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प्रश्न
Find the value of k for which each of the following system of equations has infinitely many solutions :
2x + (k - 2)y = k
6x + (2k - 1)y - (2k + 5)
उत्तर
The given system of the equation may be written as
2x + (k - 2)y - k = 0
6x + (2k - 1)y - (2k + 5) = 0
The system of equation is of the form
`a_1x + b_1y + c_1 = 0`
`a_2x + b_2y + c_2 = 0`
Where `a_1 = 2, b_1 = k - 2, c_1 = -k`
And `a_2 = 6, b_2 = 2k - 1, c_2 = -(2k + 5)`
For a unique solution, we must have
`a_1/a_2 = b_1/b_2 = c_1/c_2`
`=> 2/6 = (k -2)/(2k - 1) = (-k)/(-2(2k + 5))`
`=> 2/6 = (k -2)/(2k - 1) and (k - 2)/(2k -1) = k/(2k + 5)`
`=> 1/3 = (k -2)/(2k -1) and (k -2)(2k + 5) = k(2k - 1)`
`=> 2k - 1 = 3(k - 2) and 2k^2 + 5k - 4k - 10 = 2k^2 - k`
=> 2k - 3k - 6 and k - 10 = -k
=> 2k - 3k = -6 + 1 and k + k = 10
=> -k = -5 and 2k = 10
`=> k = (-5)/(-1) and k = 10/2`
`=> k = 5 and k = 5`
K = 5 satisfies both the conditions
Hence, the given system of equations will have infinitely many solutions, if k = 5
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