(1 point) Consider the region in the xy-plane bounded above by the graphs of y = x, y = 3x, and y = 3. On a piece of paper, sketch this region. Set up double integrals to compute the area of this region in two different ways. One order of integration requires only 1 double integral, while the other requires 2 double integrals. With a single double integral: Area = (Enter either "dx dy" or "dy dx".) where a = b = ,c= , and d = (You may find it helpful to write x= something or y= something in your own work, but leave that part out of the answers you submit to Webwork. Put a single number or function in each answer blank, e.g., "5" or "0" or "2x+3".) With two double integrals: Area = + (Enter either "dx dy" or "dy dx" in each box. Set up the integrals so that a is less g than e.) where a = , b = ,C= d= He= f = g= , and h = (You may find it helpful to write x= something or y= something in your own work, but leave that part out of the answers you submit to Webwork. Put a single number or function in each answer blank, e.g., "5" or "0" or "2x+3".) Compute the area both ways. What do you get? Area is