perplexus.info :: Just Math : 3 Distinct Roots Not

3 Distinct Roots Not (Posted on 2008-03-04)

Prove that the equation

牋爔³ + 2px² + 2p²x + p = 0

cannot have three distinct real roots, for any real number p.

Submitted by Bractals

Rating: 4.0000 (2 votes)

Solution: (Hide)

Assume false.

Let f(x) = x³ + 2px² + 2p²x + p.

Then there exists real numbers x₁, x₂, and x₃ such that
x₁ < x₂ < x₃ and f(x₁) = f(x₂) = f(x₃) = 0
Since f is differentiable everywhere, Rolle's theorem implies there exists real numbers y₁ and y₂ such that
x₁ < y₁ < x₂ < y₂ < x₃ and f'(y₁) = f'(y₂) = 0
But, f '(x) = 3x² + 4px + 2p² and (4p)² - 4(3)(2p²) > 0 is a contradiction.

Comments: ( You must be logged in to post comments.)

Subject	Author	Date
3 distinct solutions	Eigenray	2008-03-07 19:22:53
re: Viete!	K Sengupta	2008-03-05 13:08:07
Viete!	Chesca Ciprian	2008-03-05 07:43:13
solution	Charlie	2008-03-04 11:13:44

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