If x is an odd positive integer, solve 4...

If x is an odd positive integer, solve 4x + 5 > x + 26

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D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } Find (D-E)' uu F

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } Find (D-E)' nn F

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } Find D-(E nn F)'

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } Find D-(E uu F)'

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } Find D'-(E-F)'

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } Find (D-E)'-F'

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } prove D-E=E'-D'

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } prove D-(D nn E) = D nn E'

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } prove D nn (E-D)= O/

D, E and F are three subsets of universal set U defined as follows : D = {x : x is a positive integer le7 } E= {x : x is a positive integer : 5le xle 9 } F= {x : x is a positive integer : 3le xle 12 } U = {x : x is a positive integer le12 } prove D-(E uu F )=(D-E) nn (D-F)

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