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Chimie Organique 1 Excercises de pratique et réponses
Atomes, orbitales, liaisons chimiques et géométrie moléculaire ; stœchiométrie, équations chimiques et relations quantitatives ; solutions et réactions d'oxydoréduction ; lois des gaz ; thermochimie, thermodynamique et cinétique ; principes d'équilibre et équilibres ioniques ; acides et bases, pH, solubilité et solutions tampons.
- Class notes
- • 31 pages •
Atomes, orbitales, liaisons chimiques et géométrie moléculaire ; stœchiométrie, équations chimiques et relations quantitatives ; solutions et réactions d'oxydoréduction ; lois des gaz ; thermochimie, thermodynamique et cinétique ; principes d'équilibre et équilibres ioniques ; acides et bases, pH, solubilité et solutions tampons.
Ordinary Differential Equations Complete Notes
General concepts. First order equations. Linear differential equations of higher order. Differential operators. Laplace transforms. Systems of differential equations. Series solutions about ordinary points.
- Class notes
- • 50 pages •
General concepts. First order equations. Linear differential equations of higher order. Differential operators. Laplace transforms. Systems of differential equations. Series solutions about ordinary points.
Ordinary Differential Equations Complete Notes
General concepts. First order equations. Linear differential equations of higher order. Differential operators. Laplace transforms. Systems of differential equations. Series solutions about ordinary points.
- Class notes
- • 50 pages •
General concepts. First order equations. Linear differential equations of higher order. Differential operators. Laplace transforms. Systems of differential equations. Series solutions about ordinary points.
Calculus 3 Complete Notes
Extrema of functions of several variables. Multiple integration and applications. Vector fields and their derivatives. Curves. Vector differential operators. Line integrals. Surfaces and surface integrals. Theorems of Stokes, Gauss, etc.
- Class notes
- • 24 pages •
Extrema of functions of several variables. Multiple integration and applications. Vector fields and their derivatives. Curves. Vector differential operators. Line integrals. Surfaces and surface integrals. Theorems of Stokes, Gauss, etc.
Calculus 3 Full Course Notes
Extrema of functions of several variables. Multiple integration and applications. Vector fields and their derivatives. Curves. Vector differential operators. Line integrals. Surfaces and surface integrals. Theorems of Stokes, Gauss, etc.
- Class notes
- • 24 pages •
Extrema of functions of several variables. Multiple integration and applications. Vector fields and their derivatives. Curves. Vector differential operators. Line integrals. Surfaces and surface integrals. Theorems of Stokes, Gauss, etc.
Introduction to Probability Complete Course Notes
Probability axioms and their consequences. Conditional probability and independence. Random variables, distributions and densities, moments, sampling distributions. Weak law of large numbers, sums of independent random variables, moment generating functions, convergence concepts, the central limit theorem.
- Class notes
- • 41 pages •
Probability axioms and their consequences. Conditional probability and independence. Random variables, distributions and densities, moments, sampling distributions. Weak law of large numbers, sums of independent random variables, moment generating functions, convergence concepts, the central limit theorem.
Introduction to Probability Complete Notes
Probability axioms and their consequences. Conditional probability and independence. Random variables, distributions and densities, moments, sampling distributions. Weak law of large numbers, sums of independent random variables, moment generating functions, convergence concepts, the central limit theorem.
- Class notes
- • 41 pages •
Probability axioms and their consequences. Conditional probability and independence. Random variables, distributions and densities, moments, sampling distributions. Weak law of large numbers, sums of independent random variables, moment generating functions, convergence concepts, the central limit theorem.