How do you simplify $i^6(2i-i^2-3i^3)$ ?

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How do you simplify $i^6(2i-i^2-3i^3)$ ?

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Answer 1 · 2018-03-12T10:24:39

The answer is -1-5i

Explanation:

First we factorize powers of i.So $i^6$ would become -1. $3i^3$ would become -3i and $i^2$ would become -1.By putting values
$-1(2i-(-1)+3i)$ . Now $-1(2i+3i+1)$ would become $-1(5i+1)$ and then $-5i-1$
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Answer 2 · 2018-03-12T10:26:28

See details below

Explanation:

Expand expresion.

$i^6(2i-i^2-3i^3)=2i^7-i^8-3i^9$

But we know that:

$i^1=i$
$i^2=-1$ (by definition)
$i^3=i^2·i=-i$
$i^4=i^2·i^2=(-1)·(-1)=1$
$i^5=i^4·i=1·i=i$ and starts again
$i^6=i^5·i=i·i=i^2=-1$
$i^7=i^6·i=-i$

for this cliclic result, we can write:

$i^6(2i-i^2-3i^3)=2i^7-i^8-3i^9=-2i-1-3i=-1-5i$

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How do you simplify $i^6(2i-i^2-3i^3)$ ?

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How do you simplify i^6(2i-i^2-3i^3) i^6(2i-i^2-3i^3) ?

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How do you simplify $i^6(2i-i^2-3i^3)$ ?