoisomerism will occur in molecules with more than one chiral center. Other than carbon, atoms like silicon with a valency of four can also act as chiral centers. Living systems almost exclusively synthesize one of the possible two enantiomorphous forms (either the D or L compound). Proteins for example, contain only L-amino acids. Most monosaccharides are D-enantiomers;D-2-deoxyribose and D-ribose form part of the nucleotides used in the synthesis of DNA and RNA respectively. All the major biological molecules, like amino acids, proteins, DNA, sugars and lipids, are optically active. Optical activity and life seem to be inseparable.
Optical Activity
Nearly all molecules synthesized by living organisms are optically active, i.e., they rotate the plane of polarized light. Optical activity arises from chirality of the molecules. Most of the biomolecules are chiral due to the presence of asymmetric carbon atoms or because the supramolecular structure such as a helix winds in either right or left handed fashion. This property is used to explore the amount of coil, helix and -sheet in a macromolecule.
For any compound, the extent of optical rotation depends on the number of molecules in the path of the polarized light, i.e., on the solution concentration and on the path length of the beam through it. It also depends on the wavelength of the radiation and the temperature. Optical activity is quantified by the specific rotation, , given by
where is the angle of rotation of the plane of polarization, l is the path length (in decimeter) and c is the concentration (in g/cm3). The optical rotation, , as a function of wavelength is called the Optical Rotatory Dispersion (ORD).
Light passing through a chromophore solution may interact with the sample in two main ways. The light may be refracted on passage through the solution or it may be absorbed. Refraction is quantitated by the refractive index, n, of the solution while absorption is quantitated by the molar extinction coefficient, . If the light is plane polarized and the sample is optically active, each enantiomer may interact differently with the left and right circularly polarized components of the light beam.Opticalrotation arises from the fact that there is a specific refractive index for left (nL) and right (nR) circularly polarized light and nL nR. This is called circular birefringence.The difference in refractive index at any wavelength may be expressed as n. An ORD spectrum is a plot of n or against wavelength ().Similarly, optically active samples have distinct molar extinction coefficients for left (L) and right (L) circularly polarized light. L R.The difference in absorbance of the two components, is a measure of Circular Dichroism (CD). i.e.,
CD = AL – AR
The difference between L and R may be expressed as . From Beer-Lambert Law the difference in the absorbance of left and right circularly polarized light A, can be given by, A =cl. If or Aorellipticity(see below) is plotted against wavelength (), a CD spectrum may be obtained. The CD spectrum of one enantiomer is a mirror image of that of the other and is related to the corresponding ORD spectrum (and vice versa) by a mathematical transformation called the general Kronig-Kramers transformation. Both ORD and CD spectra are evidence for optical activity in the sample and both reflect structure of molecules in the sample, especially of chiral biopolymers such as proteins and nucleic acids. In practice, ORD has now largely been superseded by CD spectroscopy.
Thus there are at least four ways in which an optically active sample can alter the properties of transmitted light: Optical Rotation, Ellipticity, Circular Dichroism, and Circular Birefringence. They are inter-related as explained in detail below.
Consider plane polarized light. An observer looking along the direction of propagation (z-axis, perpendicular to the plane of paper) will see the electric vector oscillate sinusoidally in the xy plane, say along x direction. Let where is a unit vector in the x direction and = 2 is the circular frequency of the light. After passing through an optically active absorbing sample, the maximal amplitude of the electric vector is no longer confined to a plane, but traces out an ellipse. The ellipticity of the light is a measure of optical activity. Ellipticity is defined as the arc tangent of the ratio of the minor axis to the major axis of the ellipse. i.e., = tan-1(b/a), where a and b are the semi-major and semi-minor axes of the ellipse. For example, an ellipse with a minor/major axial ratio of 1/100 will have an ellipticity of 0.57 degree. The major axis of the ellipse is not parallel to the direction of polarization of the incident light. If the absorption of the light is negligibly small, then the minor axis of the ellipse will be very small compared to the major axis. The emerging light will be equivalent to plane-polarized light. In this case, we simply say that the plane of polarization is rotated through an angle (). The orientation of the ellipse corresponds to optical rotation. The optical rotation of a sample can be measured at any wavelength, i.e., also outside the absorption bands. This is the main advantage of ORD over CD.
A plane polarized light can be considered as equivalent to two equal-amplitude components of opposite circular polarization:
where is a unit vector in the y direction. If these two components are added at each time point, the result is simply plane-polarized light, polarized in the y-direction.
In an optically active medium the absorbance of left circularly polarized light (AL) is different from the absorbance of right circularly polarized (AR). After passing through the sample, each component is still circularly polarized, but the radii of the circles traced out by the electric vector of each (i.e., the amplitudes of the electric vectors) are now different.
When these two opposite circularly polarized light waves are combined, the result will be elliptically polarized light because the two components have different amplitudes. The ellipticity, , is proportional to the difference in absorbance of the two components, AL – AR.Thus, CD is equivalent to ellipticity.
In an optically active material,the electric vectors androtate at different speeds. This results in a net rotation in the direction of polarization of the emergent beams. Since the two circularly polarized components propagate with different speeds, the index of refraction (n) for the two components will be different.This effect is called circular birefringence (CB). The result is a phase shift between the two components, , proportional to the refractive index difference, nL–nR. Actually, = (2/)l(nL–nR). When the two components are combined, the phase shift results in a permanent rotation of the long axis (major axis) of the elliptically polarized light. In fact, = /2 = (/)l(nL–nR). Thus circular birefringence is equivalent to optical rotation.Since the refractiveindex is always dependent on the wavelength, the angle of rotation is also wavelength dependent.
The relationships between CD and ellipticity () and between the circular birefringence and the optical rotation () are given by
= 180l(nL – nR) / and = 2.303(AL – AR)180/4 = 33.0 (AL – AR) = 33.0 A
where l is the sample length and and are measured in degree.
The circular birefringence, i.e., (nL – nR ) usually is a very small number, so it is far more convenient to measure directly. For typical protein or nuclei acid solutions at 10-4M chromophore concentrations, the plane of polarized light will be rotated by 0.01 to 0.1 degree for a 1 cm sample. Current instruments can detect rotations as small as 10-4 degree.CD, i.e., (AL – AR) can be measured easily by exposing a sample alternately to left-hand and right-hand circularly polarized light and detecting just the differential absorption. This difference typically is about 0.03% to 3% of the total absorption. This difference can be determined quite accurately with modern instrumentation. The ellipticity, , is very small (~ 10-4 deg) and would be difficult to measure directly. However, it can be calculated from CD.
For comparison of results from different samples it is necessary to consider molarity.
Molar rotation
Molar ellipticity
Here M designates the molecular weight; c is in g/cm3 and l in decimeter.
[] and [] are related to each other by a set of integrals called the Kronig-Kramers transforms.
and
The ORD and CD of a sample depend strongly on the wavelength of light used to perform the measurement. For absorbing samples, one typically determines the ORD or CD over the same wavelength range used to record an absorption spectrum. The resulting optical activity spectra are called ORD and CD spectra. If the sample contains only strongly allowed electronic transitions (such as *), the shape of the CD spectrum (often called a Cotton effect) is related to the absorption spectrum in a very simple way. Outside the regions of absorption, [] = 0. This is reasonable because [] (AL – AR), and both AL and AR are zero. In absorbing regions, [] has the same shape as the absorption spectrum. However, it can have a positive or a negative sign. Both the sign and the integrated intensity of each CD band are sensitive functions of molecular structure. In the ORD spectra there is a point of zero optical rotation (the crossover point) that is coincident with each CD maximum or minimum. The limiting form ( ≠ 0), called a Drude equation, is[(()] = A0/(2 -),where A0 is a constant related to the intensity of the corresponding CD spectrum, and 0 is the crossover wavelength. However, the ORD spectra die off quite slowly at wavelengths outside the absorption band. The form of the Drude equation shows why molecules such as sucrose can demonstrate substantial optical rotation with visible light, even though they cannot absorb this light.
Absorption spectrum
CD (solid line) and ORD
(dashed line) for a positive
Cotton effect
CD (solid line) and ORD
(dashed line) for a negative
Cotton effect
Equipment Used in CD
CD spectra are measured in a special type of spectrophotometer called a CD spectropolarimeter.
CD spectropolarimeter
Since CD depends on differential absorbance, a means of selectively exposing sample to left and right circularly polarized light is necessary. This is achieved by passing a beam of plane polarized light through a photoelastic modulator which is normally quartz piezoelectric crystal subjected to an oscillating electric field. The effect of this is to vary the circular polarization of the beam passing through the modulator alternately from left to right with a frequency of some 50 kHz while maintaining a constant light intensity.
Differential absorption of left and right circularly polarized light is detected at a photomultiplier and converted into ellipticity, which has units of millidegrees. In a CD spectropolarimeter, the two light beams are not in fact recombined but a photomultiplier detector converts incident light intensity into an electric current composed partly of alternating current (AC) and partly of direct current (DC) components. The DC component is related to total light absorption by the sample while the AC component is a direct measure of CD. This arrangement facilitates separate absorption measurements of the right and left circularly polarized components of plane polarized light. Samples which are achiral or composed of racemic mixtures would give no detectable spectrum in this system. (i.e. A = AL – AR = 0 for all values).
Applications of CD
The CD spectrum of a polymer is different from that of a monomer, the difference reflecting the three dimensional arrangement. CD therefore is immensely useful to study three-dimensional structures of biopolymers such as proteins and nucleic acids.
The synthetic homopolymer poly-L-lysine adopts a random coil structure at neutral and acid pH values. However, at high pH values, a mainly -helical conformation is adopted which may be converted to predominantly antiparallel-sheet by gentle heating. Each of these three forms of poly-L-lysine gives a characteristic CD spectrum in the range 190 -250 nm as shown in figure. The fact that similar spectra are obtained for homopolymers of other amino acids suggest that they arise predominantly from asymmetry of the polypeptide backbone. CD spectra of proteins and peptides of unknown secondary structure are often compared with homopolypeptides to estimate empirically the percentage of common secondary structural features. Since the effect of side chains is ignored, these estimates are not as accurate as direct structural determination using X-ray diffraction or NMR. However, CD technique requires very low sample concentration and is a fast method for comparison as well asfollowing the changes in secondary structure conformation.