(x2/3−x1/3+1x+1−x−x1/2x−1)10
(x2/3−x1/3+1(x1/3+1)(x2/3−x1/3+1)−x1/2(x1/2−1)(x1/2+1)(x1/2−1))10
=((x1/3+1)−(x1/2x1/2+1))10
=(x1/3−x1/21)10
Now the (r+1)th Term
Tr+1=Cr10(x1/3)10−r⋅(−x1/21)r
Tr+1=Cr10(x1/3)10−r⋅x−r/2(−1)r
For independent term
310−r−2r=0⇒r=4
⇒T5=C410(−1)4
=4×3×2×110×9×8×7=210