Difference between revisions of "MAT3223"

1.1 & 1.2

Propositional Logic

–

• Recognize propositional formulas built from atoms using connectives.
• Correctly interpret propositional formulas using truth tables.

2

1.3 & 1.4

• Tautologies and Deductions.
• Quantifiers.

• Propositional Logic.

• Establish whether a propositional formula is a tautology.
• State De Morgan's Laws of logic.
• Recognize conditional tautologies as laws of deduction.
• Express conditionals in disjunctive form.
• Express the negation of a conditional in conjunctive form.
• Identify the direct and contrapositive forms of a conditional.
• Recognize the non-equivalence of a conditional and its converse.
• Recognize a biconditional as the conjunction of a conditional and its converse.
• Identify the domain of interpretation of a quantified statement.
• Correctly interpret quantified statements.
• Correctly negate quantified statements.

3

1.5 & 1.6

• Sets.
• Set Operations.
• Introduction to proofs of universal statements in set theory
• Disproving universal statements via counterexamples.

• Tautologies and Deductions.
• Quantifiers.

• Recognize and interpret set equality and set inclusion.
• Recognize set operations and state their formal definitions.
• Recognize formal proofs as processes of logical deduction of conclusions from assumptions.
• Prove basic universal statements pertaining to set inclusion and set operations.
• Correctly identify false universal statements in set theory and disprove them with appropriate counterexamples.
• Correctly use propositional and quantified tautologies as deductive laws.

4

2.1

• Divisibility of integers.
• The Division Algorithm.

• Proofs and Counterexamples.
• Propositional Logic.
• Quantifiers.

• Recognize the notion of integer divisibility via its formal definition, examples and counterexamples.
• Correctly state and apply the Division Algorithm of integers.
• Prove basic facts pertaining to divisibility and the division algorithm.

5

2.2 & 2.3

• Greatest Common Divisor.
• Bèzout's Identity: GCD(a,b) = au + bv for some u,v∊ℤ.
• Coprime integers.
• The Extended Euclidean Algorithm.

• Divisibility of integers.
• The Division Algorithm.

• Compute the GCD of two integers using the Euclidean algorithm.
• Express the GCD of two integers as a linear combination thereof using the extended Euclidean algorithm.

6

2.5

• Primes.
• Euclid's proof of the infinitude of primes by contradiction.
• Euclid's Lemma: for p prime, p|ab implies p∣a or p∣b.
• Unique factorization and the Fundamental Theorem of Arithmetic.

• Divisibility of integers.
• The Extended Euclidean Algorithm.
• Greatest Common Divisor.
• Coprime integers.

• Define prime numbers and state their basic properties.
• Prove the infinitude of primes.
• Prove Euclid's Lemma using Bèzout's identity.
• Prove uniqueness of prime factorization using Euclid's Lemma.
• Characterize divisibility and GCD of integers in terms of their prime factorizations.

7

3.1–3.3

• Arithmetic congruences and basic modular arithmetic.
• Tests of divisibility.

• Divisibility of integers.
• The Division Algorithm.

• Use arithmetic congruences to interpret the remainder of integer division.
• Use congruences to compute remainders of divisions where the quotient is large or irrelevant.
• Prove basic divisibility criteria by 2, 3, 5, 9 and 11 for number in base 10, using modular arithmetic.

8

3.4

• Modular rings ℤₙ.
• Modular fields ℤₚ.
• Fermat's Little Theorem.

• Primes.
• Arithmetic congruences and basic modular arithmetic.

• Recognize the modular rings ℤₙ as number systems.
• Evaluate sums, differences, negations and products in ℤₙ.
• Identify invertible and non-invertible elements of ℤₙ.
• Find the inverse (when defined) of a given element of ℤₙ.
• Prove that the modular ring ℤₚ is a field if and only if p is prime.
• Correctly state Fermat's Little Theorem, both as a theorem in modular arithmetic modulo a prime p, and as a theorem for the finite field ℤₚ.
• Apply Fermat's Little Theorem to solve arithmetic problems.

9

4.1

• Mathematical Induction.
• Inductive proofs.

• Basic proofs.
• Tautologies and Deductions.
• Quantifiers.
• Divisibility of integers.

• State the Principle of Mathematical Induction (PMI).
• Prove elementary algebraic and arithmetic statements by induction.
• Prove elementary algebraic and arithmetic statements by strong induction.

10

4.2 & 4.3

• Recursion.
• The Binomial Theorem (Binomial Expansion Formula).

• Mathematical Induction.
• Inductive proofs.
• Factorials.

• Recognize recursive definitions of sequences and sets.
• Prove elementary properties of recursively defined sets and sequences (Fibonacci and geometric sequences).
• Recursively construct successive rows of Pascal's triangle.
• Identify the entries in Pascal's Triangle as Binomial Coefficients.
• State and apply the Binomial Expansion Formula.
• Compute individual binomial coefficients using the quotient-of-falling powers formula (n𝑪k) = n(n−1)…(n−k+1)/k!

11

5.1 & 5.2

• The rational number system 𝐐.
• The real number system 𝐑.
• Fractional powers and roots of real numbers.
• Rational and irrational numbers. Existence of irrationals.

• Divisibility of integers.
• Unique factorization and the Fundamental Theorem of Arithmetic.
• Decimals and decimal expansions.
• Roots and fractional powers of real numbers.

• Identify the set 𝐐 of rational numbers as a number system (a field).
• Identify the set 𝐑 of real numbers as a number system (a field extending 𝐐).
• Prove the irrationality of √2 and, more generally, of √p for p prime.
• Prove that fractional powers x^m/n of real x>0 are well defined and unique.
• Informally interpret the convergence of decimal expansions as the completeness of 𝐑.
• Informally recognize that the universal existence of roots ⁿ√x and fractional powers x^m/n of real numbers x>0 relies on the completeness of 𝐑.

12

8.1–8.4

• Introduction to complex numbers and their operations.
• The complex number system 𝐂.
• The complex plane.

• The real number system 𝐑.
• Fractional powers and roots of real numbers.

• Represent complex numbers algebraically in Cartesian form.
• Represent complex numbers geometrically as points on a plane.
• Carry out arithmetic operations with complex numbers.
• Interpret the geometric meaning of addition, subtraction and complex conjugation.
• Identify the set 𝐂 of complex numbers as a field extending the real number system 𝐑.

13

8.5–8.7

• Polar form of complex numbers.
• Geometric meaning of complex multiplication and division.
• Powers and roots of complex numbers. De Moivre’s Theorem.

• The complex number system 𝐂.
• The complex plane.
• Roots and fractional powers of real numbers.

• Represent complex numbers in polar form.
• Algebraically relate the Cartesian and polar forms of a complex number.
• Use the identities cis(𝜃+ɸ) = cis𝜃∙cisɸ and (cis𝜃)ⁿ = cis(n𝜃) (De Moivre's formula) for the complex trigonometric function cis𝜃 = cos𝜃 + i∙sin𝜃 to evaluate products and powers both algebraically and geometrically.
• Evaluate all n-th roots of a given complex number both in trigonometric and (when possible) in algebraic closed form, and represent them geometrically.

14

8.8–9.2

• Roots and factors of polynomials. The Remainder Theorem.
• Real and complex roots.
• The Fundamental Theorem of Algebra.

• The complex number system 𝐂.
• Powers and roots of complex numbers. De Moivre’s Theorem.
• Polynomials: arithmetic operations, long division, and factorizations.

• State and prove the Remainder Theorem.
• Identify roots with linear factors of a polynomial.
• Factor given simple polynomials into irreducible factors over ℚ, ℝ and ℂ.
• State the Fundamental Theorem of Algebra.
• Use the Fundamental Theorem of Algebra to prove that irreducible real polynomials are linear or quadratic.