3. Consider the radiographic scenario depicted in Figure 5.5 in the book (page 301). (a) Find a basis for the range space of the radiographic transformation. (b) Find a basis for the nullspace of the radiographic transformation. (c) Use your work in parts (a) and (b), and theorems/corollaries from the book to argue if the radiographic transformation is one-to-one, onto, and an isomorphism. Make sure to cite the theorems/corollaries you used in your arguments. ཨ ཡ – སཏྟཱཡིཡཾ - - – -------) ------ 27. ⚫ Height and width of image in voxels: n = 2 (Total voxels N = 4) • Pixels per view in radiograph: m = 4 • Scale Fac = √√2/2 Number of views: a = 1 • Angle of the views: 0₁ = 45°

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3. Consider the radiographic scenario depicted in Figure 5.5 in the book (page 301). (a) Find a basis for the range space of the radiographic transformation. (b) Find a basis for the nullspace of the radiographic transformation. (c) Use your work in parts (a) and (b), and theorems/corollaries from the book to argue if the radiographic transformation is one-to-one, onto, and an isomorphism. Make sure to cite the theorems/corollaries you used in your arguments.

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ཨ ཡ – སཏྟཱཡིཡཾ - - – -------) ------ 27. ⚫ Height and width of image in voxels: n = 2 (Total voxels N = 4) • Pixels per view in radiograph: m = 4 • Scale Fac = √√2/2 Number of views: a = 1 • Angle of the views: 0₁ = 45°