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Standard XII
Mathematics
Question
If
p
≠
a
,
q
≠
b
,
r
≠
c
and
∣
∣ ∣
∣
p
b
c
a
q
c
a
b
r
∣
∣ ∣
∣
=
0
then show that
p
p
−
a
+
q
q
−
b
+
r
r
−
c
=
−
2
.
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Solution
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3
Similar Questions
Q1
If
a
≠
p
,
b
≠
q
,
c
≠
r
and
∣
∣ ∣
∣
p
b
c
a
q
c
a
b
r
∣
∣ ∣
∣
=
0
then find the value of
p
p
−
a
+
q
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−
b
+
r
r
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c
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Q2
If
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q
,
c
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r
and
∣
∣ ∣
∣
p
b
c
a
q
c
a
b
r
∣
∣ ∣
∣
=
0
,
then find the value of
p
p
−
a
+
q
q
−
b
+
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Q3
If
a
≠
p
,
b
≠
q
,
c
≠
r
and
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∣ ∣
∣
p
b
c
a
q
c
a
b
r
∣
∣ ∣
∣
= 0 then the value of
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p
−
a
+
q
q
−
b
+
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r
−
c
is equal to
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Q4
If
∣
∣ ∣
∣
p
b
c
a
q
c
a
b
r
∣
∣ ∣
∣
=
0
find the value of
p
p
−
a
+
q
q
−
b
+
r
r
−
c
and
(
p
≠
a
,
q
≠
b
,
r
≠
c
)
.
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Q5
If
p
a
=
q
b
=
r
c
=
s
d
and
p
,
q
,
r
,
s
are in G.P. , then
a
,
b
,
c
,
d
are in
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