- #1
Euler Formula: Understanding (4.25) to (4.26)
- Thread starter pinkcashmere
- Start date
-
- Tags
- Euler Euler formula Formula Sine
In summary, the Euler formula, also known as Euler's identity, is a mathematical equation that relates the five fundamental mathematical constants: 1, 0, π (pi), e (Euler's number), and i (the imaginary unit). It is written as e<sup>iπ</sup> + 1 = 0 and represents the relationship between exponential functions, trigonometric functions, and complex numbers. The formula is derived using Taylor series expansions and has various applications in mathematics, physics, engineering, and signal processing.
- #2
- 19,041
- 24,101
Although I downloaded and zoomed it I couldn't clearly identify the exponents. Did you test your upload?
- #3
jedishrfu
Mentor
- 14,802
- 9,156
Have you tried using the Euler formula:
and some trig identities?
https://en.wikipedia.org/wiki/Euler's_formula
https://en.wikipedia.org/wiki/Euler's_formula
- #4
pinkcashmere
- 18
- 0
Basically, I want to know how you go fromfresh_42 said:
## ae^{jwt}## + ## be^{-jwt}##
to
##Asin(wt + \theta)##
- #5
pinkcashmere
- 18
- 0
ok, i got it now.
thanks
thanks
Related to Euler Formula: Understanding (4.25) to (4.26)
1. What is the Euler formula?
The Euler formula, also known as Euler's identity, is an important mathematical equation that relates the five fundamental mathematical constants: 1, 0, π (pi), e (Euler's number), and i (the imaginary unit).
2. How is the Euler formula written?
The Euler formula is written as eiπ + 1 = 0.
3. What does the Euler formula represent?
The Euler formula represents the relationship between exponential functions, trigonometric functions, and complex numbers.
4. How is the Euler formula derived?
The Euler formula is derived using Taylor series expansions for the exponential and trigonometric functions, and then equating them to their corresponding Maclaurin series expansions with imaginary numbers.
5. What are the applications of the Euler formula?
The Euler formula is used in many areas of mathematics and physics, including complex analysis, differential equations, Fourier analysis, and quantum mechanics. It also has practical applications in engineering and signal processing.
Similar threads
-
General Math
-
General Math
-
Calculus and Beyond Homework Help
-
General Math
-
General Math
-
Differential Equations
-
General Math
-
General Math
-
General Math