Solving (1+i)^11 using Euler identity (1 + i = root(2)*e^(pi/4)i)

[AMB33412]

Question is to solve (1 + i)^11 and express as basic expression ...

Euler identity is used in question

the answer is hopefully,... 2^5 + i*2^3


it also says something like (1 + i) = Root (2) * e ^ (pi / 4 )i or something but this part of question isnt clear .. so that given expression may have some error in it

 

[AMB33412]

I have to solve that using Euler's identity

Approximate solution is -2^5 + i*2^3

 

[stapel]

Question is to solve (1 + i)^11 and express as basic expression

What you've posted is an "expression". Since there is no "equals" sign (nor a variable), there is no "equation" to "solve".

Euler identity is used in question

What identity do you mean, specifically?

the answer is hopefully,... 2^5 + i*2^3

What do you mean by "hopefully"?

it also says something like (1 + i) = Root (2) * e ^ (pi / 4 )i or something but this part of question isnt clear .. so that given expression may have some error in it

What is "it"? What does "it" say, exactly? Which "part of [the] question" are you talking about? (This "part" isn't included in your post of the question.)

Please reply with the full and exact text of the exercise, the complete instructions, and a clear listing of your thoughts and efforts so far, so we can maybe figure out what's going on here. Thank you!