Question14. Given the following complex numbers find and :
Studdy Solution
STEP 1
What is this asking?
We're given two complex numbers, and , and we need to find their sum, their product, and what happens when we divide by .
Watch out!
Remember that , and be careful with those negative signs when distributing!
Also, remember how to rationalize the denominator of a complex number by multiplying by its conjugate.
STEP 2
1. Calculate
2. Calculate
3. Calculate
STEP 3
Let's **add** the **real** parts and the **imaginary** parts separately!
We have and .
STEP 4
Adding the real parts gives us .
STEP 5
Adding the imaginary parts gives us .
STEP 6
So, .
STEP 7
Now, let's **multiply** and using the distributive property, just like we would with any two binomials!
Remember that .
STEP 8
We have .
STEP 9
Simplifying each term gives us .
STEP 10
Since , we have .
STEP 11
Combining like terms, we get .
So, .
STEP 12
To **divide** by , we'll multiply both the numerator and denominator by the **conjugate** of the denominator.
The conjugate of is .
STEP 13
So, we have .
STEP 14
Multiplying the numerators gives us .
STEP 15
Multiplying the denominators gives us .
STEP 16
Therefore, .
STEP 17
We found that , , and .
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