XRD - Case School of Engineering - Case Western Reserve University
Transcription
XRD - Case School of Engineering - Case Western Reserve University
X-ray Diffraction and EBSD Jonathan Cowen Swagelok Center for the Surface Analysis of Materials Case School of Engineering Case Western Reserve University October 27, 2014 Outline • X-ray Diffraction (XRD) • History and background • Introduction to XRD • Practical applications • Electron Back-Scattered Diffraction (EBSD) • Introduction to EBSD • Types of information that can be drawn from EBSD Discovery of X-rays and Modern XRD • Wilhelm Conrad Röntgen – 1895: Discovery of X-ray – 1901: awarded first Nobel prize winner for Physics • M.T.F. von Laue: – 1912: Discovery of the diffraction of X-rays by single crystals , in cooperation with Friedrich and Knipping – Terms: Laue equation, Laue reflections – 1914: Nobel prize for Physics • W.H. and W.L. Bragg: – 1914: X-ray diffraction and Crystal Structure – Terms: Bragg‘s equation, Bragg reflections – 1915: Nobel prize for Physics X-ray Generation X-rays Cathode e- Anode Intensity Kα=1.54Å Kβ=1.39Å Wavelength (Å) The emission spectra for Cu Intensity Mass Absorption Coefficient 1.2 Monochromatic Radiation is needed for Crystal Structure Analysis Kα Kα Kβ Filters for Suppression of Kβ Radiation Kβ 1.4 1.6 λ(Å) Unfiltered 1.8 1.2 1.4 1.6 1.8 λ(Å) Ni Filter The dotted line is the Mass Absorption coefficient for Ni Interference and Bragg’s Law AO=OB Bragg Diffraction occurs when 2AO=nλ Sinθ=AO/d(hkl) 2d Sinθ=nλ λ=wavelength of the incident radiation Cu Kα=1.54 Å Monochromatic X-rays using Diffraction Graphite monochromator utilizes a highly orientated pyrolytic graphite crystal (HOPG) mounted in a compact metal housing to provide monochromatic radiation. This is usually an improvement over filters. C (Graphite) Lattice Parameter Calculation Miller Indices Bragg’s Law Silicon Powder Knowing dhkl we can calculate the lattice parameters X-ray Diffraction Differentiate Crystal Structures C (Graphite) C (Diamond) SiC 0.436 nm Scintag Advanced X-Ray Diffractometer System Conventional theta-theta scan Rocking curves and sample-tilting curves Grazing angle X-ray diffraction (GAXRD) DMSNT software package is used to control the diffractometer, to acquire raw data and to analyze data. PDF-2 database and searching software for identifying phases X-ray Diffraction Typical Patterns Amorphous Pattern Crystalline Pattern • Amorphous patterns will show an absence of sharp peaks • Crystalline patterns will show many sharp peaks • • The atoms are very carefully arranged • High symmetry From peak locations and Bragg’s Law, we can determine the structure and lattice parameters. • Elemental composition is never measured • By comparing to a database of known materials, phases can be identified X-ray Diffraction Peak Intensities 1. Polarization Factor 2. Structure Factor 3. Multiplicity Factor 4. Lorentz Factor 5. Absorption Factor 6. Temperature Factor α-Al2O3 X-ray Diffraction Phase Identification International Centre for Diffraction Data (ICDD) Iron Chloride Dihydrate • The PDF-2 (Powder Diffraction File) database contains over 265K entries. • Modern computer programs can determine what phases are present in any sample by quickly comparing the diffraction data to all of the patterns in the database. • The PDF card for an entry contains much useful information, including literature references. X-ray Diffraction Phase Identification PDF # 72-0268 Iron Chloride Hydrate Iron Chloride Dihydrate X-ray Diffraction Quantitative Phase Analysis (QPA) • External standard method • A reflection from a pure component. • Direct comparison method • A reflection from another phase within the mixture. • Internal standard method • A reflection from a foreign material mixed within the sample. • Reference Intensity Ratio (RIR) • Generalized internal standard method developed by the ICDD. Breakdown of the PDF-2 database X-ray Diffraction Quantitative Phase Analysis (QPA) DIFFRAC.SUITE EVA Fe 75, Ni 25 wt.% X-ray Diffraction X ray diffraction of semi-crystalline polymer and amorphous polymer X-ray Diffraction XRD is a primary technique to determine the degree of crystallinity in polymers. The determination of the degree of crystallinity implies use of a two-phase model, i.e. the sample is composed of crystalline and amorphous regions. Smaller Crystals Produce Broader XRD Peaks 2nm Gold Nanoparticle Note: In addition to instrumental peak broadening, other factors that contribute to peak broadening include strain and composition inhomogeneities. When to Use Scherrer’s Formula Crystallite size < 5000 Å K t B cos B t = thickness of crystallite K = constant dependent on crystallite shape (0.89) = X-ray wavelength B = FWHM (full width at half max) or integral breadth θB = Bragg angle Residual Stress Measurements using X-Ray Diffraction X-ray Diffraction Diffraction cones arise from randomly oriented polycrystalline aggregates or powders X-ray Polycrystalline Sample Diffraction Cone forms Debye Rings X-ray Diffraction 2D Detector Area Detector Debye Rings X-ray Diffraction Types of Detectors Scintillation detector 2D Area detector Small portion of Debye large 2 and chi range measured ring acquired scan necessary long measuring times simultaneously measurement of oriented samples very short measuring times intensity versus 2 by integration of the data X-ray Diffraction Bruker D8 Discover • Small Beam diameter • Can achieve 200μm • Parallel Illumination • Forgives displacement errors • 4 circle Huber goniometer • Dual beam alignment system X-ray Diffraction Orientation Polymers, due to their long chain structure, are often highly oriented. Alignment of a sample in a drawing process causes orientation effects X-ray Diffraction Orientation The intensity distribution of the Debye ring reveals much information about the texture of the material being studied! X-ray Diffraction of Conch Shells In addition to identifying the CaCO3 as the Aragonite polymorph, X-ray diffraction patterns reveal a strong degree of crystallographic texture in the intact shell. X-ray Diffraction 224 Simulated pattern of CuInSe2 204 213 213 112 Acquired XRD pattern of a thin film of CuInSe2 grown on a Mo foil substrate 211 103 101 204 112 Orientation X-ray Sources Rigaku D/MAX 2200 Diffractometer Anode Ka1(Å) Comments Best for inorganics. Fe and Co fluorescence. Cu 1.54060 Cr High Resolution for large d2.28970 spacing. High attenuation in air. Co 1.78897 Used for ferrous alloys to reduce Fe fluorescence. X-ray Diffraction Summary • • • • • • • • Structure Determination Phase Identification Quantitative Phase Analysis (QPA) Percent Crystallinity Crystallite Size and Microstrain Residual Stress Measurements (Macrostrain) Texture Analysis Single Crystal Studies (not a SCSAM core competency) Electron Diffraction Zeiss Libra 200EF Polycrystal Single Crystal EBSD – Electron Back-Scattered Diffraction in the SEM Background Corrected Pattern Averaged Background Raw Pattern EBSD – Electron Back-Scattered Diffraction in the SEM Background Corrected Pattern Indexed Pattern 4 12 2 10 1 EBSD data – Maps Beam scan provides orientation map of polycrystalline NaCl 300×300 grid 5 μm step Analysis time: 36 minutes The colors indicate specific orientations 500 μm EBSD data – Maps polycrystalline Al2O3 A single automated EBSD run can provide a complete characterization of the microstructure: • • • • • • • • Phase distribution Texture strength Grain size Boundary properties Misorientation data Slip system activity Intra-granular deformation Can collect XEDS simultaneously EBSD Phase Discrimination bcc Fe fcc Fe Differences in interplanar angles and spacings allow similar-looking EBSD patterns from bcc and fcc Fe to be readily distinguished. bcc Fe fcc Fe EBSD data – Maps Phase distribution, texture, grain size / shape, boundary properties, misorientation, slip system activity, intra-granular deformation.... Phase map Orientation bcc Orientation fcc Summary • XRD is a powerful tool for answering some specific questions about a given sample. – Phases present, QPA, orientation, residual stress, texturing, and crystallite size analysis. • XRD is extremely efficient for the characterization of samples. – Sample preparation time is minimal when compared to SEM/EBSD and TEM. – Data acquisition is straight forward and short set up times are required. • XRD will provide a larger sampling area and a more accurate averaged result of the lattice parameter, but EBSD will be more site specific. • EBSD yields similar results and all the same “specific questions” can be answered in one data set! Hough Transformation 1 2 2 Hough transformation Transforms x-y space to r- space. Bands in Hough space show as points which are easier to identify and extract 90 ° 1 0 1 0 ° 1 2 4 2 1 0 4 90 ° 1 Format of Crystal Information Band triplets Solution # # votes S3 (best solution w/most votes) S2 (2nd best solution w/ 2ndmost votes) Euler Angles using Bung convention: 1. A rotation of φ1 about the z axis followed by 2. A rotation of ϕ about the rotated xaxis followed by 3. A rotation of φ2 about the rotated zaxis X-ray Diffraction Phase Identification Intensity Mass Absorption Coefficient 1.2 Kα Kα Kβ Kβ 1.4 1.6 λ(Å) Unfiltered 1.8 1.2 1.4 1.6 λ(Å) Ni Filter 1.8