Question: Problem 1: Projection Slice Theorem for radially symmetric Function Consider a radially symmetric function, f(x,y) = circ(r). Hint: circ(r) has diameter = 1 mm. (a)

Problem 1: Projection Slice Theorem for radially symmetric Function Consider a radially symmetric function, f(x,y) = circ(r). Hint: circ(r) has diameter = 1 mm. (a) Calculate the projection, ge(L), for this function by integrating over y (or x) at an arbitrary L. (b) Calculate Ge(p). Hint: J_0(t) in https://en.wikibooks.org/wiki/Engineering_Tables/Fourier_Transform_Table_2 (c) Show that (b) affirms the Projection-Slice theorem. That is, find the 2D FT of circ(r) and compare this to Go(p)

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