http://www.ck12.org Chapter 11. Complex Numbers
Guided Practice
- Simplify the following complex number.
i^2013 - Plot the following complex number on the complex coordinate plane and determine its absolute value.
− 12 + 5 i - Fora= 3 + 4 i,b= 1 − 2 icompute the sum, difference and product ofaandb.
Answers: - When simplifying complex numbers,ishould not have a power greater than 1. The powers ofirepeat in a four
part cycle:
i^5 =i=√− 1
i^6 =i^2 =− 1
i^7 =i^3 =−√− 1 =−i
i^8 =i^4 = 1Therefore, you just need to determine where 2013 is in the cycle. To do this, determine the remainder when you
divide 2013 by 4. The remainder is 1 soi^2013 =i.
2.
The sides of the right triangle are 5 and 12, which you should recognize as a Pythagorean triple with a
hypotenuse of 13. |− 12 + 5 i|=13.
3.
a+b= ( 3 + 4 i)+( 1 − 2 i) = 4 − 2 i
a−b= ( 3 + 4 i)−( 1 − 2 i) = 2 + 6 i
a·b= ( 3 + 4 i)·( 1 − 2 i) = 3 − 6 i+ 4 i+ 8 = 11 − 2 i