MHB HIGHLY Rigorous Treatment of the Trigonometric Functions

Math Amateur
Gold Member
MHB
Messages
3,920
Reaction score
48
I am looking for a rigorous (preferably HIGHLY rigorous) treatment of the trigonometric functions from their definitions through to basic relationships and inequalities through to their differentiation and integration ... and perhaps further ...

Can someone please suggest

(i) an online resource for this ...

(ii) a textbook chapter ...

Peter
 
Physics news on Phys.org
What part of Oz are you from Peter? If Melbourne, I can tutor you...
 
Prove It said:
What part of Oz are you from Peter? If Melbourne, I can tutor you...
Hi Prove It,

I am from Hobart, Tasmania

Thanks for the kind offer though ...

Peter
 
Could always be done over Skype though :)
 
Peter said:
I am looking for a rigorous (preferably HIGHLY rigorous) treatment of the trigonometric functions from their definitions through to basic relationships and inequalities through to their differentiation and integration ... and perhaps further ...

Can someone please suggest

(i) an online resource for this ...

(ii) a textbook chapter ...

Peter
Hi Peter,
A good resource for free e-books if archive.org. For books on trig, you could look at
https://archive.org/search.php?query=trigonometry
 
John Harris said:
Hi Peter,
A good resource for free e-books if archive.org. For books on trig, you could look at
https://archive.org/search.php?query=trigonometry
Thanks for the help, John ... ...

I also found an interesting discussion of

[h=1]The best way to introduce trigonometric functions in a rigorous analysis course
[/h]at Math Stack Exchange ... ...

See

undergraduate education - The best way to introduce trigonometric functions in a rigorous analysis course - Mathematics Educators Stack ExchangePeter

 

Thread 'Injective immersion and embedding'

Hello! There is a simple line in the textbook. If ##S## is a manifold, an injectively immersed submanifold ##M## of ##S## is embedded if and only if ##M## is locally closed in ##S##. Recall the definition. M is locally closed if for each point ##x\in M## there open ##U\subset S## such that ##M\cap U## is closed in ##U##. Embedding to injective immesion is simple. The opposite direction is hard. Suppose I have ##N## as source manifold and ##f:N\rightarrow S## is the injective...
View full post »

Similar threads

A Creation/annihilation operators and trigonometric functions
Replies
9
Views
2K
MHB Differentiability of Multivariable Vector-Valued Functions .... ....
Replies
4
Views
2K
MHB Increasing Function on an Interval .... Browder, Proposition 3.7 .... ....
Replies
3
Views
2K
MHB Differentials in R^n .... Remark by Brwder, Section 8.2 .... ....
Replies
7
Views
2K
Rigorous Precalculus and Calculus Textbooks + Intro to Linear Algebra
Replies
8
Views
6K
Studying Skipping Chapters in Stewart’s Calculus? (Pearson's Edexcel IAL Background)
Replies
2
Views
231
Analysis Looking for a rigorous analysis textbook
Replies
6
Views
3K
MHB Measurable Functions .... Lindstrom, Proposition 7.3.7 .... ....
Replies
8
Views
1K
MHB Understanding Andrew Browder's Prop 8.7: Operator Norm and Sequences
Replies
4
Views
2K
MHB Another question on Open and Closed in V .... D&K Proposition 1.2.17 .... ....
Replies
2
Views
1K

Hot Threads

Recent Insights

Back
Top