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10 | <div class=WordSection1> |
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11 | |
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12 | <p class=MsoNormal><span style='font-size:16.0pt;line-height:115%;font-family: |
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13 | "Times New Roman","serif"'><h4>Smear Computation </h4></span></p> |
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14 | |
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15 | |
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16 | <ul style='margin-top:0in' type=disc> |
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17 | <li class=MsoNormal style='line-height:115%'><a href="#Slit Smear"><b>Slit Smear</b></a> |
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18 | </li> |
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19 | <li class=MsoNormal style='line-height:115%'><a href="#Pinhole Smear"><b>Pinhole Smear</b></a> |
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20 | </li> |
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21 | <li class=MsoNormal style='line-height:115%'><a href="#2D Smear"><b>2D Smear</b></a> |
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22 | </li> |
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23 | </ul> |
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24 | |
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25 | <p class=MsoListParagraph><span style='font-size:14.0pt;line-height:115%; |
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26 | font-family:"Times New Roman","serif"'><h5><a name="Slit Smear">Slit Smear</a></h5></span></p> |
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27 | |
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28 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The sit |
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29 | smeared scattering intensity for SANS is defined by</span></p> |
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30 | |
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31 | <p class=MsoNormal><img |
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32 | src="./img/sm_image002.gif" align=left hspace=12></p> |
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33 | |
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34 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'> |
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35 | ---- 1)</span><br clear=all> |
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36 | <span style='font-family:"Times New Roman","serif"'>where Norm = <span |
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37 | style='position:relative;top:15.0pt'><img |
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38 | src="./img/sm_image003.gif"></span>.</span></p> |
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39 | <br> |
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40 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The |
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41 | functions <span style='position:relative;top:6.0pt'><img |
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42 | src="./img/sm_image004.gif"></span> and <span style='position: |
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43 | relative;top:6.0pt'><img |
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44 | src="./img/sm_image005.gif"></span> refer to the slit width weighting |
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45 | function and the slit height weighting determined at the q point, respectively. |
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46 | Here, we assumes that the weighting function is described by a rectangular |
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47 | function, i.e.,</span></p> |
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48 | |
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49 | <p class=MsoNormal><span style='position:relative;top:7.0pt'><img |
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50 | src="./img/sm_image006.gif"> |
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51 | </span><span style='font-family:"Times New Roman","serif";position:relative; |
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52 | top:7.0pt'> ---- 2)</span></p> |
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53 | |
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54 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>and </span></p> |
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55 | |
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56 | <p class=MsoNormal><span style='position:relative;top:7.0pt'><img |
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57 | src="./img/sm_image007.gif"></span>, |
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58 | <span style='font-family:"Times New Roman","serif"'> ---- 3)</span></p> |
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59 | |
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60 | <p>so that <img |
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61 | src="./img/sm_image008.gif"> <img src="./img/sm_image009.gif"> for <img |
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62 | src="./img/sm_image010.gif"> and <i>u</i>. The <img src="./img/sm_image011.gif"> |
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63 | and <img src="./img/sm_image012.gif"> stand for the slit height (FWHM/2) and the slit |
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64 | width (FWHM/2) in the q space. Now the integral of Eq. (1) is simplified to</span></p> |
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65 | |
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66 | <p class=MsoNormal><img |
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67 | src="./img/sm_image013.gif" align=left hspace=12><span |
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68 | style='font-family:"Times New Roman","serif"'> |
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69 | ---- 4)</span></p> |
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70 | |
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71 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"; |
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72 | position:relative;top:20.0pt'> </span></p> |
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73 | |
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74 | <p class=MsoListParagraphCxSpFirst style='margin-left:0in'><b><span |
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75 | style='font-family:"Times New Roman","serif"'>Numerical Implementation of Eq. |
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76 | (4) </span></b></p> |
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77 | |
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78 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in;text-indent:-.25in'><span |
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79 | style='font-family:"Times New Roman","serif"'>1)<span style='font:7.0pt "Times New Roman"'> |
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80 | </span></span><span style='font-family:"Times New Roman","serif"'>For </span><span |
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81 | style='position:relative;top:6.0pt'><img |
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82 | src="./img/sm_image012.gif"></span>= 0 <span style='font-family: |
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83 | "Times New Roman","serif"'>and </span><span style='position:relative; |
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84 | top:6.0pt'><img src="./img/sm_image011.gif"></span> = |
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85 | <span style='font-family:"Times New Roman","serif"'>constant:</span></p> |
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86 | |
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87 | <p> |
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88 | <img src="./img/sm_image016.gif"></p> |
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89 | |
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90 | <p> For discrete q values, at the q |
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91 | values from the data points and at the q values extended up to q<sub>N</sub>= |
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92 | q<sub>i</sub> + <img src="./img/sm_image011.gif"> , the smeared intensity can be |
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93 | calculated approximately, </p> |
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94 | |
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95 | <p><img |
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96 | src="./img/sm_image017.gif">. |
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97 | ---- 5)</p> |
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98 | |
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99 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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100 | style='position:relative;top:7.0pt'><img |
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101 | src="./img/sm_image018.gif"></span> <span style='font-family: |
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102 | "Times New Roman","serif"'>= 0 for <i>I<sub>s</sub></i> in</span> <i><span |
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103 | style='font-family:"Times New Roman","serif"'>j < i</span></i><span |
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104 | style='font-family:"Times New Roman","serif"'> or<i> j>N-1</i>.</span></p> |
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105 | |
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106 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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107 | style='font-family:"Times New Roman","serif"'> </span></p> |
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108 | |
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109 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in;text-indent:-.25in'><span |
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110 | style='font-family:"Times New Roman","serif"'>2)<span style='font:7.0pt "Times New Roman"'> |
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111 | </span></span><span style='font-family:"Times New Roman","serif"'>For </span><span |
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112 | style='position:relative;top:6.0pt'><img |
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113 | src="./img/sm_image012.gif"></span>= <span style='font-family: |
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114 | "Times New Roman","serif"'>constant </span> <span style='font-family:"Times New Roman","serif"'>and |
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115 | </span><span style='position:relative;top:6.0pt'><img |
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116 | src="./img/sm_image011.gif"></span> = <span style='font-family: |
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117 | "Times New Roman","serif"'>0:</span></p> |
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118 | |
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119 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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120 | style='font-family:"Times New Roman","serif"'>Similarly to 1), we get</span></p> |
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121 | |
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122 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'> |
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123 | <img src="./img/sm_image019.gif"> |
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124 | <span style='font-family:"Times New Roman","serif"'> ---- 6)</span></p> |
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125 | |
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126 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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127 | style='font-family:"Times New Roman","serif"'>for q<sub>p</sub> = q<sub>i</sub> |
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128 | - </span><span style='position:relative;top:6.0pt'><img |
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129 | src="./img/sm_image012.gif"></span><span style='font-family: |
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130 | "Times New Roman","serif"'> and</span> <span style='font-family:"Times New Roman","serif"'>q<sub>N</sub> |
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131 | = q<sub>i</sub> + </span><span style='position:relative;top:6.0pt'><img |
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132 | src="./img/sm_image012.gif"></span>. <span |
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133 | style='position:relative;top:7.0pt'><img |
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134 | src="./img/sm_image018.gif"></span> <span style='font-family: |
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135 | "Times New Roman","serif"'>= 0 for <i>I<sub>s</sub></i> in</span> <i><span |
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136 | style='font-family:"Times New Roman","serif"'>j < p</span></i><span |
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137 | style='font-family:"Times New Roman","serif"'> or<i> j>N-1</i>.</span></p> |
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138 | |
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139 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'> </p> |
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140 | |
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141 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in;text-indent:-.25in'><span |
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142 | style='font-family:"Times New Roman","serif"'>3)<span style='font:7.0pt "Times New Roman"'> |
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143 | </span></span><span style='font-family:"Times New Roman","serif"'>For </span><span |
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144 | style='position:relative;top:6.0pt'><img |
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145 | src="./img/sm_image011.gif"></span>= <span style='font-family: |
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146 | "Times New Roman","serif"'>constant </span> <span style='font-family:"Times New Roman","serif"'>and |
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147 | </span><span style='position:relative;top:6.0pt'><img |
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148 | src="./img/sm_image011.gif"></span> = <span style='font-family: |
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149 | "Times New Roman","serif"'>constant:</span></p> |
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150 | |
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151 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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152 | style='font-family:"Times New Roman","serif"'>This case, the best way is to |
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153 | perform the integration, Eq. (1), numerically for both slit height and width. |
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154 | However, the numerical integration is not correct enough unless given a large |
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155 | number of iteration, say at least 10000 by 10000 for each element of the matrix |
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156 | W, which will take minutes and minutes to finish the calculation for a set of |
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157 | typical SANS data. An alternative way which is correct for slit width << |
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158 | slit hight, is used in the SANSView: This method is a mixed method that |
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159 | combines the method 1) with the numerical integration for the slit width.</span></p> |
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160 | |
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161 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'> |
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162 | </p> |
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163 | |
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164 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'> |
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165 | <img src="./img/sm_image020.gif"> <span style='font-family: |
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166 | "Times New Roman","serif"'> ---- (7)</span></p> |
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167 | |
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168 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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169 | style='font-family:"Times New Roman","serif"'>for q<sub>p</sub> = q<sub>i</sub> |
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170 | - </span><span style='position:relative;top:6.0pt'><img |
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171 | src="./img/sm_image012.gif"></span><span style='font-family: |
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172 | "Times New Roman","serif"'> and</span> <span style='font-family:"Times New Roman","serif"'>q<sub>N</sub> |
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173 | = q<sub>i</sub> + </span><span style='position:relative;top:6.0pt'><img |
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174 | src="./img/sm_image012.gif"></span>. <span |
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175 | style='position:relative;top:7.0pt'><img |
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176 | src="./img/sm_image018.gif"></span> <span style='font-family: |
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177 | "Times New Roman","serif"'>= 0 for <i>I<sub>s</sub></i> in</span> <i><span |
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178 | style='font-family:"Times New Roman","serif"'>j < p</span></i><span |
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179 | style='font-family:"Times New Roman","serif"'> or<i> j>N-1</i>. </span></p> |
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180 | |
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181 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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182 | style='font-family:"Times New Roman","serif"'> </span></p> |
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183 | |
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184 | <p class=MsoListParagraphCxSpMiddle style='margin-left:.25in'><span |
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185 | style='font-family:"Times New Roman","serif"'> </span></p> |
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186 | |
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187 | <p class=MsoListParagraphCxSpLast><span style='font-size:14.0pt;line-height: |
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188 | 115%;font-family:"Times New Roman","serif"'><h5><a name="Pinhole Smear">Pinhole Smear</a></h5></span></p> |
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189 | |
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190 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The |
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191 | pinhole smearing computation is done similar to the Case 2) above except that |
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192 | the weight function used was the Gaussian function, so that the Eq. 6) for this |
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193 | case becomes</span></p> |
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194 | |
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195 | <p class=MsoNormal><img src="./img/sm_image021.gif"><span |
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196 | style='font-family:"Times New Roman","serif"'> ---- (8)</span></p> |
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197 | |
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198 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>For all |
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199 | the cases above, the weighting matrix <i>W</i> is calculated when the smearing |
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200 | is called at the first time, and it includes the ~ 60 q values (finely binned |
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201 | evenly) below (>0) and above the q range of data in order to cover all data |
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202 | points of the smearing computation for a given model and for a given slit size. |
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203 | The <i>Norm</i> factor is found numerically with the weighting matrix, and |
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204 | considered on <i>I<sub>s</sub></i> computation.</span></p> |
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205 | |
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206 | <p class=MsoListParagraphCxSpFirst style='margin-left:.25in'><span |
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207 | style='font-family:"Times New Roman","serif"'> </span></p> |
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208 | |
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209 | <p class=MsoListParagraphCxSpLast><span style='font-size:14.0pt;line-height: |
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210 | 115%;font-family:"Times New Roman","serif"'><h5><a name="2D Smear">2D Smear</a></h5></span></p> |
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211 | |
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212 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>The |
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213 | 2D smearing computation is done similar to the 1D pinhole smearing above |
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214 | except that the weight function used was the 2D elliptical Gaussian function</span></p> |
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215 | |
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216 | <p class=MsoNormal><img src="./img/sm_image022.gif"><span |
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217 | style='font-family:"Times New Roman","serif"'> ---- (9)</span></p> |
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218 | |
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219 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>In Eq |
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220 | (9), x<sub>0</sub> = qcosθ</span><span |
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221 | style='font-family:"Times New Roman","serif"'> and y<sub>0</sub> = qsinθ</span><span style='font-family:"Times New Roman","serif"'> |
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222 | , and the primed axes are in the coordinate rotated by an angle θ</span><span style='font-family:"Times New Roman","serif"'> |
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223 | around z-axis (below) so that x<sub>0</sub> = x<sub>0</sub>cosθ + </span><span style='font-family:"Times New Roman","serif"'>y<sub>0</sub> |
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224 | sinθ </span><span style='font-family: |
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225 | "Times New Roman","serif"'>and y<sub>0</sub> = -x<sub>0</sub>sinθ + </span><span style='font-family:"Times New Roman","serif"'>y<sub>0</sub> |
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226 | cosθ.</span><span style='font-family: |
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227 | "Times New Roman","serif"'> Note that the rotation angle is zero for x-y |
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228 | symmetric elliptical Gaussian distribution</span>. |
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229 | <span style='font-family:"Times New Roman","serif"'>The A is a |
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230 | normalization factor.</span></p> |
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231 | |
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232 | <p class=MsoNormal align=center style='text-align:center'><span |
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233 | style='font-family:"Times New Roman","serif"'><img |
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234 | id="Object 1" src="./img/sm_image023.gif"></span></p> |
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235 | |
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236 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'> </span></p> |
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237 | |
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238 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>Now we |
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239 | consider a numerical integration where each bins in </span> Θ </span><span style='font-family:"Times New Roman","serif"'> |
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240 | and R are <b>evenly </b>(this is to simplify the equation below) distributed by |
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241 | </span>ΔΘ </span><span style='font-family: |
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242 | "Times New Roman","serif"'>and </span> Δ</span><span |
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243 | style='font-family:"Times New Roman","serif"'>R, respectively, and it is |
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244 | assumed that I(x, y) is constant within the bins which in turn becomes</span></p> |
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245 | |
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246 | <p class=MsoNormal><img src="./img/sm_image024.gif"></p> |
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247 | |
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248 | <p class=MsoNormal> <span |
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249 | style='font-family:"Times New Roman","serif"'> ---- (10)</span></p> |
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250 | |
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251 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>Since we |
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252 | have found the weighting factor on each bin points, it is convenient to |
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253 | transform x-y back to x-y coordinate (rotating it by -θ</span><span style='font-family:"Times New Roman","serif"'> |
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254 | around z axis). Then, for the polar symmetric smear,</span></p> |
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255 | |
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256 | <p class=MsoNormal><img src="./img/sm_image025.gif"><span |
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257 | style='position:relative;top:35.0pt'> </span> ---- (11)</p> |
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258 | |
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259 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>where,</span></p> |
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260 | |
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261 | <p class=MsoNormal><img src="./img/sm_image026.gif">,</p> |
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262 | |
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263 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>while |
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264 | for the x-y symmetric smear,</span></p> |
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265 | |
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266 | <p class=MsoNormal><img src="./img/sm_image027.gif"><span |
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267 | style='font-family:"Times New Roman","serif"'> ---- (12)</span></p> |
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268 | |
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269 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>where,</span></p> |
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270 | |
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271 | <p class=MsoNormal><img src="./img/sm_image028.gif"></p> |
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272 | |
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273 | <p class=MsoNormal><span style='font-family:"Times New Roman","serif"'>Here, the |
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274 | current version of the SANSVIEW uses the Eq. (11) for 2D smearing assuming that |
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275 | all the Gaussian weighting functions are aligned in the polar coordinate. </span></p> |
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276 | <p> In the control panel, the higher accuracy indicates more and finer binnng points |
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277 | so that it costs more in time. </p> |
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278 | |
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279 | |
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280 | </div> |
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281 | |
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282 | </body> |
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283 | |
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