Euler's Formula (Problem 1, Version 2)

Number Theory Level 2

Does e i π + 1 = 0 e^{iπ} + 1 = 0 equals π i e + 1 = 0 π^{ie} + 1 = 0 ?

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2 solutions

Aruna Yumlembam
May 7, 2020

If e^iπ=π^ie then taking natural log of both sides we have iπ=ie logπ , simplifying yields logπ=loglogπ, which is obviously false.

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No, as π i e + 1 0 π^{ie} + 1 \neq 0

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Your solution is just a restatement to the answer. Can you elaborate what is the actual value of π i e \pi^{ie} in the complex plane? Thanks!

Mahdi Raza - 1 year, 1 month ago

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Sorry, @Mahdi Raza , but this was my problem.

A Former Brilliant Member - 1 year ago

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