%2F(1-2i)-%2B-(i)%2F(3%2Bi).jpeg "(2+3i)/(1-2i) + (i)/(3+i)")
Simplifying Complex Fractions
This article will guide you through the process of simplifying the complex fraction:
(2 + 3i) / (1 - 2i) + (i) / (3 + i)
Understanding Complex Numbers
Before we begin, let's quickly review complex numbers. A complex number is a number of the form a + bi, where a and b are real numbers, and i is the imaginary unit, where i² = -1.
Simplifying the First Fraction
We'll start by simplifying the first fraction, (2 + 3i) / (1 - 2i). To do this, we'll multiply both the numerator and denominator by the conjugate of the denominator. The conjugate of 1 - 2i is 1 + 2i.
(2 + 3i) / (1 - 2i) * (1 + 2i) / (1 + 2i)
This gives us:
(2 + 4i + 3i + 6i²) / (1 + 2i - 2i - 4i²)
Simplifying further by remembering that i² = -1:
(2 + 7i - 6) / (1 + 4)
This results in:
(-4 + 7i) / 5
Simplifying the Second Fraction
Now let's simplify the second fraction, (i) / (3 + i). We'll use the same method as before, multiplying the numerator and denominator by the conjugate of the denominator, which is 3 - i.
(i) / (3 + i) * (3 - i) / (3 - i)
This gives us:
(3i - i²) / (9 - i²)
Simplifying further:
(3i + 1) / (9 + 1)
This results in:
(1 + 3i) / 10
Combining the Simplified Fractions
Now we have:
(-4 + 7i) / 5 + (1 + 3i) / 10
To add these fractions, they need a common denominator. We can multiply the first fraction by 2/2:
((-8 + 14i) / 10) + ((1 + 3i) / 10)
Now we can add the numerators:
(-8 + 14i + 1 + 3i) / 10
Combining like terms:
(-7 + 17i) / 10
Final Result
Therefore, the simplified form of the given complex fraction is (-7 + 17i) / 10.