Higher Engineering Mathematics

THE THEORY OF MATRICES AND DETERMINANTS 269

F

Problem 5. IfA=

(

23

1 − 4

)

andB=

(

− 57

− 34

)

findA×B.

LetA×B=CwhereC=

(

C 11 C 12

C 21 C 22

)

C 11 is the sum of the products of the first row ele-
ments ofAand the first column elements ofBtaken
one at a time,

i.e. C 11 =(2×(−5))+(3×(−3))=− 19

C 12 is the sum of the products of the first row ele-
ments ofAand the second column elements ofB,
taken one at a time,

i.e. C 12 =(2×7)+(3×4)= 26

C 21 is the sum of the products of the second row
elements ofAand the first column elements ofB,
taken one at a time,

i.e. C 21 =(1×(−5))+(− 4 ×(−3))= 7

Finally,C 22 is the sum of the products of the second
row elements ofAand the second column elements
ofB, taken one at a time,

i.e. C 22 =(1×7)+((−4)×4)=− 9

Thus,A×B=

(

− 19 26

7 − 9

)

Problem 6. Simplify

(

340

− 26 − 3

7 − 41

)

×

(

2

5

− 1

)

The sum of the products of the elements of each
row of the first matrix and the elements of the second
matrix, (called acolumn matrix), are taken one at a
time. Thus:
(
340
− 26 − 3
7 − 41

)

×

(

2

5

− 1

)

=

(

(3×2) +(4×5) +(0×(−1))

(− 2 ×2)+(6×5) +(− 3 ×(−1))

(7×2) +(− 4 ×5)+(1×(−1))

)

=

(

26

29

− 7

)

Problem 7. IfA=

(

340

− 26 − 3

7 − 41

)

and

B=

(

2 − 5

5 − 6

− 1 − 7

)

, findA×B.

The sum of the products of the elements of each row

of the first matrix and the elements of each column of

the second matrix are taken one at a time. Thus:

(

340

− 26 − 3

7 − 41

)

×

(

2 − 5

5 − 6

− 1 − 7

)

=

⎛ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎝

[(3×2) [(3×(−5))

+(4×5) +(4×(−6))

+(0×(−1))] +(0×(−7))]

[(− 2 ×2) [(− 2 ×(−5))

+(6×5) +(6×(−6))

+(− 3 ×(−1))] +(− 3 ×(−7))]

[(7×2) [(7×(−5))

+(− 4 ×5) +(− 4 ×(−6))

+(1×(−1))] +(1×(−7))]

⎞ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎠ =

(

26 − 39

29 − 5

− 7 − 18

)

Problem 8. Determine

(

103

212

131

)

×

(

220

132

320

)

The sum of the products of the elements of each row

of the first matrix and the elements of each column of

the second matrix are taken one at a time. Thus:

(

103

212

131

)

×

(

220

132

320

)

=

⎛ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎜ ⎝

[(1×2) [(1×2) [(1×0)

+(0×1) +(0×3) +(0×2)

+(3×3)] +(3×2)] +(3×0)]

[(2×2) [(2×2) [(2×0)

+(1×1) +(1×3) +(1×2)

+(2×3)] +(2×2)] +(2×0)]

[(1×2) [(1×2) [(1×0)

+(3×1) +(3×3) +(3×2)

+(1×3)] +(1×2)] +(1×0)]

⎞ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎟ ⎠ =

(

11 8 0

11 11 2

8136

)