1 Answer

Ket · Answer 1 · 2022-07-21T19:55:21+0000

Answer:

There is no real solution for this equation. However, the solution exists in complex world.

$We have,\\e^(ix) = cosx + isinx.......(1)\\e^(-ix) = cos(-x) + isin(-x)\\or, e^(-ix) = cosx - isin(x)......(2)\\Subtracting equation(2) from equation (1),\\e^(ix) - e^(-ix) = 2isin(x)\\or, sin(x) = (e^(ix)-e^(-ix))/(2i)\\We need to solve:\\sin(x) = 2\\or, (e^(ix)-e^(-ix))/(2i) = 2\\or, e^(ix) - e^(-ix) = 4i\\or, e^(ix) - (1)/(e^(ix)) = 4i\\or, e^(2ix) - 1 = 4ie^(ix)\\or, e^(2ix) - 4ie^(ix)-1=0\\\\or, (e^(ix))^(2) + (-4i) e^(ix) - 1 = 0\\$

Using quadratic formula:

0 Comments

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

0 Comments

Please log in or register to add a comment.

Other Questions