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- MTH322: Real Analysis II (Fall 2021)
- ]]. ===== Course Contents: ===== **Sequences of functions:** convergence, uniform convergence, uniform con... differentiation, the exponential and logarithmic function, the trigonometric functions. **Series of functions:** Absolute convergence, uniform convergence, Cauchy criterion, Weiestrass M-test,
- MTH424: Convex Analysis (Fall 2020)
- e concept of Convex Analysis, convex sets, convex functions, Differential of the convex function. Developing ability to study the Hadamard-Hermite inequalities and th... ir properties, Best approximation theorem. Convex functions, Basic definitions, properties, various generalizations, Differentiable convex functions, Hermite and Hadamard inequalities, Subgradient,
- MTH322: Real Analysis II (Spring 2023)
- ]]. ===== Course Contents: ===== **Sequences of functions:** Convergence, uniform convergence, uniform con... differentiation, the exponential and logarithmic function, the trigonometric functions. **Series of functions:** Absolute convergence, uniform convergence, Cauchy criterion, Weiestrass M-test,
- MTH321: Real Analysis I (Spring 2023)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH103: Exploring Quantitative Skills
- linear models, including rectangular coordinates, functions, empowering them to analyze real-world problems ... ng Strategy and Problem solving using sets. === Functions: === Introduction to functions, rates of change, composition of functions, transformation of functions, absolute value function, inverse
- MATH-731: Convex Analysis
- ====== MATH-731: Convex Analysis ====== Convex functions on the real line, Continuity and differentiability of convex functions, Characterizations, Differences of convex functions, Conjugate convex functions, Convex sets and affine sets, Convex functions on a normed linear space, Conti
- MTH321: Real Analysis I (Fall 2015)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis I (Fall 2018)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis I (Fall 2019)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis I (Fall 2021)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis I (Fall 2022)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis I (Spring 2020)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis 1
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis 1
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p
- MTH321: Real Analysis 1 (Spring 2015)
- s statements by induction. Define the limit of, a function at a value, a sequence and the Cauchy criterion. ... ve various theorems about limits of sequences and functions and emphasize the proofs’ development. Define continuity of a function and uniform continuity of a function, prove various theorems about continuous functions and emphasize the p