6.1 Methods of Proof

Cards (61)

What are the key methods used in mathematical proofs?
Direct, contradiction, induction
Direct Proof is a method where you start with the given assumptions and use logic
Proof by Contradiction begins by assuming the negation of the statement is true.
What is the contrapositive of the statement $P \implies Q$ ? 
$\neg Q \implies \neg P$
Direct Proof uses given assumptions to arrive at the desired conclusion
Indirect Proof includes Proof by Contradiction and Proof by Contrapositive.
Match the type of proof with its approach:
Proof by Contradiction ↔️ Assumes negation of conclusion
Proof by Contrapositive ↔️ Proves the contrapositive
Steps involved in a Direct Proof
1️⃣ Start with given assumptions
2️⃣ Apply logical rules and theorems
3️⃣ Arrive at the conclusion
What is the main difference between Proof by Contradiction and Proof by Contrapositive?
Contradiction shows fallacy
Indirect Proof starts by assuming the opposite of what needs to be proven.
What are the two possible outcomes when using indirect proof methods?
Contradiction or contrapositive
In Proof by Contradiction, we start by assuming the negation of the conclusion
If the negation of the conclusion in Proof by Contradiction leads to a contradiction, the original statement must be true.
What is an example statement proved by contradiction in the material?
$\sqrt{2}$ is irrational
Steps in proving that $\sqrt{2}$ is irrational using Proof by Contradiction 
1️⃣ Assume $\sqrt{2}$ is rational
2️⃣ $\sqrt{2} =$ $\frac{a}{b}$ where $a$ and $b$ are coprime
3️⃣ Show that $a^{2}$ is even
4️⃣ Deduce that $a$ is even
5️⃣ Substitute $a =$ $2k$
6️⃣ Show that $b^{2}$ is even
7️⃣ Conclude $\sqrt{2}$ is irrational
The contrapositive of $P \implies Q$ is \neg Q \implies \neg P
In Proof by Contrapositive, if $n$ is odd, then $n^{2}$ is odd.
What is the primary difference between Proof by Contradiction and Proof by Contrapositive?
Assumed to be true
Indirect Proof starts by assuming the opposite of what we want to prove
The contrapositive of "If $n^{2}$ is even, then $n$ is even" is "If $n$ is odd, then $n^{2}$ is odd."
Steps in Proof by Contradiction
1️⃣ State the proposition $P$ to be proved
2️⃣ Assume the negation of $P$ , i.e., $\neg P$ , is true
3️⃣ Use logical deduction to derive a contradiction
4️⃣ Show that this contradiction proves $P$ is true
5️⃣ Conclude the proof
What is an example statement proved by contradiction in the material?
$\sqrt{2}$ is irrational
Proof by Induction is used to prove statements that hold for all natural numbers
Steps in Proof by Induction
1️⃣ Base Case: Show the statement is true for $n =$ $1$
2️⃣ Inductive Hypothesis: Assume the statement is true for $n =$ $k$
3️⃣ Inductive Step: Prove the statement is true for $n =$ $k +$ $1$ using the inductive hypothesis
What is an example statement proved by induction in the material?
$\sum_{i = 1}^{n} i =$ $\frac{n(n + 1)}{2}$
The scope of Proof by Induction is statements about all natural numbers
Match the proof method with its description:
Direct Proof ↔️ Starts with assumptions and uses logic
Proof by Contradiction ↔️ Assumes the negation of the conclusion
Proof by Induction ↔️ Proves statements for all natural numbers
What is the starting point of a direct proof?
Given assumptions
If $n$ is an even integer, then $n^{2}$ is a multiple of 2
Proof by contradiction begins by assuming the negation of the conclusion.
What number is commonly used in proof by contradiction to demonstrate irrationality?
$\sqrt{2}$
Steps in proving $\sqrt{2}$ is irrational using proof by contradiction 
1️⃣ Assume \sqrt{2}</latex> is rational, i.e., $\sqrt{2} =$ $\frac{a}{b}$
2️⃣ Derive $a^{2} =$ $2b^{2}$
3️⃣ Show $a$ is even, so $a =$ $2k$
4️⃣ Show $b$ is also even
5️⃣ Conclude $\sqrt{2}$ is irrational
The contrapositive of $P \implies Q$ is $\neg Q \implies \neg P$ .
If $n$ is odd, then $n^{2}$ is also odd
What is the key approach in direct proof?
Logical deduction
Proof by contradiction starts by assuming the negation of the conclusion
The contrapositive of $P \implies Q$ is $\neg Q \implies \neg P$ .
Steps in a proof by contradiction
1️⃣ State the proposition $P$ to be proved
2️⃣ Assume the negation of $P$ , i.e., $\neg P$ , is true
3️⃣ Derive a logical contradiction
4️⃣ Show that the contradiction proves $P$ is true
5️⃣ Conclude the proof
What is the assumption in a proof by contradiction?
Negation of conclusion
In proof by induction, the base case involves showing the statement is true for n = 1