How do you divide $(-2x^4+x^2+8x-7)/(5x-2)$ ?

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How do you divide $(-2x^4+x^2+8x-7)/(5x-2)$ ?

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Answer 1 · 2017-10-11T13:10:00

$-(2x^3)/5-(4x^2)/25+(17x)/125+1034/625, r=-2307/625$

Explanation:

$" "-(2x^3)/5-(4x^2)/25+(17x)/125+1034/625, r=-2307/625$
$5x-2|-2x^4+0x^3" "+x^2" "+8x-7$
$" "- -2x^4+(4x^3)/5$
$" "0-(4x^3)/5$
$" "- -(4x^3)/5+(8x^2)/25$
$" "0+(17x^2)/25$
$" "-(17x^2)/25-(34x)/125$
$" "0+(1034x)/125$
$" "-(1034x)/125-2068/625$
$" "0-2307/625$

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How do you divide $(-2x^4+x^2+8x-7)/(5x-2)$ ?

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How do you divide (-2x^4+x^2+8x-7)/(5x-2)(-2x^4+x^2+8x-7)/(5x-2)?

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Explanation:

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How do you divide $(-2x^4+x^2+8x-7)/(5x-2)$ ?