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Byju's Answer
Standard XII
Mathematics
Multiplication of Matrices
For each real...
Question
For each real number x such that
−
1
<
x
<
1
,
l
e
t
A
(
x
)
b
e
t
h
e
m
a
t
r
i
x
(
1
−
x
)
−
1
[
1
−
x
−
x
1
]
a
n
d
z
=
x
+
y
1
+
x
y
T
h
e
n
,
A
A
(
z
)
=
A
(
x
)
+
A
(
y
)
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B
A
(
z
)
=
A
(
x
)
+
[
A
(
y
)
]
−
1
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C
A
(
z
)
=
A
(
x
)
A
(
y
)
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D
A
(
z
)
=
A
(
x
)
–
A
(
y
)
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Solution
The correct option is
C
A
(
z
)
=
A
(
x
)
A
(
y
)
A
(
z
)
=
A
(
x
+
y
1
+
x
y
)
=
[
1
+
x
y
(
1
−
x
)
(
1
−
y
)
]
⎡
⎢
⎣
1
−
(
x
+
y
1
+
x
y
)
−
(
x
+
y
1
+
x
y
)
1
⎤
⎥
⎦
∴
A
(
x
)
.
A
(
y
)
=
A
(
z
)
Suggest Corrections
0
Similar questions
Q.
For each real number
x
such that
−
1
<
x
<
1
, let
A
(
x
)
be the matrix
(
1
−
x
)
−
1
/
2
[
1
−
x
−
x
1
]
and
z
=
x
+
y
1
+
x
y
, then
Q.
State True or False.
If x, y are positive real numbers such that x + y = 1, then
(
1
+
1
x
)
(
1
+
1
y
)
⩾
9
.
Q.
If x + y + z = 1 and x, y, z are positive numbers such that
(
1
−
x
)
(
1
−
y
)
(
1
−
z
)
≥
k
x
y
z
, then k =
Q.
Let
a
,
b
,
x
and
y
be real numbers such that
a
−
b
=
1
and
y
≠
0
. If the complex number
z
=
x
+
i
y
satisfies
I
m
(
a
z
+
b
z
+
1
)
=
y
, then which of the following is(are) possible value(s) of
x
?
Q.
Let
a
,
b
,
x
and
y
be real numbers such that
a
−
b
=
1
and
y
≠
0
. If the complex numbers
z
=
x
+
i
y
satisfies Im
(
a
z
+
b
z
+
1
)
=
y
, then
which of the following is possible value of
x
?
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