Question 1138676


 {{{h(x)=(3/4)X^2}}} with the graph {{{f(x)=X^2}}}

recall:

A vertical compression (or shrinking) is the squeezing of the graph toward the x-axis.
• if {{{k > 1}}}, the graph of {{{h(x) = k*f(x)}}} is the graph of {{{f (x)}}} vertically stretched by multiplying each of its y-coordinates by {{{k}}}
 
• if {{{0 < k < 1}}} (a fraction), the graph is {{{f (x)}}} vertically shrunk (or compressed) by multiplying each of its y-coordinates by {{{k }}}

• if {{{k }}}should be negative, the vertical stretch or shrink is followed by a reflection across the x-axis 

in your case the parent function  {{{f(x)=X^2}}} is multiplied by {{{k=3/4}}} which is {{{0 < k < 1}}} (a fraction), and 
the graph is {{{f (x)}}} vertically shrunk (or compressed) by multiplying each of its y-coordinates by {{{k }}}

=>{{{h(x)=(3/4)X^2}}} is vertically shrunk (or compressed) by {{{k=3/4 }}}


answer:
1. {{{h(x) }}}wS vertically shrunk