Question

for what value of k the pair of linear equations 2x + Y + 3 is equals to zero and 4 x + 2 Y + K is equals to zero represent for coincident lines
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Answer 1

Answer:

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Step-by-step explanation:

For when two lines are termed as the coincident lines we can say that the ratio of the co-efficient of the lines are equal. i.e. We can say on applying the condition, we get, Therefore, the required value of 'k' is 4

Answer 2

The given equations are of the form

a

1

x+b

1

y+c

1

=0

and a

2

x+b

2

y+c

2

=0

where a

1

=1,b

1

=2,c

1

=7

and a

2

=2,b

2

=k,c

2

=14

The given equations will represent coincident lines if they have infinitely many solutions.

The condition for which is

a

2

a

1

=

b

2

b

1

=

c

2

c

1

⇒

2

1

=

k

2

=

14

7

⇒k=4

Hence, the given system of equations will represent coincident lines, if k=4.