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If (α,β) and (γ,φ) are roots of the equations x^2 px-r =0 and x^2 px r=0 respectively. Prove that A) (α-γ)(α-φ)= (β -γ)(β-φ) B)(γ-α)(γ-β)=(φ-α)(φ-β)? for Class 11 2024 is part of Class 11 preparation. The Question and answers have been prepared according to the Class 11 exam syllabus. Information about If (α,β) and (γ,φ) are roots of the equations x^2 px-r =0 and x^2 px r=0 respectively. Prove that A) (α-γ)(α-φ)= (β -γ)(β-φ) B)(γ-α)(γ-β)=(φ-α)(φ-β)? covers all topics & solutions for Class 11 2024 Exam. Find important definitions, questions, meanings, examples, exercises and tests below for If (α,β) and (γ,φ) are roots of the equations x^2 px-r =0 and x^2 px r=0 respectively. Prove that A) (α-γ)(α-φ)= (β -γ)(β-φ) B)(γ-α)(γ-β)=(φ-α)(φ-β)?.

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