2 Answers

Maaudet · Answer 1 · 2019-09-23T23:07:22+0000

Answer:

$\boxed{\boxed{a=1,b=-1}}$

Explanation:

The given expression is,

$z=√(2)\left[\cos(-(\pi)/(4))+i\sin (-(\pi)/(4))\right]$

According to Distributive property,

$=√(2)\cos(-(\pi)/(4))+i√(2)\sin (-(\pi)/(4))$

we know that,

$\cos(-(\pi)/(4))=\cos((\pi)/(4))=(1)/(\sqrt2)$

and

$\sin(-(\pi)/(4))=-\sin((\pi)/(4))=-(1)/(\sqrt2)$

Putting these,

$=√(2)\cdot (1)/(\sqrt2)-i√(2)\cdot (1)/(\sqrt2)$

$=1-i\cdot 1$

=1-i

Comparing this to
a+bi , we get

a=1,b=-1

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