1.1 Proof

    Cards (116)

    • What is a mathematical proof?
      A logical argument
    • Mathematical induction is used to prove statements for all natural numbers
    • Mathematical induction can be used to prove formulas for all natural numbers
    • Mathematical induction is used to prove statements for all natural numbers
    • Proof by contradiction assumes the statement is false
    • How would you start a direct proof to show that the sum of two even integers is even?
      Let x and y be even
    • Proof by induction requires proving a base case and then showing that if it holds for n, it holds for n+1
    • Steps in a proof by contradiction
      1️⃣ Assume the statement is false
      2️⃣ Derive a logical contradiction
      3️⃣ Conclude the original statement is true
    • Proof by induction requires proving a base case and showing that if the statement holds for n, it also holds for n+1
    • Direct proof starts with known facts and uses logical reasoning to derive new statements
    • What number is commonly used to demonstrate proof by contradiction?
      √2
    • Steps in a proof by induction
      1️⃣ Prove the base case
      2️⃣ Assume the statement is true for n
      3️⃣ Prove the statement is true for n+1
    • In proof by induction, the induction step requires assuming the statement is true for n
    • If a formula holds for n, it must also hold for n+1 in proof by induction
      True
    • One type of proof method is called deduction, which starts with known facts
    • Steps in mathematical induction
      1️⃣ Prove the base case
      2️⃣ Assume the statement holds for n
      3️⃣ Show it holds for n+1
    • Proof by contradiction starts by assuming the statement is true
      False
    • What is an example of a statement that can be proven using proof by contradiction?
      √2 is irrational
    • What is the induction hypothesis in mathematical induction?
      Assume it holds for n
    • The sum of two even integers can be written as 2a + 2b, where a and b are integers

      True
    • A mathematical proof is a logical argument that demonstrates a statement is true based on axioms and previously proven theorems
    • Match the proof method with its approach:
      Deduction ↔️ Logically progress from known facts
      Contradiction ↔️ Show that assuming the statement is false leads to a contradiction
      Induction ↔️ Prove a base case and show it holds for n+1 if it holds for n
    • Proof by contradiction assumes the statement is true.
      False
    • In a direct proof, each logical step must be clearly explained.

      True
    • Proof by contradiction concludes that the original statement is true because assuming it was false led to a contradiction
    • What is typically the base case used in proof by induction?
      n=1
    • What is the induction step in proof by induction?
      Show n -> n+1
    • What is the starting point of deduction in mathematical proof?
      Known facts
    • Steps in proof by induction
      1️⃣ Show the base case (e.g., n=1)
      2️⃣ Assume the statement is true for n
      3️⃣ Prove the statement is true for n+1
    • In proof by induction, if the formula holds for n, it must also hold for n+1
      True
    • What is the approach in proof by deduction?
      Logically progress
    • What is the use case for proof by contradiction?
      Proving irrationality
    • What proof technique is used to show that √2 is irrational?
      Proof by Contradiction
    • Deductive proof starts with known facts and uses logical reasoning to reach a conclusion.
      True
    • What is assumed in proof by contradiction to begin the proof process?
      The statement is false
    • Mathematical induction is used to prove statements true for all natural numbers.
    • In Mathematical Induction, the formula for the sum of the first n integers is n(n+1)/2.
    • What example is provided to illustrate a direct proof in the study material?
      Sum of two even integers
    • What is the initial assumption when proving √2 is irrational using contradiction?
      √2 is rational
    • Proof by contradiction assumes the statement is false
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