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18 votes
18 votes
Two complex numbers are given, where m, n, p, and q are real numbers.

m+ni
p+qi

For what relationship among m, n, p, and q, will be the product of these two complex numbers have only an imaginary part?

This is Algebra 2.

User LoztInSpace
by
2.8k points

2 Answers

17 votes
17 votes

Answer:

First we have to find product


\\ \sf\longmapsto (m+ni)(p+qi)


\\ \sf\longmapsto m(p+qi)+ni(p+qi)


\\ \sf\longmapsto mp+mqi+npi+nqi^2


\\ \sf\longmapsto mp+mqi+nqi-nq


\\ \sf\longmapsto mp-nq+(mq+nq)i

  • We have to keep imaginary parts i.e Im(z)


\\ \sf\longmapsto mp-nq=0


\\ \sf\longmapsto mp=nq

User Alex Oliveira
by
3.1k points
23 votes
23 votes

Answer:

Given complex numbers:

  • m+ni
  • p+qi

Their product is:

  • (m + ni)(p + qi) =
  • mp + npi + mqi + nqi² =
  • mp - nq + (np + mq)i

In order to have only an imaginary part we need:

  • mp - nq = 0

or

  • mp = nq
User SeekingTruth
by
2.6k points
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