Simplify quotients

[jobell]

Can someone help me with this problem? I have to simplify the following quotient of complex numbers into the for
m a+bi. Show all work.
I have worked park of the problem, but do not know what to do from here...

-4-3i/2-i= (-4-3i)/(2-i) * (2+i)/(2+i)
= -8-4i-6i-3i squared/4+2i-2i-3i squared
= -8-10i-3i squared/4-2i squared

 

[srmichael]

Can someone help me with this problem? I have to simplify the following quotient of complex numbers into the for
m a+bi. Show all work.
I have worked park of the problem, but do not know what to do from here...

-4-3i/2-i= (-4-3i)/(2-i) * (2+i)/(2+1) Should be 2+i
= -8-4i-6i-3i squared/4+2i-2i-2i squared Should be -i²
= -8-10i-3i squared/4-2i squared

You have a few errors in your calculation. See above. Make these changes and then let's chat if you still do not get the answer.

 

[jobell]

After making the corrections, if I continue to reduce it down I get -2-10i-3i squared/-2i squared....is that what I am looking for? Thanks for all of your help!

 

[srmichael]

After making the corrections, if I continue to reduce it down I get -2-10i-3i squared/-2i squared....is that what I am looking for? Thanks for all of your help!

No, not correct.

\(\displaystyle \frac{(-4-3i)(2+i)}{(2-i)(2+i)}\)

\(\displaystyle \frac{-8-4i-6i-3i^2}{4+2i-2i-i^2}\)

Remember, i² = -1, therefore:

\(\displaystyle \frac{-8-10i+3}{4+1}\)

\(\displaystyle \frac{-5-10i}{5}\)

\(\displaystyle \frac{-5}{5}+\frac{-10i}{5}\)

\(\displaystyle -1-2i\)

A little tidbit here as well, in the denominator, the value will ALWAYS end up being a² + b². In your case, 2² + (-1)² = 4 + 1 = 5

 

[jobell]

Thank you so much!!! One day I may get this stuff right...but I doubt it.

 

[mmm4444bot]

One day I may get this stuff right ... but I doubt it.

To me, this statement sounds like you have already decided to fail.

I'm not sure why you would make such a decision. If you are not sure either, read up on the phrase self-fulfilling prophecy some day. :cool: