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How do you simplify #i^3 (5+i) + 7i#?

1 Answer

Shwetank Mauria

Feb 18, 2016

Answer is #1+2i#

Explanation:

To simplify #i^3(5+i)+7i#, remember #i^2=-1# and as #i^4=(i^2)^2#, #i^4=1#.

Hence #i^3(5+i)+7i#

= #5i^2*i+i^4+7i#

= #-5i+1+7i#

= #1+2i#

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