Given,
|{x}^{2}-2|\leq y&y\leq x
Now on finding the intersection point we get, (x,y)\equiv (1,1)&(2,2)
Now plotting the curve of the above function we get,

Now from above diagram required bounded area will be,
A=[∫12(x−(2−x2))dx+∫22(x−(x2−2))dx]
⇒A=[2x2−2x+3x3]12+[2x2−3x3+2x]22
⇒A=[1−22+322]−[21−2+31]+[2−38+4]−[1−322+22]
⇒A=29−382
⇒6A=27−162
⇒6A+162=27