Consider the area between the graphs x+2y=9 and x+6=y^2. This area can be computed

You appear to have found their intersection correct as
(3,3) and (19,-5)

USING VERTICAL SLICES:
y^2 = x+6
so y = ± √(x+6) = ± (x+6)^(1/2)

so for the part from -6 to 3
height = (x+6)^ - ( -(x+6)^(1/2)
= 2(x+6)^(1/2)
integral of that is (4/3)(x+6)^(3/2)
area of part 1
= (4/3)(9)^(3/2) - (0)
= 36
2nd part of the region:
heigh = (1/2)(9-x) - (-(x+6)^(1/2) )
= (1/2)( (9-x) + (x+6)^(1/2) )
integral of that is
(1/2) ( 9x - x^2/2 + (2/3)(x+6)^(3/2) )
evaluated from 3 to 19
= (1/2) [ 171 - 361/2 + (2/3)(125) - (27 - 9/2 + (2/3)(27) ]
= 50/3

better check my arithmetic, I was too lazy to write it out first.
So the area of the enclosed region using vertical slices = 36 + 50/3 = 158/3

USING HORIZONTAL SLICES:
width of a slice = 9-2y - (y^2 - 6)
= 15 - 2y - y^2
Area = ∫(15-2y-y^2) dy from -5 to 3
= [15y - y^2 - y^3/3] from -5 yo 3
= 45 - 9 - 27/3 - (-75 - 25 + 125/3)
= 256/3

ARGGG!! , error somewhere , sorry, perhaps you can spot it .