1 SP.AM.01 MN

= 1 (-1) = = (1 point) Let 11 and 12 be two images with cumulative distributions C CDF(11) and C2 = CDF(12). Let's introduce : (2) = (C-)(x) + c{-} (x)) and the images T1 = $(C1(I)) and 12 = $(C2(12)) called the midway specifica- tions of 11 and 12. Deliverables: If 11 and 12 are two constant images with respective values a and b, i.e. 11(x, y) = a and 12(x, y) = b, prove that the midway specifications for both images are both equal to the constant image 11 (x, y) = 11(x, y) = a. Is the cumulative histogram of the midway specifications equal to the average of the cumulative histograms ? = = a+b =