Recall the Chain Rule in terms of the functions h ( x ) and g ( x ) , which states that if g is differentiable at x and h is differentiable at g ( x ) , then the composite function F h g defined by F ( x ) h ( g ( x ) ) is differentiable at x and F ' is given by the following F ' ( x ) h ' ( g ( x ) ) g ' ( x ) We are given the function f ( x ) sin ( 6 ln ( x ) ) To write this is the form F ( x ) h ( g ( x ) ) we can let g ( x ) 6 ln ( x ) and h ( x )

Question

Recall the Chain Rule in terms of the functions h ( x ) and g ( x ) , which states that if g is differentiable at x and h is differentiable at g ( x ) , then the composite function F   h g defined by F ( x )   h ( g ( x ) ) is differentiable at x and F  ' is given by the following  F  ' ( x )   h  ' ( g ( x ) ) g  ' ( x ) We are given the function f ( x )   sin ( 6 ln ( x ) ) To write this is the form F ( x )   h ( g ( x ) ) we can let g ( x )   6 ln ( x ) and h ( x )

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Recall the Chain Rule in terms of the functions h ( x ) and g ( x ) , which states that if g is

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