tan x

[Sarahisme]

hi all ,

 

i can't figure out how i am ment to use the stated fact about tan x.

 

the way i'd do it is dividing the series expansion for cos(x) into that for sin(x)... but yeah i dunno

 

any advice would be greatly appreciated

 

__sarah__

[Sarahisme]

there is second part to this question, and again i could do it by other means, but not using the given fact

 

this is the second part to the question:

[DQW]

(a) You are given two things. The FIRST thing that would come to my mind is to substitute the first into the second ...

 

(b) Having said (a), I shouldn't say anything more.

 

Sarah, these are nothing more than direct substitution problems.

[Sarahisme]

but part a says to use the first fact, not the second (or both) ... or are you talking about doing part b?

[Sarahisme]

sorry to be such a panicky hassle sort of thing, this si just about the most stresfull week so far this year!

[DQW]

(a) You are given 2 things :

 

1. tan(x) is analytic in (-pi/2, pi/2)

2. tan(x) is odd

 

Substitute the expansion (from 1) in the equation for 2.

[Sarahisme]

ok i have so i get

 

tan'(x)= 1 + tan^{2}(-x)

 

but i dont see how this helps... (although i am sure it does )

[Sarahisme]

oh wait its like an identity or something, 1 + tan^{2} = sec^{2) or something like that, damn i wish i had textbook with me right now

[DQW]

I was talking about part (a), not part (b)

 

Apply the power series expansion to each side of the given equation (the "fact"). What do you get ?

[Sarahisme]

this?

 

i gotta run though i'll be back in a few hours...sorry

Picture 1.pdf

[Sarahisme]

or is it this...because this makes more sense to me....

Picture 2.pdf

[Sarahisme]

oh ok then you expand it like this....

 

 

therefore all n even terms are zero (assuming you start from n = 1 right?)

 

lol....now for part b! dammit

[DQW]

How do you show that the even terms are zero ? It does not matter what value of n you start from, for the even terms to vanish (but in any case, you start with n=0 because that term is part of a general power series).

[Sarahisme]

when i said

 

"oh ok then you expand it like this...."

 

i ment to post this along with it...

[Sarahisme]

i tried a similar method for part (b) but i don't know how to expand the square of a infinite sum...

[Sarahisme]

ok so i have got this much so far for part (b), but as i said before i then get a infinte sum squared and i don't know how to deal with such a thing!

[DQW]

(a) You have a tiny error in post #14. Why did a_0 change signs on the RHS ?

 

(b) You are not asked for all the coefficients, right ? So, just write out the first few terms (I'll let you figure out how many you need to write), square it, and compare coefficients.

[Sarahisme]

you mean end up with things such as

 

(a_1)^{2} = 3(a_3)

 

??

[DQW]

I couldn't comment on that unless I know how you got it.

[Sarahisme]

oh sorry, yep hang on...

[Sarahisme]

(a) You have a tiny error in post #14. Why did a_0 change signs on the RHS ?

 

oh ok so a_0 is zero aswell (like all the even n terms)?

[Sarahisme]

ok so post #14 should have been this....

[Sarahisme]

ok so this is what i do to expand it, but then well yep i don't know how you would compare terms with this... :S

[Sarahisme]

wait second....may have eureka moment here....!!!

[Sarahisme]

ok got it i think, i was on the right track........here we go !