Given,
A=[10004120−1−3]
A2=[10004120−1−3][10004120−1−3]
⇒A2=[10004120−1−3]=A
⇒A2=A
⇒A3=A⋅A2=A2=A
⇒A4=A2⋅A2=A2=A
⇒A3=A4=……=A
(A+I)11=C011A11+C111A10+….C1011A+C1111I
=(C011+C111+….C1011)A+I
=(211−1)A+I=2047A+I
⇒(A+I)11=2047A+I
⇒(A+I)11=[2047+10004×2047+112×20470−1×2047−3×2047+1]
∴ Sum of diagonal elements
=2047(1+4−3)+3
=4094+3=4097