How do you find the asympototes for y = (-8x^3 - 2x + 12)/( 7x^5 + 9x + 12)y=8x32x+127x5+9x+12?

1 Answer
George C.
Jul 28, 2015

The horizontal asymptote is y = 0y=0.

There is a vertical asymptote x=ax=a, where a ~= -0.89261052a0.89261052 is the only real root of 7x^5+9x+12 = 07x5+9x+12=0.

Explanation:

Since the degree of the denominator is greater than the numerator, we find y->0y0 as x->+-oox±. So y=0y=0 is a horizontal asymptote.

-8x^3-2x+12 = 08x32x+12=0 has a single real root at x ~= 1.0720202x1.0720202

7x^5+9x+12 = 07x5+9x+12=0 has a single real root at x ~= -0.89261052x0.89261052

In general, the roots of quintics cannot be expressed in terms of ordinary radicals. In this particular case, the quintic is almost in Bring-Jerrard normal form, so it's relatively easy (believe me) to express the root in terms of the Bring Radical:

Let x_1 = (7/9)^(1/4)xx1=(79)14x

Then:

0 = 7x^5+9x+120=7x5+9x+12

=7((9/7)^(1/4)x_1)^5+9(9/7)^(1/4)x^1+12=7((97)14x1)5+9(97)14x1+12

=9(9/7)^(1/4)x_1^5+9(9/7)^(1/4)x_1+12=9(97)14x51+9(97)14x1+12

Divide through by 9(9/7)^(1/4)9(97)14 to get:

x_1^5+x_1+4/3(7/9)^(1/4) = 0x51+x1+43(79)14=0

So x_1 = BR(4/3(7/9)^(1/4))x1=BR(43(79)14)

and x = (9/7)^(1/4)*x_1 = (9/7)^(1/4)BR(4/3(7/9)^(1/4))x=(97)14x1=(97)14BR(43(79)14)

See: https://en.wikipedia.org/wiki/Bring_radical

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