How do you find the real solutions of the polynomial $2 x^{3} = 19 x^{2} - 49 x + 20$ $2x^3=19x^2-49x+20$ ?

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How do you find the real solutions of the polynomial $2 x^{3} = 19 x^{2} - 49 x + 20$ $2x^3=19x^2-49x+20$ ?

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Answer 1 · 2017-02-20T22:52:49

The roots are $\frac{1}{2}$ $1/2$ , $5$ $5$ and $4$ $4$ .

Explanation:

Given:

$2 x^{3} = 19 x^{2} - 49 x + 20$ $2x^3=19x^2-49x+20$

Subtract the right hand side from the left to get the standard form:

$2 x^{3} - 19 x^{2} + 49 x - 20 = 0$ $2x^3-19x^2+49x-20 = 0$

By the rational root theorem, any rational zeros of this cubic are expressible in the form $\frac{p}{q}$ $p/q$ for integers $p, q$ $p, q$ with $p$ $p$ a divisor of the constant term $- 20$ $-20$ and $q$ $q$ a divisor of the coefficient $2$ $2$ of the leading term.

That means that the only possible rational roots are:

$\pm \frac{1}{2}, \pm 1, \pm 2, \pm \frac{5}{2}, \pm 4, \pm 5, \pm 10, \pm 20$ $+-1/2, +-1, +-2, +-5/2, +-4, +-5, +-10, +-20$

We find that $x = \frac{1}{2}$ $x = 1/2$ is a zero...

$2 {(\frac{1}{2})}^{3} - 19 {(\frac{1}{2})}^{2} - 49 (\frac{1}{2}) + 20 = \frac{1 - 19 - 98 + 80}{4} = 0$ $2(color(blue)(1/2))^3-19(color(blue)(1/2))^2-49(color(blue)(1/2))+20 = (1-19-98+80)/4 = 0$

Hence $(2 x - 1)$ $(2x-1)$ is a factor:

$2 x^{3} - 19 x^{2} + 49 x - 20 = (2 x - 1) (x^{2} - 9 x + 20)$ $2x^3-19x^2+49x-20 = (2x-1)(x^2-9x+20)$

To factor the remaining quadratic, find a pair of factors of $20$ $20$ with sum $9$ $9$ . The pair $5, 4$ $5, 4$ works and hence:

$x^{2} - 9 x + 20 = (x - 5) (x - 4)$ $x^2-9x+20 = (x-5)(x-4)$

So the other two roots are $x = 5$ $x=5$ and $x = 4$ $x=4$ .

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How do you find the real solutions of the polynomial $2 x^{3} = 19 x^{2} - 49 x + 20$ $2x^3=19x^2-49x+20$ ?

1 Answer

Explanation:

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How do you find the real solutions of the polynomial 2x3=19x2−49x+202x^3=19x^2-49x+20?

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Explanation:

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How do you find the real solutions of the polynomial $2 x^{3} = 19 x^{2} - 49 x + 20$ $2x^3=19x^2-49x+20$ ?