Use the parabola tool to graph the function g(x) = ( 1/5x)^2

G  (  x  )  =  1  5  x  2  the parent work is the most straightforward type of the sort of capacity given.  f  (  x  )  =  x  2  the change being depicted is from  f  (  x  )  =  x  2  to  g  (  x  )  =  1  5  x  2  .  f  (  x  )  =  x  2  →  g  (  x  )  =  1  5  x  2  the flat move relies upon the estimation of  h  . the flat move is depicted as:   g  (  x  )  =  f  (  x  +  h  )  - the diagram is moved to one side  h  units.  g  (  x  )  =  f  (  x  −  h  )  - the chart is moved to one side  h  units.  for this situation,  h  =  0  which implies that the chart isn't moved to one side or right.  even shift: none  the vertical move relies upon the estimation of  k  . the vertical move is depicted as:   g  (  x  )  =  f  (  x  )  +  k  - the diagram is moved up  k  units.  g  (  x  )  =  f  (  x  )  −  k  - the diagram is moved down  k  units.  for this situation,  k  =  0  which implies that the diagram isn't moved up or down.  vertical shift: none  the diagram is reflected about the x-hub when  g  (  x  )  =  −  f  (  x  )  , which does not coordinate the change from  f  (  x  )  =  x  2  to  g  (  x  )  =  1  5  x  2  .  reflection about the x-hub: none  the chart is reflected about the y-hub when  g  (  x  )  =  f  (  −  x  )  , which does not coordinate the change from  f  (  x  )  =  x  2  to  g  (  x  )  =  1  5  x  2  .  reflection about the y-pivot: none  packing and extending relies upon the estimation of  a  .  at the point when  a  is more prominent than  1  : vertically extended  at the point when  a  is between  0  what's more,  1  : vertically packed  for this situation, the diagram  g  (  x  )  =  1  5  x  2  is vertically packed.  vertical compression or stretch: compressed  to discover the change, contrast the two capacities and check with check whether there is a level or vertical move, reflection about the x-pivot, and if there is a vertical extend.  parent function:   f  (  x  )  =  x  2  even shift: none  vertical shift: none  reflection about the x-pivot: none  reflection about the y-pivot: none  vertical compression or stretch: compressed

Will show energy on x axis time on the y axis feel free to ask any questions