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Question
Find the value of k for which the following system of linear equations has an infinite number of solutions:
2x + (k – 2)y = k, 6x + (2k – 1)y = (2k + 5)
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Solution
The given system of equations:
2x + (k – 2)y = k
⇒ 2x + (k – 2)y – k = 0 ...(i)
And 6x + (2k – 1)y = (2k + 5)
⇒ 6x + (2k – 1)y – (2k + 5) = 0 ...(ii)
These equations are of the following form:
a1x + b1y + c1 = 0, a2x + b2y + c2 = 0
where, a1 = 2, b1 = (k – 2), c1 = –k and a2 = 6, b2 = (2k – 1), c2 = –(2k + 5)
For an infinite number of solutions, we must have:
`(a_1)/(a_2) = (b_1)/(b_2) = (c_1)/(c_2)`
`2/6 = ((k - 2))/((2k - 1)) = (-k)/(-(2k + 5))`
⇒ `1/3 = ((k - 2))/((2k - 1)) = k/((2k + 5))`
Now, we have the following three cases:
Case I:
`1/3 = ((k - 2))/((2k - 1))`
⇒ (2k – 1) = 3(k – 2)
⇒ 2k – 1 = 3k – 6
⇒ k = 5
Case II:
`((k - 2))/((2k - 1)) = k/((2k + 5))`
⇒ (k – 2) (2k + 5) = k(2k – 1)
⇒ 2k2 + 5k – 4k – 10 = 2k2 – k
⇒ k + k = 10
⇒ 2k = 10
⇒ k = 5
Case III:
`1/3 = k/((2k + 5))`
⇒ 2k + 5 = 3k
⇒ k = 5
Hence, the given system of equations has an infinite number of solutions when k is equal to 5.
