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Question
Find the values of p and q for which the following system of linear equations has infinite a number of solutions:
2x - 3y = 9
(p + q)x + (2p - q)y = 3(p + q + 1)
Solution
The given system of equations may be written as
2x - 3y - 9 = 0
(p + q)x + (2p - q)y = 3(p + q + 1) = 0
It is of the form
`a_1x + b_1y + c_1 = 0`
`a_2x + b_2y + c_2 = 0`
Where `a_1 = 2, b_1 = 3, c_1 = -9`
And `a_2 = p + 1, b_2 = 2p - q, c_2 = -3(p + q + 1)`
The given system of equations will have infinite number of solutions, if
`a_1/a_2 - b_1/b_2 = c_1/c_2`
`=> 2/(p + q) = 2/(2p - q) = (-9)/(-3(p + q + 1))`
`=> 2/(p + q) = 3/(2p - q) = 3/(p + q + 1)`
=> 2(2p - q) = 3(p + q) and p + q + 1 = 2p - q
`=> 4p - 2q = 3p + 3q and -2p + p + q + q = -1`
=> p = 5q = 0 and -p + 2q = -1
=> -3q = -1
`=> q = 1/3`
Puttign q = 1/3 in p - 5q we get
`p -5(1/3) = 0`
`=> p = 5/3`
Hence, the given system of equations will have infinitely many solutions,
if p = 5/3 and q = 1/3
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