Solving inequality Please help

Alyad

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Feb 18, 2019
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I really need help solving this inequality
1/(x-2) + (1/3) * x^3 - 1 > 0
Thanks in advance
 
I really need help solving this inequality
1/(x-2) + (1/3) * x^3 - 1 > 0
Thanks in advance

Hello, and welcome to FMH! :)

We are given to solve:

[MATH]\frac{1}{x-2}+\frac{1}{3}x^3-1>0[/MATH]
I would begin by combining all terms on the LHS to get a rational expression from which we may obtain our critical values...can you do this?
 
That is exactly what i have a problem with , the best i got is
(3+(x^3-3)(x-2))(x-2)>0
but im not sure if this is any good. Thanks for replying quickly. :)
 
That is exactly what i have a problem with , the best i got is
(3+(x^3-3)(x-2))(x-2)>0
but im not sure if this is any good. Thanks for replying quickly. :)

What I get is:

[MATH]\frac{1(3)+x^3(x-2)-1(3)(x-2)}{3(x-2)}>0[/MATH]
And this reduces to:

[MATH]\frac{x^4-2x^3-3x+9}{3(x-2)}>0[/MATH]
Now, do you find any real roots in the numerator?
 
I'm sorry this is a little complicated for me. Could you explain how to do this , because I don't know do i get delta out of this?
(x^2)^2-x((2x^2)-3)+3^3
 
I don't think you're going to be able to express the numerator as a quadratic in \(x^2\)...have you studied differential calculus?
 
I am now, im supposed to find extrema of
f(x)=ln|x-2|+1/12x^4 -x+3
I don't speak english that well, can you just explain how to do this so i can try it on my own?
 
I am now, im supposed to find extrema of
f(x)=ln|x-2|+1/12x^4 -x+3
I don't speak english that well, can you just explain how to do this so i can try it on my own?

Okay, now that I know what level you're at, I would advise you to find the extrema of our numerator. Equate its first derivative to zero, and using Descartes' Rule of Signs, how many real roots are there?
 
I would say the sign changes 2 times so it has 2 or 1 real roots ? I don''t think i''ve ever used this method before.
 
We have:

[MATH]\frac{d}{dx}\left(x^4-2x^3-3x+9\right)=4x^3-6x^2-3[/MATH]
There is only 1 sign change, so this means there will be one real root. To determine this one real root, I would use a numeric root finding technique to get an approximation. Are you familiar with the Newton-Raphson method? Depending on your professor, you may simply be allowed to use a CAS (computer algebra system) like WolframAlpha to approximate the root. What do you find?
 
There cannot be only one real root in an quartic equation. It appears to me that there are zero real roots and 4 imaginary roots.
 
We are finding the root of the derivative of the quartic, which is a cubic. :)
 
We are finding the root of the derivative of the quartic, which is a cubic. :)
Normally, one would try to factor or find the 4 roots of the numerator to see if there are additional critical points, in addition to the critical point in the denominator.

Since all 4 roots are imaginary, this leaves only a critical point with the denominator.
 
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If a max and min are also required, setting first derivative to zero will yield maxima or minima.
 
We have:

[MATH]\frac{d}{dx}\left(x^4-2x^3-3x+9\right)=4x^3-6x^2-3[/MATH]
There is only 1 sign change, so this means there will be one real root. To determine this one real root, I would use a numeric root finding technique to get an approximation. Are you familiar with the Newton-Raphson method? Depending on your professor, you may simply be allowed to use a CAS (computer algebra system) like WolframAlpha to approximate the root. What do you find?

Using W|A, I find the one real root is approximately:

[MATH]x\approx1.74601665058591[/MATH]
Now, if we define:

[MATH]f(x)=x^4-2x^3-3x+9[/MATH]
We find:

[MATH]f(1.74601665058591)=2.41003192808928105>0[/MATH]
Since [MATH]\lim_{x\to\pm\infty}f(x)=+\infty[/MATH]
We may conclude:

[MATH]f_{\min}\approx2.41003192808928105[/MATH]
Thus \(f(x)\) has no real roots, and is positive over its entire domain. And so we revisit:

[MATH]\frac{x^4-2x^3-3x+9}{3(x-2)}>0[/MATH]
The expression on the LHS will thus have the same sign as:

[MATH]x-2[/MATH]
which means the solution for the inequality is:

[MATH]x-2>0[/MATH]
or:

[MATH]x>2[/MATH]
as you found. But you stated you were trying to find the extrema of:

[MATH]g(x)=\ln|x-2|+\frac{1}{12}x^4-x+3[/MATH]
And what we want is critical values, that is values of \(x\) such that \(g'(x)=0\), we as we now know, there are none. This means there are no local extrema, and we must examine the behavior of the function at the boundaries of its domain. Can you give the domain?
 
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