dawoodr Posted November 2, 2013 Posted November 2, 2013 Hello!Well as the titel says, I need help with a math problem I can't get a grip of. I have thought of this problem for around 1-2 hours and just can't understand it.Some tips: Use derivateFor which numbers on a doesn't the curve (y = x ^ 3 + ax ^ 2 + x) has any extreme points?The answer to this question is -√3 < a < +√3 Regards!
studiot Posted November 2, 2013 Posted November 2, 2013 Hello dawoodr, I see you are a new member. The forum has a special homework section where you should have posted this homework question, along with your attempt at solution. Since the hint suggests the derivative, what is the derivative and in particular what sort of polynomial is it? What is the condition that the derivative must satisfy at an extreme point?
dawoodr Posted November 2, 2013 Author Posted November 2, 2013 (edited) This is no homework, it's just a math problem I am having a hard time with. Edited November 2, 2013 by dawoodr
studiot Posted November 2, 2013 Posted November 2, 2013 (edited) OK so you have an amateur interest in maths. That's good. The derivative is [math]\frac{{dy}}{{dx}} = 3{x^2} + 2ax + 1[/math] How about telling us if you understand this and know what its relationship to extreme points is.. I can't help you if you don't help me understand what you already know. This is a use of calculus question. Edited November 2, 2013 by studiot
dawoodr Posted November 3, 2013 Author Posted November 3, 2013 (edited) Yes I can show you my solving: [math]\frac{{dy}}{{dx}} = 0[/math] [math]\frac{{dy}}{{dx}} = 3{x^2} + 2ax + 1[/math] [math] 3{x^2} + 2ax + 1 = 0[/math] [math]x = -a/3 +- sqrt({(a/3)^2} - 1/3)[/math] What am I suposed to do now? I know that [math] 3{x^2} + 2ax + 1 = 0[/math] should give you [math]x = "a number" +- sqrt(a negativ number)[/math] Edited November 3, 2013 by dawoodr
studiot Posted November 3, 2013 Posted November 3, 2013 You obviously realize that the derivative is a quadratic (in x) The formulae for the two roots of a quadratic equation are (I have used p, q, and r for the constants to avoid confusion with your equation) [math]p{x^2} + qx + r = 0[/math] [math]x = \frac{{ - q + \sqrt {{q^2} - 4pr} }}{{2p}}[/math] [math]x = \frac{{ - q - \sqrt {{q^2} - 4pr} }}{{2p}}[/math] However you do not want these. What you need is the square root part [math]{\sqrt {{q^2} - 4pr} }[/math]This is called the discriminant. Since you cannot take a square root of a negative number (q2 - 4pr ) must be greater than or equal to zero q2 > 4pr Or in the range where q2 < 4pr The quadratic has no solution. Since the quadratic has no solution in this range. there are no extreme points in this range. Can you substitute values from your equation for p. q and r to calculate this range now? It is an easy couple of lines that leads directly to the correct solution.
dawoodr Posted November 3, 2013 Author Posted November 3, 2013 (edited) From this I got it to: [math]{(a/3)^2} - 1/3 < 0[/math] [math]a < +-\sqrt{3}[/math] What now? It can't be smaller than both [math]-\sqrt{3}[/math] and [math]+\sqrt{3}[/math] Edited November 3, 2013 by dawoodr
studiot Posted November 3, 2013 Posted November 3, 2013 (edited) Yes, but once again you do not need to solve the quadratic equation. Just consider the discriminant. My apologies I said the discrinimant was the square root bit, it is only the expression under the root sign (q2 - 4pr ) and does not include the sign itself. (q2 - 4pr ) > 0 q2 > 4pr with p = 3, q = 2a and r = 1 4a2 > 4.3.1 > 12 a2 > 3 For there to be a solution of the quadratic. So there is no solution when a2 < 3 [math] - \sqrt 3 [/math][math] < a < [/math][math]\sqrt 3 [/math] The last line in your post 7 is not quite correct since a can be positive or negative, but both have the same value of a2. What I have shown above is the correct deduction from the statement that a2 < some number Edited November 3, 2013 by studiot
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