Concise Introduction To Pure Mathematics Solutions Manual May 2026

Assume (\sqrt3=p/q) in lowest terms. Then (3q^2=p^2). So 3 divides (p^2) ⇒ 3 divides (p) (since 3 prime). Write (p=3k). Then (3q^2=9k^2\Rightarrow q^2=3k^2) ⇒ 3 divides (q). Contradiction ((\gcd(p,q)\ge 3)). Chapter 5 – Complex Numbers Exercise 5.2 Find ((2+3i)/(1-i)) in (a+bi) form.

Induction: Base (n=1): (1-1=0) divisible by 3. Assume (3 \mid k^3-k). Then [ (k+1)^3-(k+1) = k^3+3k^2+3k+1 - k -1 = (k^3-k) + 3(k^2+k) ] Both terms divisible by 3 → sum divisible by 3. QED. Chapter 3 – Integers and Modular Arithmetic Exercise 3.2 Find the remainder when (2^100) is divided by 7.

: 3375. Chapter 9 – Sequences and Series Exercise 9.1 Prove (\lim_n\to\infty \frac3n+12n+5 = \frac32). Concise Introduction To Pure Mathematics Solutions Manual

Find remainder when (x^100) is divided by (x^2-1).

Find all cube roots of (-8).

Case 1: first digit odd (4 choices: 1,3,5,7,9? Actually 5 odds, but careful: first digit ≠0, so even allowed but handled separately). Better systematic: Choose positions for the two even digits: (\binom42=6) ways.

[ \left|\frac3n+12n+5 - \frac32\right| = \left|\frac2(3n+1) - 3(2n+5)2(2n+5)\right| = \left|\frac-132(2n+5)\right| = \frac132(2n+5) < \frac134n ] Given (\varepsilon>0), choose (N > \frac134\varepsilon). Then for (n\ge N), (\frac134n<\varepsilon), so the difference (<\varepsilon). QED. Chapter 10 – Continuity and Limits Exercise 10.4 Show (f(x)=x^2) is continuous at (x=2). Assume (\sqrt3=p/q) in lowest terms

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).