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a)

$ g(x)+h(x)=0 $

$ g(x) $ even $ h(x) $ odd

g is both even and odd

$ g(x)=g(-x)=-g(x) $

b)

$ f(x)=f_{e}(x)+f_{0}(x) $

$ f(-x)=f_{e}(-x)+f_{0}(-x)=f_{e}(x)-f_{0}(x) $

solve for $ f_{e}(x) $ and $ f_{0}(x) $

$ f_{e}(x)= (f(x)+f(-x))/2 $

$ f_{0}(x)= (f(x)-f(-x))/2 $

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