How do you find the complex roots of $4m^4+17m^2+4=0$ ?

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How do you find the complex roots of $4m^4+17m^2+4=0$ ?

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Answer 1 · 2016-11-26T01:25:35

The roots are:

$m = +-1/2i" "$ and $" "m = +-2i$

Explanation:

$4m^4+17m^2+4 = 0$

Treating this as a quadratic in $m^2$ , we can use an AC method to factor it into quadratics, then use the difference of squares identity with Complex coefficients.

First find a pair of factors of $AC = 4*4 = 16$ with sum $B=17$ .

The pair $16, 1$ works.

Use this pair to split the middle term, then factor by grouping:

$4m^4+17m^2+4 = 4m^4+16m^2+m^2+4$

$color(white)(4m^4+17m^2+4) = (4m^4+16m^2)+(m^2+4)$

$color(white)(4m^4+17m^2+4) = 4m^2(m^2+4)+1(m^2+4)$

$color(white)(4m^4+17m^2+4) = (4m^2+1)(m^2+4)$

$color(white)(4m^4+17m^2+4) = ((2m)^2-i^2)(m^2-(2i)^2)$

$color(white)(4m^4+17m^2+4) = (2m-i)(2m+i)(m-2i)(m+2i)$

Hence zeros:

$m = +-1/2i" "$ and $" "m = +-2i$

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How do you find the complex roots of $4m^4+17m^2+4=0$ ?

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How do you find the complex roots of $4m^4+17m^2+4=0$ ?