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Complex numbers are necessary in order for the fundamental theorem of algebra to be complete.
The fundamental theorem of algebra states that for every polynomial function of degree n (the highest exponent on the variable) we will get n number of solutions.
Take this quadratic for example:
f(x) = x2 - 4
The fundamental theorem of algebra states that we will get two values of x for every value of f(x) we pick. In most cases we are concerned with the "roots" (typically x-intercepts) where the function crosses the line f(x) = 0.
So for the quadratic above when f(x) is set to 0 we get x = 2 or x = -2.
Now take a look at this quadratic:
f(x) = x2 + 1
A quick look at the graph of this function will show that it never crosses the line f(x) = 0. But according to the fundamental theorem of algebra we should get two values for x at f(x) = 0.
This is where the complex numbers come in.
When we solve this equation for f(x) = 0 we get the following conundrum:
-1 = x2
Now we know that we cannot take the square root of a negative number and get a real solution. There is no real number asuch that a2 will equal a negative number. So we move into the complex numbers.
The following solutions work for the above problem, x = i, x = -i.
The complex numbers make it to where the fundamental theorem of algebra holds for any polynomial function.
Complex numbers are also used in physics and electrical engineering. I do not know the specifics of those applications though so feel free to add to this.
Through the use of Euler's formula, derived by in the 1700's Leonhard Euler, we have: ei*ÆŸ = cos(ÆŸ) + i*sin(ÆŸ), where 'e' is the base of natural logarithms (approx 2.718281828), i is the imaginary unit number sqrt(-1), and ÆŸ is an angle in radians.
Some examples of where this is useful is: analysis of certain electric circuits, signal processing, control systems, electric power transmission lines. The angle ÆŸ usually represents a phase shift between two signals. Graphing in the complex plane can reveal behavior of the system, that is not readily evident with other methods.
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What are considered complex numbers?
A complex number is any number that can be represented in the form of a+bi, the real numbers are a and b, the imaginary number is i. Complex numbers are used in scientific and engineering fields.
What are the two types of numbers used in science?
Real and Complex. Real numbers are your everyday numbers that most people are familiar with and Complex numbers are Real numbers mixed with imaginary numbers. Of course this is a VERY BROAD oversimplification, and the question is somewhat vague in that there are other "types" of numbers that are used, but I think this is the answer you are looking for.
What is the relation of complex numbers to real numbers?
Complex numbers are a proper superset of real numbers. That is to say, real numbers are a proper subset of complex numbers.
Could anyone list numbers not in the set of complex numbers?
No. Complex numbers is the highest set of numbers you can go, and there are no sets outside of complex numbers.
What is the physical significance of complex numbers?
They are frequently used in Engineering applications.
What are considered complex numbers?
A complex number is any number that can be represented in the form of a+bi, the real numbers are a and b, the imaginary number is i. Complex numbers are used in scientific and engineering fields.
What are the engineering applications of complex numbers and matrices?
I suggest asking separate questions for complex numbers, and for matrices. Complex numbers are used in a variety of fields, one of them is electrical engineering. As soon as AC circuits are analyzed, it turns out that complex numbers are the natural way to do this.
What are complex numbers subsets of?
Complex numbers are basically "numbers in two dimensions". You can extend them to more dimensions; one superset that is sometimes used is the quaternions, which are numbers in four dimensions.
What is complex math?
Complex math covers how to do operations on complex numbers. Complex numbers include real numbers, imaginary numbers, and the combination of real+imaginary numbers.
What are the two types of numbers used in science?
Real and Complex. Real numbers are your everyday numbers that most people are familiar with and Complex numbers are Real numbers mixed with imaginary numbers. Of course this is a VERY BROAD oversimplification, and the question is somewhat vague in that there are other "types" of numbers that are used, but I think this is the answer you are looking for.
What is the relation of complex numbers to real numbers?
Complex numbers are a proper superset of real numbers. That is to say, real numbers are a proper subset of complex numbers.
If a and b are any real numbers what is the conjugate of a plus b?
The concept of conjugate is usually used in complex numbers. If your complex number is a + bi, then its conjugate is a - bi.
Could anyone list numbers not in the set of complex numbers?
No. Complex numbers is the highest set of numbers you can go, and there are no sets outside of complex numbers.
What is the physical significance of complex numbers?
They are frequently used in Engineering applications.
What Is the use of imaginary axis in real life?
The imaginary axis is used in the definition of the complex numbers. Complex numbers are used in many fields in engineering, in particular - electric engineering, aerodynamics, acoustics etc.
How did imaginary numbers impact mathematics?
Imaginary numbers are used in complex numbers that make some math simpler like electronics where there is a cycle frequency it makes the math much simpler to handle complex equations
Set of real numbers and set of complex numbers are equivalent?
Real numbers are a proper subset of Complex numbers.
