ITT textbooks

Which of those would you highly recommend?

Is this the order you did them in? Where did you get the book ideas from?

>Is this the order you did them in?
PLEASE familiarize yourself with the topics you're going to read before you accumulate useless book lists

>Algebraic Curves - Fulton
>Undergrad Algebraic Geometry - Reid
>Elements of The Theory of Algebraic Curves
>The Geometry of Schemes

4 books on Alg. Geom. and manage to completely avoid Cohomology. What are you doing?

What? I'm not familiar with many of the books mentioned and I want to know if there is an order to the categories they are placed in.

lodish, molecular cell biology
alberts, molecular biology of the cell

Thermodynamics by Enrico Fermi.

this

Year 1
Stewart - Calculus: Early Transcedentals
Freund - Modern Elementary Statistics
Giancoli - Physics for Scientists & Engineers with Modern Physics

Year 2
Axler - Linear Algebra Done Right
Poole - Linear Algebra: A Modern Introduction
Hungerford - Abstract Algebra: An Introduction
Griffiths - Electricity and Magnetism
Davidson/Donsig - Real Analysis and Applications
Boyce/DiPrima - Elementary Differential Equations and Boundary Value Problems
Freund - Mathematical Statistics with Applications

Year 3
Armstrong - Groups and Symmetry
Cioaba/Murty - First course in Graph Theory and Combinatorics
Saff/Snider - Fundamentals of Complex Analysis with Applications to Engineering, Science
Kolmogorov/Fomin - Introductory Real Analysis
James E. Humphreys - Reflection groups and Coxeter groups
Milnor - Morse Theory
Rotman - Galois Theory
Koblitz - A Course in Number Theory and Cryptography

Year 4
Alan Baker - A Concise Introduction to the Theory of Numbers
O'Neill - Elementary Differential Geometry
Dummit/Foote - Abstract Algebra
Rudin - Real And Complex Analysis
Vinberg - Linear Representations of Groups
Fulton/Harris - Representation Theory
Atiyah/Macdonald - Commutative Algebra
Eisenbud - Commutative Algebra
Matsumura - Commutative Ring Theory
Arnold, Gusein-Zade, Varchenko - Singularities of Differentiable Maps, Volumes 1/2

>posting fake lists

what's fake about my list (the first one you quoted)?

Stage 1, English: An Introductory Look into The Essentials of The English Language Verb, Noun, and Article.

Freshman:
Stewart - Calculus
Griffiths - Intro to Genetic Analysis
Zumdahl - Chemistry
Maitland Jones - Organic Chemistry
Some shitty life-sciences physics book

Sophomore:
Lodish: Molecular Cell Biology
LEHNINGER THE ULTIMATE: PRINCIPLES OF BIOCHEMISTRY
Lewis + Loftis: Java
Some shitty life-sciences statistics book
Some linear algebra book
Stewart - calculus

Junior:
Tinoco - Physical Chemistry
Coico - Immunology A short course
Weaver - Molecular Biology
Tooze - Intro Protein Structure
Lodish again
TA Brown - Genomes
Salyers & Whitt - Bacterial Pathogenesis

Senior:
A bunch of lecture note courses
Human molecular Genetics 3
Dewick - Medicinal Natural Products
Lodish once again

Guess my starting salary

> starting salary

Probably whatever they make as a barista at starbucks

>ctrl f
>halliday
>0

Well sci I think I should change my textbook

Textbooks? Textbooks
>Classical mechanics
Taylor- Classical Mechanics
Kibble and Berkshire - Classical Mechanics
Goldstein - Classical Mechanics

>Thermodynamics
Wassermann - Thermal Physics, Concepts and Practice

>Statistical mechanics
Reichl - A Modern Cause in Statistical Physics

>Electrodynamics
Percell - Electricity and Magnetism
Griffiths - An Introduction to Electrodynamics
Greiner - Classical Electrodynamics
Jackson - Classical Electrodynamics

>Special Relativity
French - Special Relativity
Woodhouse - Special Relativity

>Quantum mechanics
Griffiths - Introduction to Quantum mechanics
Greiner - Introduction to Quantum mechanics
Shankar - Principles of Quantum mechanics

>Mathematics for particle theory
Robinson - Symmetry and the Standard Model
Hall - Lie Groups, Lie algebras and Representations

>Quantum Field Theory
Lancaster and Blundel - Quantum Field Theory for the Gifted Amateur
Schwartz - Quantum Field Theory and the Standard Model
Srednicki - Quantum Field Theory
Peskin and Schroeder - An Introduction to Quantum Field Theory

It's a pretty crap list, fyi. This one would be better for a beginner, though you should probably start with algebra as opposed to pre-alg unless you're a complete brainlet.

>his high school didn't teach Basic Number Theory

Best aeronautical engineering book?

Can you guys recommend me a good Operational Research book?

Year 1-2:
Artin - Algebra (say, chap. 1-6 and 8-9)
Rudin - Principles of Mathematical Analysis (roughly chap 1-9)

Year 3:
Artin - Algebra (chap. 7, 10, 14, 15)
Cohn - Measure Theory (chap 1-6)
Ahlfors - Complex Analysis
Munkres - Topology (Part I)
Billingsley - Probability and Measure (chap. 4-5)
Salsa - Partial Differential Equations in Action (chap 3-4)
Arnold - Ordinary Differential Equations

Year 4:
Lang - Algebra (chap. II-VI)
Rudin - Functional Analysis (chap. 1-5, 10,11)
Lee - Introduction To Smooth Manifolds
Billingsley - Probability and Measure (chap 1,6)
Shafarevich - Basic Algebraic Geometry, Vol. 1
Marcus - Number Fields
Poizat - A Course in Model Theory (chap 1-10)
Kodaira - Complex Analysis (chap. 6-8)

Whats a good textbook to start with for Differential Geometry?

Lee - Introduction to Smooth Manifolds, or Milnor - Topology From The Differentiable Viewpoint.
The Milnor one is neat because it is pretty short yet very accessible, a great intro to the subject

...

None because I can't get into grad school

Holee fuk is this for real?
How much time did it take?

Can you say how apostol compares to spivak ?

year 1-year7
row by row.

I finished my uni so it is what it is.
I can list all my textbooks through the years but it would take me a while,there are literally 100 textbooks or more.

>Holee fuk is this for real?

No, the advance calculus section gives it away.

Strauss is a fucking meme. No one uses that shit. Asmar is superior.

They're all foreign so I don't see any point.