Consider f" ":" "N ->N , g" ":" "N ->N a...

Consider `f" ":" "N ->N` , `g" ":" "N ->N` and `h" ":" "N ->R` defined as`f" "(x)" "=" "2x` , `g" "(y)" "=" "3y" "+" "4` and `h" "(z)" "=" "s in" "z` , `AA` x, y and z in N. Show that ho(gof ) = (hog) of.

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Consider f" ":" "N ->N , g" ":" "N ->N and h" ":" "N ->R defined asf" "(x)" "=" "2x , g" "(y)" "=" "3y" "+" "4 and h" "(z)" "=" "s in" "z , AA x, y and z in N. Show that ho(gof ) = (hog) of.

Consider f : N ->N , g : N ->N and h : N ->R defined as f (x) = 2x , g (y) = 3y + 4 and h (z) = sin z , AA x, y and z in N. Show that ho(gof ) = (hog) of.

Consider of f : N rarrN and h : N rarr R defined as f(x) = 2x, g(y) = 3y + 4 and h(z) = sin z, AA , x, y and z in N. Show that ho(gof) = (hog)of.

Consider f: N to N, g : N to N and h: N to R defined as f(x) = 2x, g(y) = 3y + 4 and h(z) = sin z, AA x, y and z in N. Show that ho(gof) = (hog)of .

Consider f: N rarr N,g :N rarr N and h: Nrarr R defined as f(x) = 2x, g(y) = 3y + 4 and h(z) = sin z, AAx, y and z in N. Show that ho(gof) = (hog)of .

Consider f:N to N, g : N to N and h: N to R defined as f (x) =2x,g (h) = 3y + 4 and h (z= sin z, AA x, y and z in N. Show that h(gof) = (hog) of.

Consider `f" ":" "N ->N` , `g" ":" "N ->N` and `h" ":" "N ->R` defined as`f" "(x)" "=" "2x` , `g" "(y)" "=" "3y" "+" "4` and `h" "(z)" "=" "s in" "z` , `AA` x, y and z in N. Show that ho(gof ) = (hog) of.

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