Find all cube roots of (-8).
(x^2 < 1 \Rightarrow x^2 -1 < 0 \Rightarrow (x-1)(x+1) < 0). Product negative iff one factor positive, the other negative. Case 1: (x-1<0) and (x+1>0) → (x<1) and (x>-1) → (-1<x<1). Case 2: (x-1>0) and (x+1<0) impossible (would require (x>1) and (x<-1)). Thus (-1<x<1). Concise Introduction To Pure Mathematics Solutions Manual
Assume (\sqrt2 = p/q) in lowest terms ((p,q\in\mathbbZ), (\gcd(p,q)=1)). Squaring: (2q^2 = p^2 \Rightarrow p^2) even (\Rightarrow p) even. Write (p=2k). Then (2q^2 = 4k^2 \Rightarrow q^2 = 2k^2 \Rightarrow q) even. Contradiction since (\gcd(p,q)\ge 2). Hence (\sqrt2) irrational. Chapter 2 – Natural Numbers and Induction Exercise 2.3 Prove by induction: (1 + 2 + \dots + n = \fracn(n+1)2) for all (n\in\mathbbN). Find all cube roots of (-8)
[ A\cup B = 1,2,3,4,\quad A\cap B = 2,3 ] [ A\setminus B = 1,\quad B\setminus A = 4 ] Remark : Set difference removes elements of the second set from the first. Case 1: (x-1<0) and (x+1>0) → (x<1) and
But must exclude numbers starting with 0? If first digit is 0, it’s not a 4‑digit number. Count invalid: Fix first digit=0 and it’s one of the two even positions. Choose other even position (3 ways), fill that even (5 ways). Fill two odd positions (5^2). So invalid = (3\times 5\times 25 = 375). Valid = (3750 - 375 = 3375).