((-24)^2·90^3/(1/360)^(-3) + ABS((1/2 + 1/3 + 1/6)^(-2)·(+ 5/3)^5·(21/35)^5))^(-8)·(1/10)^3/(1/100)^5=
=((2^6·3^2)·(2^3·3^6·5^3)/(2^9·3^6·5^3) + ABS(1^(-2)·(5^5/3^5)·(3^5/5^5)))^(-8)·(1/(2^3·5^3))/(1/(2^10·5^10))=
=(3^2 + ABS(1^(-2)·(5^5/3^5)·(3^5/5^5)))^(-8)·(1/(2^3·5^3))/(1/(2^10·5^10))=
=(3^2 + ABS(1))^(-8)·(1/(2^3·5^3))/(1/(2^10·5^10))=
=10^(-8)·(1/(2^3·5^3))/(1/(2^10·5^10))=
=1/(2^8·5^8)·(1/(2^3·5^3))/(1/(2^10·5^10))=
=1/(2^8·5^8)·(1/(2^3·5^3))·(2^10·5^10)=
=1/(2·5) = 1/10