04 * Compute the composite functions fog and g•fand discuss their domains, where f (x) =Vx, g(x) = 1 – x. %3D O fog=v(1-x), g•f=1- vx g•f=v(1-x), f•g=1- vx O gof=fog=1- vx fog=g•f=Dv(1-x)

Transcribed Image Text:

04 * Compute the composite functions fog and g•fand discuss their domains, where f (x) =vx, g(x) = 1 – x. fog=v(1-x), gof=1- vx g•f=v(1-x), fog=1- vx g•f=fog=1- vx fog=g•f=v(1-x)

Transcribed Image Text:

03 Consider the integral fx² ln(x)dx and the integration by parts method Sudv = uv – Svdu + C. Which expression should be set as u and what is the minimum number of applications of integration by parts that can be used to evaluate this integral? u=In(x) with one application u=In(x) with two applications u=(1/x) with one application u=In(1/x) with one application