Question 2
For which value(s) of k will the pair of equations
kx + 3y = k – 3,
12x + ky = k
has no solution?

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Solution

Given pair of linear equations is
$k x + 3 y = k - 3$ and $12 x + k y = k$

On comparing with $a_{1} x + b_{1} y + c_{1} = 0$ and $a_{2} x + b_{2} y + c_{2} = 0$ , we get

$a_{1} = k, b_{1} = 3 a n d c_{1} = - (k - 3) a_{2} = 12, b_{2} = k a n d c_{2} = - k$

For the pair of linear equations to have no solution,

$\frac{a_{1}}{a_{2}} = \frac{b_{1}}{b_{2}} \neq \frac{c_{1}}{c_{2}}$

$\Rightarrow \frac{k}{12} = \frac{3}{k} \neq \frac{- (k - 3)}{- k}$

Now,
$\frac{k}{12} = \frac{3}{k}$

$\Rightarrow k^{2} = 36 \Rightarrow k = \pm 6$

And,

$\frac{3}{k} \neq \frac{k - 3}{k} \Rightarrow 3 k \neq k (k - 3) \Rightarrow 3 k - k (k - 3) \neq 0 \Rightarrow k (3 - k + 3) \neq 0 \Rightarrow k \neq 0 a n d k \neq 6$
Hence, required value of k for which the given pair of linear equations has no solutions is – 6.

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Similar questions

k x + 3 y = k - 3 12 x + k y = k

k x + 3 y = k - 3; 12 x + k y = k

Find the value of k for which each of the following systems of equations has no solution:

$k x + 3 y = 3, 12 x + k y = 6.$

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