Vertical Asymptotes of x^3/(x^2+3x-10): -5 & 2

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The discussion focuses on finding the vertical asymptotes of the function x^3/(x^2+3x-10), identified as -5 and 2. The user is confused about the behavior of the function as x approaches -5 from both sides, specifically the limits approaching positive and negative infinity. It is clarified that as x approaches -5 from the right, the limit is positive infinity, while from the left, the limit is negative infinity due to the signs of the factors in the function. Understanding the signs of the factors and analyzing the graph can help determine the behavior near the asymptotes. The conversation emphasizes the importance of limits and sign analysis in calculus.
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Help!
My problem asks to find the vertical asymptotes of x^3/(x^2+3x-10)

I found –5 & 2 to be vertical asymptotes but what I can’t figure out is
how as x->-5- = -oo and x->-5+ = +oo

I have calculated lim x->-5+ x^3/(x^2+3x-10) = -125/(0)(-5 - -2) = -125/-0 = +oo

But I don’t see –oo lim x->+5+ x^3/(x^2+3x-10) = ?

Can you show me the algebra and how the signs work out to give me –oo

Thanks
 
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Maybe?

I think i have it ...

lim x-> -5+ x^3/(x^2+3x-10) = +oo since x^3/(x+5)(x-2) > 0 for x > -5

and lim x->-5- x^3/(x^2+3x-10) = -oo since x^3/(x+5)(x-2) < 0 for x < -5
 
Didn't look at the actual math, but that's the general idea. You can nomrally if it's going to approach an infinity, then look at the signs to tell whether it would be positive or negative.
 
Looking at the graph is always (almost) helpful.
 
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