modify your search
Results for DC.creator="J." AND DC.creator="I." AND DC.creator="Langford" in section 5.2.1 of volume C |
Bragg angle: operational definitions
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.4, pp. 491-492 [ doi:10.1107/97809553602060000596 ]
Bragg angle: operational definitions 5.2.1.4. Bragg angle: operational definitions The Bragg angles are determined from the observations by a series of operations that are often quite complex. For film cameras of diameter 57.3 or 114.6mm, a simple measurement with a millimetre scale gives [theta] in degrees (1mm = 1 or 0.5°). ...
Errors of the Bragg angle
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.3, p. 491 [ doi:10.1107/97809553602060000596 ]
Errors of the Bragg angle 5.2.1.3. Errors of the Bragg angle The error in the Bragg angle, , will ordinarily consist of both random and systematic components. The random components (as the name implies) have an expected value zero, but the systematic errors will affect all measurements consistently to a greater or ...
Errors and aberrations: general discussion
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.2, p. 491 [ doi:10.1107/97809553602060000596 ]
Errors and aberrations: general discussion 5.2.1.2. Errors and aberrations: general discussion The relation between the lattice spacing d, the angle of incidence (Bragg angle) [theta], and the wavelength [lambda] is Bragg's law: The lattice spacing d is related to the lattice parameters a, b, c, [alpha], [beta], [gamma] and the ...
The techniques available
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.1, p. 491 [ doi:10.1107/97809553602060000596 ]
... used with similar or even smaller quantities. References Wilson, A. J. C. (1963). Mathematical theory of X-ray powder diffractometry. Eindhoven: Centrex. Wilson, A. J. C. (1965c). Röntgenstrahlpulverdiffractometrie. Mathematische Theorie. Eindhoven: Centrex. Wilson, A. J. C. (1974). Powder diffractometry. X-ray diffraction, by ...
Introduction
International Tables for Crystallography (2006). Vol. C, Section 5.2.1, pp. 491-492 [ doi:10.1107/97809553602060000596 ]
... desired) a measure of the integrated intensity. References Wilson, A. J. C. (1963). Mathematical theory of X-ray powder diffractometry. Eindhoven: Centrex. Wilson, A. J. C. (1965c). Röntgenstrahlpulverdiffractometrie. Mathematische Theorie. Eindhoven: Centrex. Wilson, A. J. C. (1974). Powder diffractometry. X-ray diffraction, by ...
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.4, pp. 491-492 [ doi:10.1107/97809553602060000596 ]
Bragg angle: operational definitions 5.2.1.4. Bragg angle: operational definitions The Bragg angles are determined from the observations by a series of operations that are often quite complex. For film cameras of diameter 57.3 or 114.6mm, a simple measurement with a millimetre scale gives [theta] in degrees (1mm = 1 or 0.5°). ...
Errors of the Bragg angle
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.3, p. 491 [ doi:10.1107/97809553602060000596 ]
Errors of the Bragg angle 5.2.1.3. Errors of the Bragg angle The error in the Bragg angle, , will ordinarily consist of both random and systematic components. The random components (as the name implies) have an expected value zero, but the systematic errors will affect all measurements consistently to a greater or ...
Errors and aberrations: general discussion
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.2, p. 491 [ doi:10.1107/97809553602060000596 ]
Errors and aberrations: general discussion 5.2.1.2. Errors and aberrations: general discussion The relation between the lattice spacing d, the angle of incidence (Bragg angle) [theta], and the wavelength [lambda] is Bragg's law: The lattice spacing d is related to the lattice parameters a, b, c, [alpha], [beta], [gamma] and the ...
The techniques available
International Tables for Crystallography (2006). Vol. C, Section 5.2.1.1, p. 491 [ doi:10.1107/97809553602060000596 ]
... used with similar or even smaller quantities. References Wilson, A. J. C. (1963). Mathematical theory of X-ray powder diffractometry. Eindhoven: Centrex. Wilson, A. J. C. (1965c). Röntgenstrahlpulverdiffractometrie. Mathematische Theorie. Eindhoven: Centrex. Wilson, A. J. C. (1974). Powder diffractometry. X-ray diffraction, by ...
Introduction
International Tables for Crystallography (2006). Vol. C, Section 5.2.1, pp. 491-492 [ doi:10.1107/97809553602060000596 ]
... desired) a measure of the integrated intensity. References Wilson, A. J. C. (1963). Mathematical theory of X-ray powder diffractometry. Eindhoven: Centrex. Wilson, A. J. C. (1965c). Röntgenstrahlpulverdiffractometrie. Mathematische Theorie. Eindhoven: Centrex. Wilson, A. J. C. (1974). Powder diffractometry. X-ray diffraction, by ...
powered by |