Answer
$(3-\sqrt -5)(1+\sqrt -1)=(3+\sqrt 5)+(3-\sqrt 5)i$
Work Step by Step
$(3-\sqrt -5)(1+\sqrt -1)=3+3\sqrt -1-\sqrt -5-\sqrt -5\sqrt -1$.
However we know that $i=\sqrt -1$ hence $3+3\sqrt -1-\sqrt -5-\sqrt -5\sqrt -1=3+3i-i\sqrt 5-i^{2}\sqrt 5$.
We also know that $i^{2}=-1$ hence $3+3i-i\sqrt 5-i^{2}\sqrt 5=3+3i-i\sqrt 5+\sqrt 5$.
By grouping the real and the imaginary parts we can write the solution in the form $a+bi$ where $a$ is the real and $b$ is the imaginary as $(3+\sqrt 5)+(3-\sqrt 5)i$
