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Byju's Answer
Standard XII
Mathematics
Minor
Consider the ...
Question
Consider the determinant
Δ
=
∣
∣ ∣
∣
a
1
a
2
a
3
b
1
b
2
b
3
c
1
c
2
c
3
∣
∣ ∣
∣
M
i
j
=
Minor of the element of
i
t
h
row &
j
t
h
column.
C
i
j
=
Cofactor of element of
i
t
h
row &
j
t
h
column.
a
2
.
C
12
+
b
2
.
C
22
+
c
2
.
C
32
is equal to
A
0
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B
Δ
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C
2
Δ
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D
Δ
2
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Solution
The correct option is
C
Δ
The value of
a
2
.
C
12
+
b
2
.
C
22
+
C
2
.
C
32
=
a
2
(
−
1
)
1
+
2
∣
∣
∣
b
1
b
3
c
1
c
3
∣
∣
∣
+
b
2
.
(
−
1
)
2
+
2
∣
∣
∣
a
1
a
3
c
1
a
3
∣
∣
∣
+
c
2
.
(
−
1
)
3
+
2
∣
∣
∣
a
1
a
3
b
1
b
3
∣
∣
∣
=
−
a
2
∣
∣
∣
b
1
b
3
c
1
c
3
∣
∣
∣
+
b
2
∣
∣
∣
a
1
a
3
c
1
a
3
∣
∣
∣
−
c
2
∣
∣
∣
a
1
a
3
b
1
b
3
∣
∣
∣
Is same as expansion of
△
along
C
2
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1
Similar questions
Q.
Consider the determinant
Δ
=
∣
∣ ∣
∣
a
1
a
2
a
3
b
1
b
2
b
3
c
1
c
2
c
3
∣
∣ ∣
∣
M
i
j
=
Minor of the element of
i
t
h
row &
j
t
h
column.
C
i
j
=
Cofactor of element of
i
t
h
row &
j
t
h
column.
Value of
b
1
.
C
31
+
b
2
.
C
32
+
b
3
.
C
33
is
Q.
Consider the determinant
Δ
=
∣
∣ ∣
∣
a
1
a
2
a
3
b
1
b
2
b
3
c
1
c
2
c
3
∣
∣ ∣
∣
M
i
j
=
Minor of the element of
i
t
h
row &
j
t
h
column.
C
i
j
=
Cofactor of element of
i
t
h
row &
j
t
h
column.
a
3
M
13
−
b
3
M
23
+
c
3
M
33
is equal to
Q.
Consider the determinant
Δ
=
∣
∣ ∣
∣
a
1
a
2
a
3
b
1
b
2
b
3
c
1
c
2
c
3
∣
∣ ∣
∣
M
i
j
=
Minor of the element of
i
t
h
row &
j
t
h
column.
C
i
j
=
Cofactor of element of
i
t
h
row &
j
t
h
column.
If all the elements of the determinant are multiplied by 2, then the value of new determinant is
Q.
If
Δ
=
∣
∣ ∣
∣
a
11
a
12
a
13
a
21
a
22
a
23
a
31
a
32
a
33
∣
∣ ∣
∣
and
c
i
j
=
(
−
1
)
i
+
j
(determinant obtained by deleting ith row and jth column), then
∣
∣ ∣
∣
c
11
c
12
c
13
c
21
c
22
c
23
c
31
c
32
c
33
∣
∣ ∣
∣
=
Δ
2
If
∣
∣ ∣ ∣
∣
1
x
x
2
x
x
2
1
x
2
1
x
∣
∣ ∣ ∣
∣
=
7
and
Δ
=
∣
∣ ∣ ∣
∣
x
3
−
1
0
x
−
x
4
0
x
−
x
4
x
3
−
1
x
−
x
4
x
3
−
1
0
∣
∣ ∣ ∣
∣
, then
Q.
If
[
a
i
j
]
is an element of matrix A then it lies in
of the matrix
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