How do you simplify -2/(3-i)23i?

2 Answers
sente
Dec 29, 2015

Multiply the numerator and denominator by the conjugate of the denominator to find

-2/(3-i) = -3/5 - 1/5i23i=3515i

Explanation:

The conjugate of a complex number a+bia+bi is a-biabi. The product of a complex number and its conjugate is a real number. We will use this property to produce a real number in the denominator of the given expression.

-2/(3-i) = -2/(3-i)*(3+i)/(3+i)23i=23i3+i3+i

= (-2(3+i))/((3-i)(3+i))=2(3+i)(3i)(3+i)

= (-6-2i)/(9 +3i -3i +1)=62i9+3i3i+1

= (-6-2i)/10=62i10

= -3/5 - 1/5i=3515i

Trevor Ryan.
Dec 29, 2015

=0.632/_0.3217=0.6320.3217. (in polar form)

=-0.6-0.2i=0.60.2i. (in rectangular form)

Explanation:

There are 2 methods to do this -
Method 1
First convert everything to polar form then use the formula
(z_1)/(z_2)=(r_1)/(r_2)cis(theta_1-theta_2)z1z2=r1r2cis(θ1θ2)

therefore (-2/pi)/((sqrt(3^2+1^2))/_tan^-1(-1/3))=-2/sqrt10 /_ (pi-(-0.32175)

=0.632/_3.4633. (Principle angle arguement is 0.3217 rad).

Method 2
Multiply the quantity by 1, selecting 1 as the complex conjugate of the denominator over itself.
Then the resultant denominator is a real number, and the numerator we multiply in rectangular form using the rule
(a+ib)*(x+iy)=(ax-by)+i(bx+ay).

therefore (-2+0i)/(3-i)*(3+i)/(3+i)=(-6-2i)/(3^2+1^2)

=1/10(-6-2i)

=-0.6-0.2i

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