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Question

Show that each of the following systems of linear equations is consistent and also find their solutions:
(i) 6x + 4y = 2
9x + 6y = 3

(ii) 2x + 3y = 5
6x + 9y = 15

(iii) 5x + 3y + 7z = 4
3x + 26y + 2z = 9
7x + 2y + 10z = 5

(iv) x − y + z = 3
2x + y − z = 2
−x −2y + 2z = 1

(v) x + y + z = 6
x + 2y + 3z = 14
x + 4y + 7z = 30

(vi) 2x + 2y − 2z = 1
4x + 4y − z = 2
6x + 6y + 2z = 3

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Solution

(i) Here,6x+4y=2 ...(1) 9x+6y=3 ...(2)AX=B Here,A=6496, X=xy and B=236496xy=23 A =6496 =36-36 =0So, A is singular. Thus, the given system of equations is either inconsistent or it is consistent with infinitely many solutions because adj AB0 or adj A=0.Let Cij be the co factors of the elements aij in Aaij. Then,C11=6, C12=-9, C21=-4, C22=6adj A=6-9-46T = 6-4-96adj AB= 6-4-9623 =12-12-18+18 =00If A=0 and adj AB=0, then the system is consistent and has infinitely many solutions.Thus, AX=B has infinitely many solutions. Substituting y=k in the eq. (1), we get6x+4k=26x=2-4kx=2-4k6x=1-2k3 x=1-2k3 and y=kThese values of x and y satisfy the third equation.Thus, x=1-2k3 and y=k where k is a real number satisfy the given system of equations.


(ii) Here,2x+3y=5 ...(1) 6x+9y=15 ...(2) or , AX=B where,A=2369, X=xy and B=5152369xy=515 A =2369 =18-18 =0So, A is singular. Thus, the given system of equations is either inconsistent or it is consistent with infinitely many solutions because adj AB0 or adj A=0.Let Cij be the co-factors of the elements aij in Aaij. Then,C11=9, C12=-6, C21=-3 and C22=2adj A=9-6-32T = 2-3-69adjAB= 9-3-62515 =45-45-30+30 =00IfA=0 and adjAB=0, then the system is consistent and has infinitely many solutions.Thus, AX=B has infinitely many solutions. Substituting y=k in eq. (1), we get2x+3k=52x=5-3kx=5-3k2 and y=kThese values of x and y satisfy the third equation.Thus, x=5-3k2 and y=k where k is a real number satisfy the given system of equations.


(iii) Here,5x+3y+7z=4 ...(1) 3x+26y+2z=9 ...(2)7x+2y+10z=5 ...(3)or ,AX=B where, A=53732627210, X=xyz and B=49553732627210xyz=495 A =53732627210 =5260-4-330-14+7(6-182) =1280-48-1232 =0So, A is singular. Thus,the given system of equations is either inconsistent or it is consistent with infinitely many solutions because adj AB0 or adj AB=0. Let Cij be the co-factors of the elements aij in Aaij. Then,C11=-11+1262210 =256 , C12=-11+232710 =-16, C13=-11+332672=-176C21=-12+137210 =-16 , C22=-12+2 57710 =1, C23=-12+35372 =11C31=-13+137262 =-176, C32=-13+25732 =11, C33=-13+353326=121adj A=256-16-176-16111-17611121T = 256-16-176-16111-17611121adj AB=256-16-176-16111-17611121495 =1024-144-880-64+9+55-704+99+605 =000if A=0 and adjAB=0, then the system is consistent and has infinitely many solutions.Thus, AX= B has infinitely many solutions. Substituting z=k in eq. (1) and eq. (2), we get5x+3y=4-7k and 3x+26y=9-2k53326xy=4-7k9-2kNow,A=53326 =130-9 =121 0adj A=26-3-35A-1=1Aadj A =112126-3-35X=A-1Bxy=112126-3-354-7k9-2kxy=1121104-182k-27+6k-12+21k+45-10kxy=77-176k12133+11k121x=117-16k121, y=113+k121 and z=k x= 7-16k11, y= 3+k11and z=kThese values of x, y and z also satisfy the third equation.Thus, x= 7-16k11, y= 3+k11 and z=k where k is a real number satisfy the given system of equations.


(iv) Here,x-y+z=3 ...(1)2x+y-z=2 ...(2)-x-2y+2z=1 ...(3)or,AX=Bwhere, A=1-1121-1-1-22, X=xyz and B=3211-1121-1-1-22xyz=321 A =1-1121-1-1-22 =12-2+14-1+1(-4+1) =0+3-3 =0So, A is singular. Thus, the given system of equations is either inconsistent or it is consistent with infinitely many solutions because adj AB0 or adj AB=0.Let Cij be the co-factors of the elements aij in Aaij. Then,C11=-11+11-1-22 =0, C12=-11+22-1-12 =-3, C13=-11+321-1-2=-3C21=-12+1-11-22 =0, C22=-12+2 11-12 =3, C23=-12+31-1-1-2=3C31=-13+1-111-1 =0, C32=-13+2112-1 =3 , C33=-13+31-121=3adj A=0-3-3033033T = 000-333-333adj AB= 000-333-333321 =0-9+6+3-9+6+3 =000If A=0 and adj AB=0, then the system is consistent and has infinitely many solutions.Thus, AX=B has infinitely many solutions. Substituting z=k in eq. 1 and eq. 2, we getx-y=3-k and 2x+y=2+k1-121xy=3-k2+kNow,A=1-121 =1+2=3 0adj A=12-11A-1=1Aadj A =1311-21X=A-1Bxy=1311-213-k2+kxy=133-k+2+k-6+2k+2+kxy=533k-43 x=53, y=3k-43 and z=kThese values of x, y and z also satisfy the third equation.Thus, x= 53, y= 3k-43and z=k where k is a real number satisfy the given system of equations.


(v) Here,x+y+z=6 ...(1)x+2y+3z=14 ...(2)x+4y+7z=30 ...(3)or, AX=B where, A=111123147, X=xyz and B=61430111123147xyz=61430 A =111123147 =114-12-17-3+1(4-2) =2-4+2 =0So, A is singular. Thus, the given system of equations is either inconsistent or it is consistent with infinitely many solutions because adj AB0 or adj A=0.Let Cij be the co-factors of the elements aij in Aaij. Then,C11=-11+12347 =2, C12=-11+21317 =-4 , C13=-11+31214=2C21=-12+11147 =-3, C22=-12+2 1117 =6, C23=-12+31114=-3C31=-13+11123 =1 , C32=-13+21113 =-2 , C33=-13+31112=1adj A=2-42-36-31-21T = 2-31-46-22-31adj AB= 2-31-46-22-3161430 =12-42+30-24+84-6012-42+30 =000IfA=0 and adjAB=0, then the system is consistent and has infinitely many solutions.Thus, AX=B has infinitely many solutions. Substituting z=k in eq. (1) and eq. (2), we get x+y=6-k and x+2y=14-3k1112xy=6-k14+3kNow,A=1112 =2-1=1 0adj A=2-1-11A-1=1Aadj A =112-1-11X=A-1Bxy=112-1-116-k14-3kxy=1112-2k-14+3k-6+k+14-3kxy=k-218-2k1 x=k-2, y=8-2k and z=kThese values of x, y and z also satisfy the third equation.Thus, x=k-2, y=8-2k and z=k where k is a real number satisfy the given system of equations.


(vi) Here,2x+2y-2z=1 ...(1) 4x+4y-z=2 ...(2) 6x+6y+2z=3 ...(3) or, AX=Bwhere,A=22-244-1662, X=xyz and B=12322-244-1662xyz=123 A =22-244-1662 =28+6-28+6-2(24-24) =28-28-0 =0So, A is singular. Thus, the system of equations is either inconsistent or it is consistent withinfinitely many solutions because adj AB0 or adj AB=0.Let Cij be the co-factors of the elements aij in Aaij. Then,C11=-11+14-162 =14, C12=-11+24-162 =-14, C13=-11+34466=0C21=-12+12-262 =-16, C22=-12+2 2-262 =16, C23=-12+32266=0C31=-13+12-24-1 =6, C32=-13+22-24-1 =-6, C33=-13+32244=0adj A=14-140-161606-60T = 14-166-1416-6000adj AB= 14-166-1416-6000123 =14-32+18-14+32-180 =000IfA=0 and adjAB=0, then the system is consistent and has infinitely many solutions.Thus, AX=B has infinitely many solutions. Substituting y=k in eq. (1) and eq. (2), we get 2x-2z=1-2k and 4x-z=2-4k2-24-1xz=1-2k2-4kNow,A=2-24-1 =-2+8=6 0adj A=-12-42A-1=1Aadj A=16-12-42X=A-1Bxz=16-12-421-2k2-4kxz=16-1+2k+4-8k-4+8k+4-8kxz=3-6k60 x=1-2k2, y=kand z=0 These values of x, y and z satisfy the third equation.Thus, x=1-2k2, y=k and z=0 where k is real number satisfy the given system of equations.

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