Solution3
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The document outlines the details of Assignment 3, including specific questions on set theory, proofs by induction, contradiction, and contrapositive. It includes various mathematical sets and operations, along with guidelines for proving statements mathematically. Additionally, it specifies due dates for different classes and references an attached PDF for further details.
Solution3
- 1. Assignment 3 Deadline: April 26 (Thursday Class), April 27(Friday Class) Harshit Kumar April 25, 2012
- 2. Q1. Write the following sets? 1. x ∈ Z | x = y 2 f or some integer y ≤ 3 - {0, 1, 4, 9, 16} 2. x ∈ Z | x2 = y f or some integer y ≤ 3 - {0, 1, −1} Q2. Suppose the universal set U = {−1, 0, 1, 2}, A = {0, 1, 2} and B = {−1, 2}. What are the following sets? 1. A ∩ B - {2} 2. A ∪ B - {−1, 0, 1, 2} 3. Ac - {−1} 4. A − B - {0, 1} 5. A × B - {(0, −1)(0, 2)(1, −1)(1, 2)(2, −1)(2, 2)} 6. P (B) - {} - {∅, {−1}, {2}, {−1, 2}} Q3. Prove the following by Induction 1. If a is odd and b is odd, then a ∗ b is odd. 2. Any integer i > 1 is divisible by p, where p is a prime number. r n+1 −1 3. r = 1, ∀n ≥ 1, 1 + r + ..... + rn = r−1 2 n∗(n+1) 4. ∀n ≥ 1, 13 + 23 + ..... + n3 = 2 5. ∀n ≥ 1, 22n − 1isdivisibleby3 6. ∀n ≥ 2, n3 − nisdivisibleby6 7. ∀n ≥ 3, 2n + 1 < 2n 1 1 1 √ 8. ∀n ≥ 2, √ 1 + √ 2 + .... + √ n > n Ans. Find the attached pdf file induction.pdf Q4. Prove the following by Contradiction 1. There exists no integers x and y such that 18x + 6y = 1 2. If x, y ∈ Z, then x2 − 4y − 3 = 0. Ans 4 (i) The contradiction would be, let there exist integers x and y such that =⇒ 18x + 6y = 1. =⇒ 1 = 2 × (9x + 3y) =⇒ 1 is even, and hence a contradiction. We can thus arrive at the conclusion that our assumption , there exists integers x and y such that 18x + 6y = 1, is wrong. =⇒ there exists no integers x and y such that 18x + 6y = 1 4(ii) The contradiction would be, let there exist x, y ∈ Z such that x2 − 4y − 3 = 0. =⇒ x2 = 4y + 3. =⇒ x2 = 2 ∗ 2y + 2 + 1 =⇒ x2 = 2(2y + 1) + 1 =⇒ x2 is odd =⇒ x is odd since x is odd, =⇒ x = 2n + 1, for some integer n Substitute x = 2n + 1 in the original equation x2 − 4y − 3 = 0, we get (2n + 1)2 − 4y − 3 = 0 =⇒ 4n2 + 1 + 4n − 4y − 3 = 0 =⇒ 4n2 + 4n − 4y = 2 =⇒ 2n2 + 2n − 2y = 1 =⇒ 2(n2 + n − 1) = 1 =⇒ 1 is even. This is a contradiction. We can thus arrive at the conclusion that our assumption, there exists x, y ∈ Z such that x2 − 4y − 3 = 0, is wrong. implies there exists x, y ∈ Z such that x2 − 4y − 3 = 0. Q5. Prove the following by Contrapositive 1. ∀n ∈ Z, if nk is even, then n is even. 2. ∀x, y ∈ Z, if x2 (y 2 − 2y) is odd, then x and y are odd. 3. ∀x ∈ R, if x2 + 5x < 0, then x < 0 4. If n is odd, then (n2 − 1) is divisible by 8. 5. If n ∈ N and 2n − 1 is prime, then n is prime. 6. ∀x, y ∈ Z and n ∈ N, if x3 ≡ y 3 (mod n) Ans 1
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