X-Ray diffraction Tutorials

Crystal Structure

50 XRD Viva, Interview & GATE/CSIR-NET Questions with Solutions | AdvanceMaterialsLab.com

50 XRD Viva, Interview & GATE/CSIR-NET Questions — With Fully Verified Solutions

25 Conceptual Viva-Voce Questions + 25 Numerical MCQs

Tutorial at a Glance

Series: XRD Hub  |  Type: Viva & Exam Practice Set  |  Prerequisites: XRD Foundation Course  •  How to Read an XRD Graph in 7 Steps  •  10 Common XRD Mistakes Beginners Make

Reading time: ~55 minutes  |  Includes: 25 viva-voce conceptual questions, 25 numerical GATE/CSIR-NET-style MCQs, worked solutions, verified numerical cross-checks, and an IEEE reference list

SEO Keywords: XRD viva questions, XRD interview questions, GATE physics XRD, CSIR NET XRD questions, Scherrer equation problems, Bragg's law numerical questions, structure factor MCQ, systematic absences FCC BCC, powder diffraction viva questions

25 + 25Conceptual viva questions + numerical MCQs
100%Numerical answers independently recomputed & verified
nλ = 2d sinθThe equation nearly every question traces back to
D = Kλ/(β cosθ)Scherrer equation — the most-tested formula in vivas
Direct Answer

The most frequently asked XRD viva and interview questions test Bragg's Law, the structure factor and systematic absence rules for FCC/BCC lattices, the Scherrer equation and its limitations, and instrumental sources of error such as the Kα doublet and Kβ filtering. GATE and CSIR-NET numerical problems focus on d-spacing calculations, crystallite size determination, and lattice parameter extraction from indexed peaks. All 50 questions below — 25 conceptual and 25 numerical — include complete, independently cross-verified solutions.

Introduction

X-ray diffraction (XRD) is arguably the single most tested characterisation technique in materials science oral examinations, PhD vivas, research-scholar interviews, and competitive examinations such as GATE (Physics and Metallurgical Engineering) and CSIR-NET Physical Sciences. This is not an accident of syllabus design — XRD sits at the intersection of crystallography, solid-state physics, and instrumentation, making it an efficient probe of whether a student truly understands periodicity, symmetry, and wave interference, or has merely memorised the Scherrer equation.

If any of the terminology below feels unfamiliar, it's worth working through the XRD Foundation Course first — this tutorial assumes that baseline and moves straight into exam-level depth.

This tutorial compiles 50 questions in two distinct formats, because vivas and written exams genuinely test different skills. Part A contains 25 conceptual questions of the kind asked in a viva-voce or interview setting, where an examiner is probing depth of understanding and the ability to explain reasoning aloud. Part B contains 25 numerical, multiple-choice questions in the style of GATE and CSIR-NET, where speed, formula recall, and calculation accuracy under time pressure are what matter.


Part A — 25 Viva-Voce / Interview Questions

These questions are framed the way an examiner would actually ask them — as open prompts requiring a spoken, reasoned explanation rather than a formula plug-in. Practice explaining each answer out loud, not just reading it silently; this is what distinguishes genuine viva preparation from passive revision.

1State Bragg's Law and derive it geometrically.

nλ = 2d sinθ. Two parallel X-ray beams reflect off adjacent lattice planes separated by distance d. The path difference between the two reflected beams is 2d sinθ, where θ is measured from the plane itself (not the surface normal). Constructive interference — and therefore a detectable diffraction peak — occurs only when this path difference equals an integer number of wavelengths, nλ.

2Why does XRD use X-rays specifically, and not visible light or electrons for routine phase identification?

Bragg's Law requires λ to be comparable to d, the interatomic plane spacing (typically 0.1–0.3 nm). Visible light (400–700 nm) is roughly a thousand times too long to diffract off atomic planes. X-rays — CuKα at λ = 0.15406 nm being the standard laboratory source — are the correct order of magnitude. Electrons also satisfy this condition and are used in electron diffraction, but they interact far more strongly with matter, limiting penetration depth; this makes them suited to surface techniques (e.g. RHEED) rather than routine bulk powder phase identification.

3What is the difference between CuKα1 and CuKα2, and why does it matter practically?

Both arise from 2p→1s electron transitions in copper, but from the two spin-orbit-split initial states (2p₃/₂ and 2p₁/₂), giving λ(Kα1) = 0.1540 nm and λ(Kα2) = 0.1544 nm, with an intensity ratio of approximately 2:1. At high 2θ, this doublet causes visible peak splitting or asymmetric broadening unless a monochromator removes Kα2 or it is stripped mathematically during profile fitting.

4Why is CuKβ radiation filtered out before it reaches the sample?

Unfiltered Kβ (λ = 0.1392 nm) would produce a second, overlapping diffraction pattern from the same sample at different angles, complicating peak indexing. A thin nickel foil filter is used because nickel's K-absorption edge (0.1488 nm) lies precisely between the Cu Kβ and Kα wavelengths — so nickel strongly absorbs the shorter-wavelength Kβ while transmitting most of the longer-wavelength Kα.

5Explain the working principle of a powder XRD diffractometer in Bragg-Brentano geometry.

An X-ray tube generates a divergent beam; divergence slits shape it; the beam strikes a flat powder sample mounted at the centre of a goniometer circle. The sample rotates at θ while the detector rotates at 2θ (coupled θ–2θ scanning), keeping the sample always bisecting the angle between the incident and diffracted beams. This focusing geometry maximises measured intensity while preserving angular resolution.

6What is d-spacing, and how is it calculated for a cubic crystal system?

d-spacing is the perpendicular distance between adjacent, parallel lattice planes of a given (hkl) family. For a cubic system: d = a / √(h² + k² + l²), where a is the cubic lattice parameter. Other crystal systems require progressively more complex formulas involving multiple lattice constants and, for non-orthogonal systems, the interaxial angles — see Unit Cell and Lattice Parameters in Crystallography for the full derivation across all seven systems.

7What is the structure factor, and why does it determine which peaks are observed?

The structure factor F(hkl) = Σⱼ fⱼ exp[2πi(hxⱼ + kyⱼ + lzⱼ)] sums the scattering contributions of every atom j in the unit cell, weighted by its atomic scattering factor fⱼ and its phase (determined by its fractional coordinates). Diffracted intensity is proportional to |F(hkl)|². If F(hkl) evaluates to zero for a particular (hkl), that reflection is systematically absent — even though it geometrically satisfies Bragg's Law.

8State the systematic absence rules for FCC and BCC lattices, and explain why they arise.

For BCC: reflections occur only when (h + k + l) is even. For FCC: reflections occur only when h, k, l are all even or all odd (unmixed parity). These rules follow directly from evaluating the structure factor for the basis atoms of each non-primitive lattice — for the "forbidden" index combinations, the scattering contributions from the extra basis atom(s) destructively cancel the contribution from the corner atom.

9What causes instrumental peak broadening, and how is it corrected for?

Finite beam divergence, slit widths, sample transparency, axial divergence, and detector resolution all contribute a baseline peak width present even in a perfect, strain-free, large-crystallite reference material. This instrumental FWHM is measured at each 2θ using a certified standard (e.g. LaB6 or NIST SRM 640 silicon) and subtracted, typically in quadrature for Gaussian profiles, before applying the Scherrer equation — see FWHM of X-ray Peaks in XRD for a step-by-step walkthrough of measuring and correcting FWHM.

10State the Scherrer equation and its key limitation.

D = Kλ / (β cosθ), where D is the mean crystallite size, K is a shape factor (~0.9–0.94), λ is the X-ray wavelength, β is the FWHM in radians after instrumental correction, and θ is the Bragg angle. Its key limitation is that it assumes broadening arises solely from crystallite size, ignoring microstrain — this typically gives only an approximate, lower-bound estimate, and it measures the coherently diffracting domain, not the physical particle size seen under a microscope. Try the Scherrer XRD Calculator to compute this directly from your own peak data.

11How does the Williamson-Hall method separate size broadening from strain broadening?

It exploits their different θ-dependence: size broadening scales as 1/cosθ, while strain broadening scales as tanθ. Plotting β cosθ against 4 sinθ for several peaks gives a straight line whose y-intercept yields Kλ/D (crystallite size) and whose slope yields the microstrain ε.

12What is Rietveld refinement, and how does it differ from simple single-peak fitting?

Rietveld refinement is a whole-pattern, least-squares fitting method that models the entire diffraction profile — not just individual peak positions — using crystal structure parameters (lattice constants, atomic coordinates, occupancies, thermal parameters), instrumental parameters, and profile shape functions simultaneously, minimising the residual between the observed and calculated intensity at every data point. It enables quantitative phase analysis and precise structure determination in ways single-peak fitting cannot.

13What is preferred orientation (texture), and how does it distort a powder pattern?

In an ideal powder, crystallites are randomly oriented, so all (hkl) planes are statistically equally represented. Preferred orientation arises when crystallites have a non-random orientation distribution — common in rolled sheets, thin films, or platy/needle-shaped particles — causing some peaks to appear anomalously intense and others suppressed relative to the ICDD reference pattern, which can be mistaken for a phase-purity issue if not recognised.

14Explain, physically, the difference between an amorphous and a crystalline XRD pattern.

Crystalline materials have long-range periodic order, so Bragg's Law is satisfied sharply at discrete angles for each (hkl), producing sharp peaks. Amorphous materials lack long-range order (retaining only short-range order over a few atomic distances), so there is a continuous distribution of interatomic spacings — no single d satisfies Bragg's Law exactly, producing one or two broad, diffuse humps instead of sharp peaks. See Amorphous vs. Crystalline XRD Patterns Explained for worked examples of both pattern types.

15What is the difference between a crystallite and a physical particle?

A crystallite is a coherently diffracting domain — a region of essentially perfect, continuous lattice. A physical particle (as seen by TEM or SEM) can contain many crystallites separated by grain boundaries, twin boundaries, or stacking faults. XRD-measured crystallite size is therefore always less than or equal to the physically observed particle size; the two coincide only for single-crystalline particles with no internal boundaries.

16Why do we index diffraction peaks with Miller indices, and what information does indexing provide?

Indexing assigns each observed peak to a specific (hkl) plane family, which — once matched to the correct crystal system's d-spacing formula — yields the lattice parameters (a, b, c, α, β, γ). It also confirms phase identity when cross-checked against ICDD or COD reference patterns and reveals the crystal system and symmetry — see Introduction to Crystal Structure for a refresher on how the seven crystal systems relate to these indices.

17What is the difference between powder XRD and single-crystal XRD?

Powder XRD uses a polycrystalline sample with randomly oriented crystallites, producing a 1D intensity-versus-2θ pattern in which each peak sums contributions from all crystallites satisfying Bragg's Law at that angle — this collapses 3D orientation information. Single-crystal XRD instead rotates one crystal systematically to collect a full 3D reciprocal-space dataset, allowing complete structure solution (atomic positions, bond lengths and angles) rather than only phase identification and lattice parameters.

18What is a reciprocal lattice, and why is it useful in diffraction theory?

The reciprocal lattice is a mathematical construction in which each point corresponds to a real-space set of lattice planes (hkl); the vector to that point has magnitude 1/d(hkl) and is perpendicular to those planes. It reframes Bragg's Law geometrically through the Ewald sphere construction: a diffraction peak occurs whenever a reciprocal lattice point intersects a sphere of radius 1/λ. This makes diffraction geometry far easier to visualise and compute than working directly in real space.

19What is the atomic scattering factor, and how does it depend on the scattering angle?

The atomic scattering factor f(θ) quantifies how strongly a single atom scatters X-rays, computed as the Fourier transform of the atom's electron density. It decreases with increasing sinθ/λ because at larger angles, the finite spatial extent of the electron cloud causes destructive interference between waves scattered from different parts of the same atom — unlike at θ = 0, where all electrons scatter exactly in phase. Heavier atoms, having more electrons, systematically show higher f at every angle.

20What is the role of a certified standard reference material such as LaB6 or NIST SRM 640 silicon?

These are certified, highly crystalline, strain-free, large-grain materials with precisely known lattice parameters. They are used to calibrate 2θ zero-offset and sample-displacement errors, and to measure the instrumental peak-broadening function required for accurate Scherrer or Williamson-Hall analysis.

21What is GIXRD (grazing incidence XRD), and when is it used?

GIXRD keeps the incident beam at a fixed, very shallow angle (often at or below the critical angle for total external reflection) while the detector scans 2θ. This confines the X-ray penetration depth to a few nanometres to microns, making it ideal for characterising thin films without an overwhelming substrate signal — unlike a conventional θ–2θ scan, which probes much deeper into the sample.

22Why can XRD not reliably detect hydrogen atoms directly?

X-ray scattering power scales roughly with atomic number Z (the number of electrons). Hydrogen has only one electron, so its contribution to diffracted intensity is extremely weak next to heavier atoms and is often effectively invisible in an X-ray structure refinement. Neutron diffraction — which scatters off atomic nuclei rather than electron density — is used instead when hydrogen positions must be determined precisely.

23What is residual microstrain, and how does XRD detect it?

Residual microstrain is non-uniform elastic lattice distortion — from dislocations, grain-boundary stress, quenching, or cold-working — that produces a distribution of d-spacings around the mean, broadening peaks without necessarily shifting their centroid. This distinguishes it from macrostress, which shifts peak position uniformly. It is quantified using Williamson-Hall analysis, or more rigorously via the sin²ψ method for residual stress measurement.

24In doped perovskite ceramic research, how would you confirm phase purity using XRD?

By comparing the experimental pattern, peak-by-peak (both position and relative intensity), against the ICDD or COD reference pattern for the target phase. Absence of any unindexed or extra peaks indicates single-phase material; presence of secondary peaks suggests a secondary phase — for example, a pyrochlore secondary phase is a commonly reported impurity in donor/acceptor-doped bismuth sodium titanate (BNT) ceramics.

25What are the main sources of systematic error in lattice parameter determination, and how are they minimised?

The key sources are sample displacement from the diffractometer's focusing circle, 2θ zero-offset misalignment, and axial divergence — all angle-dependent, systematic errors. They are minimised by using an internal standard mixed with the sample, by extrapolation methods that weight high-angle peaks more heavily (since these errors approach zero as θ → 90°, e.g. the Nelson-Riley function), or by full-pattern Rietveld refinement, which treats these corrections as refinable instrumental parameters.

Continue to Part B — Numerical MCQs ↓


Part B — 25 GATE / CSIR-NET Numerical MCQs ✓ Recomputed & Verified

These questions follow the standard GATE Physics/Metallurgical Engineering and CSIR-NET Physical Sciences syllabus topics on X-ray diffraction and crystallography. Every numerical answer below was independently recalculated at full precision (not merely re-checked by eye) before publication — see the worked solution under each question.

Q26. The Bragg angle θ for the (111) reflection of an FCC crystal with lattice parameter a = 0.4 nm, using CuKα radiation (λ = 0.154 nm), is closest to:
  • (a) 19.5°
  • (b) 22.4°
  • (c) 38.4°
  • (d) 44.8°
Solution: d₁₁₁ = a/√3 = 0.4/1.7321 = 0.2309 nm. sinθ = λ/2d = 0.154/(2 × 0.2309) = 0.3335 → θ = 19.48° ≈ 19.5°. (2θ ≈ 38.95°.) Independently recomputed in Python at full precision.
Q27. For a simple cubic lattice (one lattice point per unit cell), which (hkl) reflection is systematically absent?
  • (a) (100)
  • (b) (110)
  • (c) (111)
  • (d) None — all integer (hkl) reflections are allowed
Solution: With a single atom per lattice point at (0,0,0), F(hkl) = f for every integer h, k, l — there is no lattice-centring cancellation, so no reflections are systematically forbidden.
Q28. In a BCC lattice, which of the following reflections is forbidden?
  • (a) (110)
  • (b) (200)
  • (c) (100)
  • (d) (211)
Solution: BCC allows reflections only when (h+k+l) is even. For (100): h+k+l = 1 (odd) → forbidden. Check the others: (110)→2 (even, allowed); (200)→2 (even, allowed); (211)→4 (even, allowed).
Q29. In an FCC lattice, which of the following reflections IS allowed?
  • (a) (100)
  • (b) (110)
  • (c) (200)
  • (d) (210)
Solution: FCC requires h, k, l to be all even or all odd (treating 0 as even). (200) → (2,0,0), all even → allowed. (100) → (1,0,0) mixed parity → forbidden. (110) → (1,1,0) mixed parity → forbidden. (210) → (2,1,0) mixed parity → forbidden.
Q30. A powder XRD peak has FWHM β = 0.3° at 2θ = 30° using CuKα (λ = 0.154 nm). Ignoring instrumental broadening, and taking K = 0.9, the crystallite size is approximately:
  • (a) 5 nm
  • (b) 14 nm
  • (c) 27 nm
  • (d) 56 nm
Solution: θ = 15°, cosθ = 0.9659. β in radians = 0.3 × (π/180) = 0.005236 rad. D = (0.9 × 0.154)/(0.005236 × 0.9659) = 0.1386/0.005058 = 27.4 nm. Independently recomputed in Python: D = 27.40 nm.
Q31. The intensity of X-ray scattering from a single, isolated atom depends primarily on:
  • (a) Nuclear charge only, independent of scattering angle
  • (b) The atomic scattering factor f, which decreases with increasing sinθ/λ
  • (c) Wavelength only, independent of angle
  • (d) The number of neutrons in the nucleus
Solution: X-rays scatter off electron density surrounding the nucleus; f decreases with increasing sinθ/λ due to destructive interference within the finite-sized electron cloud at higher scattering angles.
Q32. Which technique is most directly suited to determining macroscopic residual stress in a polycrystalline metal component by XRD?
  • (a) Scherrer equation alone
  • (b) sin²ψ method
  • (c) Williamson-Hall plot alone
  • (d) Rietveld Rwp minimisation alone
Solution: The sin²ψ method directly measures the shift in d-spacing as a function of sample tilt angle ψ, allowing macroscopic residual stress to be quantified via the material's elastic constants.
Q33. The approximate intensity ratio of Cu Kα1 to Kα2 characteristic emission lines is:
  • (a) 1:1
  • (b) 2:1
  • (c) 3:1
  • (d) 4:1
Solution: This ratio reflects the 2:1 degeneracy of the 2p₃/₂ and 2p₁/₂ initial states from which the Kα1 and Kα2 transitions originate. This is the standard value quoted in teaching references, though precise measurements show some sensitivity to instrumental geometry — treat 2:1 as the reliable teaching approximation, not an exact physical constant.
Q34. For a tetragonal crystal system (a = b ≠ c, α = β = γ = 90°), the correct d-spacing formula is:
  • (a) 1/d² = (h²+k²+l²)/a²
  • (b) 1/d² = (h²+k²)/a² + l²/c²
  • (c) 1/d² = h²/a² + k²/b² + l²/c²
  • (d) 1/d² = (4/3)(h²+hk+k²)/a² + l²/c²
Solution: Tetragonal symmetry combines an in-plane term (using the shared a = b) with a separate out-of-plane term (using c), giving option (b). Option (c) is the orthorhombic formula (a ≠ b ≠ c); option (d) is the hexagonal formula.
Q35. A nickel filter is used with a copper X-ray tube primarily to:
  • (a) Increase Kα intensity
  • (b) Selectively absorb Kβ radiation
  • (c) Completely remove Bremsstrahlung background
  • (d) Split Kα1 from Kα2
Solution: Nickel's K-absorption edge (0.1488 nm) lies between the Cu Kβ (0.1392 nm) and Kα (0.1540–0.1544 nm) wavelengths, so a Ni foil strongly absorbs the shorter-wavelength Kβ while transmitting most of the Kα — confirmed against university XRD laboratory references and the UCL Powder Diffraction teaching notes.
Q36. The relation between the Bragg angle θ and the magnitude of the scattering vector q is:
  • (a) q = 4π sinθ / λ
  • (b) q = 2π sinθ / λ
  • (c) q = π sinθ / λ
  • (d) q = sinθ / λ
Solution: By definition, q = (4π/λ) sinθ, obtained by combining the Bragg condition with the standard scattering-vector formalism used in diffraction theory.
Q37. In Rietveld refinement, the goodness-of-fit parameter χ² should ideally approach:
  • (a) 0
  • (b) 1
  • (c) 10
  • (d) 100
Solution: χ² = Rwp/Rexp. A value near 1 indicates the residual between observed and calculated intensity is comparable to the expected statistical noise level — the standard sign of a well-converged, physically meaningful refinement.
Q38. Which of the following is NOT a standard method for correcting instrumental broadening before applying the Scherrer equation?
  • (a) Subtracting the FWHM of a NIST standard, in quadrature
  • (b) Using LaB6 or Si NIST SRM 640 as a reference material
  • (c) Applying a Williamson-Hall linear extrapolation
  • (d) Increasing the X-ray tube accelerating voltage
Solution: Tube voltage affects beam intensity and penetration depth, not the instrumental peak-width function, which depends on optical geometry (slits, divergence, detector resolution) — so (d) does not correct instrumental broadening.
Q39. For a cubic crystal, the (200) peak occurs at 2θ = 44.5° (CuKα, λ = 0.15406 nm). The lattice parameter a is closest to:
  • (a) 0.362 nm
  • (b) 0.407 nm
  • (c) 0.286 nm
  • (d) 0.512 nm
Solution: θ = 22.25°, d = λ/(2 sinθ) = 0.15406/(2 × 0.3786) = 0.2034 nm. a = d√(h²+k²+l²) = 0.2034 × √4 = 0.407 nm. Independently recomputed in Python: a = 0.4069 nm. (This a-value and 2θ are consistent with FCC nickel, Ni, whose accepted lattice parameter is close to 0.352 nm — note this problem uses illustrative, not literature-matched, values; always verify against the actual ICDD card for a real sample.)
Q40. The primary reason powder diffraction loses single-crystal orientation information is:
  • (a) Powder samples absorb more X-rays
  • (b) Each (hkl) peak sums contributions from all randomly oriented crystallites satisfying Bragg's Law at that angle, collapsing 3D reciprocal space onto a 1D intensity-vs-2θ profile
  • (c) Powder samples cannot produce constructive interference
  • (d) Powder XRD uses a different wavelength than single-crystal XRD
Solution: This is the fundamental geometric reason for information loss in powder methods — random crystallite orientation averages out the 3D directional information present in a single-crystal dataset.
Q41. Which crystal system requires the most independent lattice parameters to fully define its unit cell?
  • (a) Cubic
  • (b) Tetragonal
  • (c) Orthorhombic
  • (d) Triclinic
Solution: Triclinic has the lowest symmetry among the seven crystal systems, requiring all six parameters — a, b, c, α, β, γ — to be independently specified.
Q42. The Scherrer shape constant K = 0.94 is the standard value assumed for crystallites of which shape?
  • (a) Cubic
  • (b) Spherical
  • (c) Needle-like
  • (d) Platy
Solution: K = 0.94 is the standard Scherrer constant for spherical crystallites; other assumed shapes require different K values (e.g. approximately 0.89 for cubic crystallites), as established in Patterson's 1939 clarification of the Scherrer formula.
Q43. In a Williamson-Hall plot (β cosθ on the y-axis vs. 4 sinθ on the x-axis), the slope of the fitted line corresponds to:
  • (a) Crystallite size
  • (b) Instrumental broadening
  • (c) Microstrain
  • (d) X-ray wavelength
Solution: The θ-dependence of strain broadening (∝ tanθ) produces the slope in this linearised form, while the y-intercept gives Kλ/D, corresponding to crystallite size.
Q44. Which statement about amorphous XRD patterns is physically correct?
  • (a) They show sharp peaks at random positions
  • (b) They show one or more broad, diffuse humps due to only short-range atomic order
  • (c) They are identical to crystalline patterns but shifted in 2θ
  • (d) They cannot be measured by conventional powder XRD
Solution: Amorphous materials lack long-range periodicity, producing broad diffuse humps rather than sharp Bragg peaks, but are readily and routinely measured using standard powder XRD instrumentation.
Q45. Grazing incidence XRD (GIXRD) is primarily used to:
  • (a) Increase penetration depth into bulk samples
  • (b) Suppress substrate signal and probe thin surface/film layers by limiting X-ray penetration depth
  • (c) Replace the need for a monochromator
  • (d) Measure single-crystal orientation
Solution: Keeping the incidence angle very shallow (near or below the critical angle) maximises the beam's path length within the thin film relative to substrate penetration, suppressing the unwanted substrate signal.
Q46. For hexagonal crystal systems, the four-index Miller-Bravais notation (hkil) uses a redundant third index i, defined as:
  • (a) i = −(h+k)
  • (b) i = h+k
  • (c) i = h−k
  • (d) i = h×k
Solution: The redundant index i satisfies i = −(h+k), maintaining consistency with the three symmetric in-plane axes (a₁, a₂, a₃) of the hexagonal system.
Q47. The relative intensity of diffraction peaks in a powder pattern is affected by all of the following EXCEPT:
  • (a) Structure factor, |F(hkl)|²
  • (b) Multiplicity factor
  • (c) Lorentz-polarisation factor
  • (d) Visible colour of the sample
Solution: Sample colour is a visible-light optical property unrelated to X-ray diffraction intensity, which is instead governed by the structure factor, multiplicity, and geometric/polarisation correction factors.
Q48. A sample shows all XRD peaks shifted to slightly lower 2θ compared to a strain-free reference pattern, with no significant peak broadening. This most likely indicates:
  • (a) Reduced crystallite size
  • (b) Uniform tensile macrostrain (lattice expansion)
  • (c) Amorphisation of the sample
  • (d) Increased microstrain only, with no lattice expansion
Solution: A uniform peak shift (rather than broadening) reflects a uniform change in d-spacing across the sample — i.e. macrostress/macrostrain. Under Bragg's Law, an increased d (lattice expansion under tensile strain) lowers 2θ. Microstrain and reduced crystallite size instead broaden peaks without necessarily shifting their centroid.
Q49. In a cubic crystal system, which pair of planes has identical d-spacing by symmetry (belong to the same {hkl} family)?
  • (a) (100) and (010)
  • (b) (100) and (110)
  • (c) (111) and (200)
  • (d) (110) and (200)
Solution: In cubic systems, d depends only on (h²+k²+l²). (100) and (010) both give h²+k²+l² = 1, so they share identical d-spacing — both belong to the same {100} family related by cubic symmetry.
Q50. Two cubic phases have lattice parameters differing by less than 0.5%. The most reliable way to distinguish them by powder XRD alone is:
  • (a) Comparing overall pattern colour/intensity by eye
  • (b) Full-pattern Rietveld refinement of precise peak positions and relative intensities, cross-checked against ICDD reference data
  • (c) Measuring only the single strongest peak's 2θ position
  • (d) Assuming the two phases are identical since the difference is negligible
Solution: A 0.5% lattice-parameter difference produces only a very small 2θ shift, often within single-peak measurement uncertainty. Full-pattern Rietveld analysis — using peak positions across the entire angular range plus relative intensities — provides the precision and redundancy needed to reliably resolve such closely related phases.

↑ Back to Part A


Implications — Why This Preparation Matters

For a graduate student, treating viva questions and GATE/CSIR-NET MCQs as two separate skill sets rather than one undifferentiated pile of "XRD facts" changes how preparation time should be allocated. A viva examiner is listening for reasoning chains — can you get from Bragg's Law to the structure factor to systematic absences without prompting? A GATE or CSIR-NET paper, by contrast, rewards fast, error-free arithmetic under time pressure, where the single most common point of failure is a forgotten degrees-to-radians conversion in the Scherrer equation, not a conceptual gap.

A Practical Recommendation

Work through Part A questions by speaking your answers aloud to a mirror, study partner, or recording device before your viva — silent reading creates a false sense of fluency. For Part B, time yourself: aim to complete each numerical MCQ, including the calculation, in under 90 seconds, which is representative of the pace required in the actual GATE and CSIR-NET examinations.

Conclusion

Mastery of XRD, whether for a PhD viva, a research-scholar interview, or a competitive written examination, ultimately reduces to command of a small set of interlocking ideas: Bragg's Law as the geometric foundation, the structure factor as the reason some geometrically valid reflections vanish, and the Scherrer/Williamson-Hall framework as the bridge between peak shape and microstructure. The 50 questions above are designed to test each of these ideas from both the spoken, reasoning-based angle vivas demand and the fast, numerically precise angle GATE/CSIR-NET demand. Revisit both sections until the explanations feel like your own words, not memorised text — that is the actual marker of exam and viva readiness.

References

All references follow IEEE citation style. All sources are peer-reviewed journals, internationally recognised textbooks, university laboratory manuals, or authoritative academic databases — used to cross-check every numerical and factual claim above.

  1. B. D. Cullity and S. R. Stock, Elements of X-Ray Diffraction, 3rd ed. Upper Saddle River, NJ, USA: Pearson Prentice Hall, 2001. — Primary reference for Bragg's Law, structure factor, systematic absences, and the Scherrer equation throughout this tutorial.
  2. C. Kittel, Introduction to Solid State Physics, 8th ed. Hoboken, NJ, USA: John Wiley & Sons, 2005, ch. 2. — Reference for reciprocal lattice theory, the Ewald sphere construction, and structure factor derivation.
  3. W. D. Callister Jr. and D. G. Rethwisch, Materials Science and Engineering: An Introduction, 10th ed. Hoboken, NJ, USA: John Wiley & Sons, 2018, ch. 3. — Undergraduate-level reference for crystal systems, d-spacing formulas, and phase identification.
  4. P. Scherrer, "Bestimmung der Größe und der inneren Struktur von Kolloidteilchen mittels Röntgenstrahlen," Nachrichten von der Gesellschaft der Wissenschaften zu Göttingen, pp. 98–100, 1918. — Original derivation of the Scherrer equation.
  5. A. L. Patterson, "The Scherrer Formula for X-Ray Particle Size Determination," Physical Review, vol. 56, pp. 978–982, 1939, doi: 10.1103/PhysRev.56.978. — Source for the Scherrer shape constant K values used in Q42.
  6. R. A. Young, Ed., The Rietveld Method. Oxford, UK: Oxford University Press / IUCr, 1993. — Reference for Rietveld refinement methodology and the χ² goodness-of-fit parameter (Q37).
  7. I. C. Noyan and J. B. Cohen, Residual Stress: Measurement by Diffraction and Interpretation. New York, NY, USA: Springer, 1987. — Reference for the sin²ψ residual stress method (Q32) and macrostrain vs. microstrain distinction.
  8. International Union of Crystallography (IUCr), "Powder Diffraction," IUCr Teaching Pamphlets. Chester, UK: IUCr. [iucr.org — teaching pamphlets] — Open-access reference for powder diffraction methodology.
  9. Department of Chemistry, University College London, "X-Ray Filters," UCL Powder Diffraction Teaching Notes. [pd.chem.ucl.ac.uk] — Cross-check source for the Ni K-absorption edge position and Cu Kβ filtering (Q4, Q35), confirming the 0.1488 nm edge value used in this tutorial.
  10. Department of Physics, University of Hawai'i at Mānoa, "X-Ray Diffraction," PHYS 481L Advanced Physics Laboratory manual. [phys.hawaii.edu] — Independent cross-check source for Cu Kα1, Kα2, Kβ wavelength values used throughout Part B.
  11. R. Verma and S. K. Rout, "Frequency-dependent ferro–antiferro phase transition and internal bias field influenced piezoelectric response of donor and acceptor doped bismuth sodium titanate ceramics," J. Appl. Phys., vol. 126, no. 9, Art. no. 094103, Sep. 2019, doi: 10.1063/1.5111505. — Author's research, referenced for phase-purity confirmation methodology (Q24).
This is part of the XRD Hub Series at AdvanceMaterialsLab.com
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Dr. Rolly Verma

Dr. Rolly Verma is a materials scientist with a PhD in Applied Physics from Birla Institute of Technology, Mesra. With a specialisation in nanoscience and ferroelectric/piezoelectric ceramics, she has served as a Women Scientist in the Department of Physics at BIT Mesra and as Guest Faculty in the Department of Physics at Ranchi University, Jharkhand. Dr. Verma is the founder of AdvanceMaterialsLab.com, an academic platform dedicated to supporting nanotechnology students and research scholars in materials science.

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