How do you find the complex roots of $t^4-1=0$ ?

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How do you find the complex roots of $t^4-1=0$ ?

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Answer 1 · 2017-01-07T01:12:12

$t^4-1=0$ has roots $+-1$ and $+-i$

In a sense these are all complex roots, but $+-i$ particularly so, in that they are not Real roots.

Explanation:

The difference of squares identity can be written:

$a^2-b^2 = (a-b)(a+b)$

We find:

$0 = t^4-1$

$color(white)(0) = (t^2)^2 - 1^2$

$color(white)(0) = (t^2 - 1)(t^2 + 1)$

$color(white)(0) = (t^2 - 1^2)(t^2 - i^2)$

$color(white)(0) = (t - 1)(t+1)(t- i)(t+i)$

Hence $t = +-1$ or $t = +-i$

The roots $+-i$ are non-Real Complex roots.

The roots $+-1$ are Real roots. Since Real numbers are a subset of Complex numbers, $+-1$ are also Complex roots.

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How do you find the complex roots of $t^4-1=0$ ?

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How do you find the complex roots of t^4-1=0t^4-1=0?

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How do you find the complex roots of $t^4-1=0$ ?