Introduction
Have you ever tried finding the square root of negative numbers? Before we go any further, let me first give you some brief notes on REAL NUMBERS. Most of you may already be familiar with ‘real numbers’. Every real number is either a rational or an irrational number.
Rational Numbers
Integers, Fractions, Mixed Numbers, Repeating and Terminating decimals are all rational numbers, because, they can be expressed as fractions (in the form of a/b, where b is not zero.)
1/3, 5 6/7, –89, 0, 92.64, 5.11111… are some examples of rational numbers.
Irrational Numbers
Irrational numbers cannot be written as a simple fraction. They are non-terminating, non-repeating decimals.
Pi, square root of 2, ‘e’ are examples of irrational numbers.
Pi = 3.141592653589793238462643383279…… Square root of 2 = 1.414213562373095048801688724209…… e = 2.718281828459045235360287471352……
Let’s go back to our discussion….
Have you ever tried finding the square root of negative numbers? The square root of a negative number CANNOT be a real number…
What does that mean?
Well...this means that you will NEVER get a real number for an answer when you square root a negative number.....your answer will NOT look like 5, –8, 9/10, 1.34, square root of 3 etc.
Is that reason clear? I’ll try to say enough to give you some idea of what I'm talking about.
NO real number, when multiplied by itself, will produce a negative number...that's why the square root of a negative number CANNOT be a real number...
HENCE...."imaginary numbers" were invented. Imaginary numbers are the square roots of negative numbers.
The imaginary number "i" is used to express the square roots of negative numbers.
Well…what is "i"?
"i" is the square root of negative 1.
That is:
i = sqrt (–1) I^2 = i × i = sqrt (–1) × sqrt (–1) = –1
In fact, there are TWO numbers that are the square root of ‘-1’ and they are i and –i just like there are two numbers that are the square root of 9, 3 and –3.
All imaginary numbers are just multiples of "i". We can make an imaginary number simply by multiplying a real number by "i".
For example,
Multiply the real number 7 by "i" and that gives us an imaginary number "7i".
Here are some more examples:
28.5i 2.75937683082138376058940586i sqrt(2) × i
As I mentioned above, the imaginary number "i" is used to express the square roots of negative numbers. Let’s look at some examples. Sqrt (–9) = +3i, –3i
Let’s check:
(+3i) × (+3i) = (3 × 3) × (i × i) = 9 × (i^2) = 9 × (–1) = –9
And
(–3i) × (–3i) = (–3 × –3) × (i × i) = 9 × (i^2) = 9 × (–1) = –9
Similarly,
Sqrt (–16) = +4i, –4i Sqrt (–25) = +5i, –5i Sqrt (–36) = +6i, –6i
Now that we have learned about imaginary numbers, I find it relevant to talk a bit about complex numbers too.
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