Assertion(A): On comparing the pair of equations 3x + 2y =5, 2x-3y = 7, we observe that these linear equations are consistent.
Reason (R): The system of linear equations have no solution if b₁ C1 # b₂ az
Both A and R are false
A is True but R is false
Both A and R are true but R is not the correct reason for A
A is false but R is true
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Answered by
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Assertion(A): On comparing the pair of equations 3x + 2y =5, 2x-3y = 7, we observe that these linear equations are consistent.
Reason (R): The system of linear equations have no solution if b₁ C1 # b₂ az
Both A and R are false
A is True but R is false
- Both A and R are true but R is not the correct reason for A
- A is false but R is true
Answered by
1
Step-by-step explanation:
For equations S
1
:
a
2
a
1
=
b
2
b
1
=
c
2
c
1
and hence the pair of lines will be consistent.
If
a
2
a
1
=
b
2
b
1
=
c
2
c
1
, then there will not be any solution and hence the system of equations will be inconsistent
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