How do you solve $3 x^{4} + 11 x^{3} = 4 x^{2}$ $3x^4+11x^3=4x^2$ ?

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How do you solve $3 x^{4} + 11 x^{3} = 4 x^{2}$ $3x^4+11x^3=4x^2$ ?

2 Answers

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Answer 1 · 2016-03-27T09:39:11

$:. x=0,0,1/3,-4$

Explanation:

$x^2(3x^2+11x-4)=0$
$=x^2(3x^2+12x-x-4)=0$
$=x^2(3x(x+4)-1(x+4)=0$
$=x^2(3x-1)(x+4)=0$
$:. x=0,0,1/3,-4$

Answer 2 · 2016-03-27T09:43:46

$x=0$ or $x=1/3$ or $x=-4$

Explanation:

We have $3x^4+11x^3=4x^2$ and now let us bring the monomial to LHS, which gives us

$3x^4+11x^3-4x^2=0$ and now taking #x^2 common this becomes

$x^2(3x^2+11x-4)=0$

Now let us factorize $3x^2+11x-4$ , for which we have to identify two numbes whose sum is $+11$ and product is $3xx(-4)=-12$ . Clearly these are $+12$ and $-1$ and splitting middle term, we get

$x^2(3x^2+12x-x-4)=0$ or

$x^2(3x(x+4)-1*(x+4))=0$ or

$x^2(3x-1)(x+4)=0$

Hence, either $x=0$ or $3x-1=0$ or $x+4=0$

i.e. $x=0$ or $x=1/3$ or $x=-4$

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How do you solve $3 x^{4} + 11 x^{3} = 4 x^{2}$ $3x^4+11x^3=4x^2$ ?

2 Answers

Explanation:

Explanation:

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