(1)A= A 1. 次の行列 A の行列式 |A| を求めよ. 1 51 0 2 200 (2)) A= 0-4 30 1 2-2 1 3 7 -63 59-95 27 03 1 -2-53 3 1 42 4 4 5 5 0 -2 35 2 3 33 (3)A= (4) A= 6 0 1 3 3 3 44 -3 865 -2-2 -25 2 2 2 2 17

7 31.7 A.1 (1) 105 A=0 200 0-430 1-1-2-53 1A1=132.20 151 030 193 Al =(-)2(1.3.3 +5·0⋅(-1)+ | •0⋅(-5) -1・3・(-1)-0-1-5)・1-3-50) Al-12(9+0+0+3+0-0) Al-2.12 IAI-24 (2) /12-2 A = 376 3 59-95 |A|, LAI = 27 1)x(-3)) -63 x(-5) 5995 1270314 x(-2) 2 -2 (3) 131 A=0-235 6013 +3865 ((-3)+3 2-(-3)+7 -2-(-3)-6 1-(-3)+3(4) 1*(-5)+5 2+ (-5)+9 -2-(-5)-9 1 • (5) +5 1.(2)+22.(-2)+7-21-2)+1(2)13 2-21 0 1 TAL=0 10 0 341 1-211 13142 A = 10-235 6013 3 8 6 5 K 13.(-2)+6 1.(-2)+0 4.(2)+2(-2)+3 13.1-3 *1 13:3 4 0 -2 3 JAI= 11+8 4.1+6 2.1+5 A= 3000 1 43 4 2 5 1-235 -2 -2-71 9107 |A| = (-1)"" 3. |-2-71 910 IAI-1-3-(2-(-7)· 7+ 3·(+)· 9+5 · (-2)·10 −5·(-7) ·9-(-1) · 10 · (-2)-7.3·(-2)) =3(98-27-100+315-20+42) =3・308 2 49 35 983155 -147 +45 =924 4455 A= 23 33 3 3 44 1-2-2-25 14455 AL= 2333 3344 -2-25 1A1 = (-1) 2+2.1.10 10 104 |A₁ = (-1)*·|· (1·|·|+ (-2)·0-0+1·0.4 1・1・0-0・4・1・1・(2)・0) = AL-1.1.1