If the equations x2+ax+12=0,x2+bx+15=0 and x2+(a+b)x+36=0 have a common positive integral root, then the value of a−b is
A
1
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B
−1
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C
15
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D
−15
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Solution
The correct option is A1 Let α be the common root of all the given equation, so α2+aα+12=0⋯(1)α2+bα+15=0⋯(2)α2+(a+b)α+36=0⋯(3) From equation (1) and (2), we get 2α2+(a+b)α+27=0 Using equation (3), α2−9=0 As the common root is positive integer, ⇒α=3 Using equation (1), a=−(α2+12α)⇒a=−(9+123)=−7b=−(α2+15α)⇒b=−(9+153)=−8∴a−b=−7+8=1