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Question
For the polynomial equation
(x+q)(x+r)(q−p)(r−p)+(x+r)(x+p)(r−q)(p−q)+(x+p)(x+q)(p−r)(q−r)−1=0, where p,q,r are distinct real numbers.
Which of the following statement is correct?
For the polynomial equation
(x+q)(x+r)(q−p)(r−p)+(x+r)(x+p)(r−q)(p−q)+(x+p)(x+q)(p−r)(q−r)−1=0, where p,q,r are distinct real numbers.
Which of the following statement is correct?
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Solution
The correct option is D It has more than 2 real roots.
(x+q)(x+r)(q−p)(r−p)+(x+r)(x+p)(r−q)(p−q)+(x+p)(x+q)(p−r)(q−r)−1=0
Putting x=−q
(−q+r)(−q+p)(r−q)(p−q)−1=0⇒1−1=0
Similarly,
x=−r,−p are also the roots of the polynomial.
Therefore, the given equation is an identity, so it has more than 2 roots.
(x+q)(x+r)(q−p)(r−p)+(x+r)(x+p)(r−q)(p−q)+(x+p)(x+q)(p−r)(q−r)−1=0
Putting x=−q
(−q+r)(−q+p)(r−q)(p−q)−1=0⇒1−1=0
Similarly,
x=−r,−p are also the roots of the polynomial.
Therefore, the given equation is an identity, so it has more than 2 roots.
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