q 7 MATH 243 14) 8 points. Call an integer special if it equals 3N+1 for...

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q 7 MATH 243 14) 8 points. Call an integer "special" if it equals 3N+1 for some integer N. Prove that "The product of two special integers must be a special integer." Have the first line in your proof be: "Let two special integers A and B be given." even odd 3N+1 bet N=1 (N) (3N+1) 7 n=6 99997 2 Exam 1 Let N=1 3N + N = 3+1 =4 Fainal Ket N = 2 12*2=14 two product of special integel give PA AIR BAG 95 85 a 15) 5 points. Showing the resulting list at the end of each pass, use the insertion sort to put the list (9, 7, 2, 6, 5, 85) in order from least to greatest. Instructor: Sylvia Gutowska 85 even 85 q 7 MATH 243 14) 8 points. Call an integer "special" if it equals 3N+1 for some integer N. Prove that "The product of two special integers must be a special integer." Have the first line in your proof be: "Let two special integers A and B be given." even odd 3N+1 bet N=1 (N) (3N+1) 7 n=6 99997 2 Exam 1 Let N=1 3N + N = 3+1 =4 Fainal Ket N = 2 12*2=14 two product of special integel give PA AIR BAG 95 85 a 15) 5 points. Showing the resulting list at the end of each pass, use the insertion sort to put the list (9, 7, 2, 6, 5, 85) in order from least to greatest. Instructor: Sylvia Gutowska 85 even 85