Grade IX Number System Problems

Easy Level (35 Questions)

Is 0 a rational number? Write it in p/q form.
Write the next three natural numbers after 109.
Classify: √4, √9, √16 as rational or irrational.
Find five rational numbers between 0 and 1.
Find three rational numbers between 2 and 3.
Represent 5/2 on the number line.
Without division, state whether 7/8 has terminating or non-terminating decimal.
Write 0.75 as a fraction in lowest terms.
Convert 0.4̅ (0.444…) to p/q form.
Convert 0.12̅3 (0.123123…) to p/q.
Simplify: 25^{1/2}.
Simplify: 64^{1/3}.
Simplify: 81^{3/4}.
Simplify: (1/27)^{1/3}.
Simplify: 8^{2/3}.
Find √2 approximately on number line (up to 1 decimal).
Is π rational or irrational? Give reason.
Give one example each of terminating and non-terminating recurring decimal.
Write 3 rational numbers between 1/4 and 1/3.
Simplify: √36 + √49.
Simplify: (√5)^2.
Rationalize: 1/√2.
Rationalize: 1/(√3 + 1).
Simplify: (√3 + √2)^2.
Find value: 16^{-3/4}.
Express 0.001 as power of 10.
Simplify: 2^5 × 2^{-3}.
Simplify: (3^2)^3.
Is √(4/9) rational? Justify.
Locate √3 geometrically on number line.
Convert 1.272727… to fraction.
Simplify: 125^{2/3}.
Find irrational number between 2 and 3.
Classify 2 + √3 (rational/irrational).
Simplify: 100^{1/2} × 100^{1/2}.

Medium Level (35 Questions)

Prove that √3 is irrational (by contradiction).
Prove that √5 is irrational.
Find six rational numbers between 3/5 and 4/5.
Express 0.235̅ in p/q form.
Without actual division, classify decimal of 23/200.
Rationalize denominator: 5/(√7 + √3).
Rationalize: 1/(√5 + √2).
Simplify: √(16/81) + √(25/100).
If x = 2 + √3, find x + 1/x.
Simplify: (√5 + √2)(√5 – √2).
Simplify: (3 + √2)^2.
Express 5.272727… as fraction.
Simplify: 32^{2/5} × 32^{3/5}.
Simplify: (729)^{1/6}.
Rationalize: 1/(2 + √3 + √5).
Locate √5 on number line (describe construction).
Prove: √2 + √3 is irrational.
Find three different irrationals between 0.12 and 0.13.
Simplify: (64/125)^{-1/3}.
If a = 3 + 2√2, find a^2 + 1/a^2.
Rationalize: (√5 + √3)/(√5 – √3).
Simplify: √(50) – √(18) + √(32).
Convert 0.47̅ to p/q.
Simplify: 243^{2/5}.
Find value: (1/8)^{-2/3}.
Rationalize denominator of 1/(√7 – √6).
Simplify: (√3 + √5)^2 – (√3 – √5)^2.
Express 1.363636… as fraction.
Simplify: 10^{3/2} × 10^{-1/2}.
Find rational number between √2 and √3.
Rationalize: 4/(3 + 2√2).
Simplify: (125 × 64)^{1/3}.
If x = 1/(2 + √3), rationalize and find value.
Prove that 5 – √7 is irrational.
Simplify: √(72) + √(50) – √(8).

Difficult Level (30 Questions)

Rationalize denominator: 1/(√3 + √5 + √7).
If x = 3 + √8, find x^2 + 1/x^2 + x + 1/x.
Simplify: 1/(√4 + √3) + 1/(√4 – √3).
Rationalize: 5 + 2√3 / (7 + 4√3).
Express 0.235235235… (bar on 235) as p/q.
Prove that √2 + √5 is irrational.
Simplify: (√3 + √2 + √5)(√3 + √2 – √5).
Rationalize denominator of 1/(2√3 + 3√2 + √5).
If a = √3 + √2, find a^4 – 10a^2 + 1.
Simplify: (81/16)^{-3/4} × (25/9)^{3/2}.
Find value of x if 3^{x–1} × 9^{x+1} = 27^{2x–1}.
Rationalize: 1/(√10 + √6 + √15 + √9).
Simplify and express in simplest form: √(18 + 10√3).
If x = 1 + √2 + √3, find minimal polynomial or simplified power.
Prove √7 is irrational and then show 2 + 3√7 irrational.
Rationalize: (√5 – √3 – √2)/(√5 + √3 + √2).
Simplify: (√7 + √5 + √3 + √2)^2 – (√7 + √5 – √3 – √2)^2.
Express 0.123456789101112… (Champertnowne like, but simple repeating block) wait – better: 0.123̅456̅ as fraction (two bars).
Find x if (√3)^x = 27^{1/3} × 9^{-1/2}.
Rationalize denominator: 1/(4 + √15 + √10 + √6).
Simplify: √(7 + 4√3).
If a + b = √5 + √3, a – b = √5 – √3, find ab.
Prove that (√2 + √3)^6 + (√2 – √3)^6 is integer.
Rationalize multi-step: 1/(√8 + √6 + √3 + √2).
Simplify: (32)^{3/5} + (243)^{2/5} – (1/32)^{-3/5}.
Find rationalised form and value: 1/(3 + 2√2 + √3).
Prove 3 + 2√5 is irrational using contradiction.
Simplify √(12 + 6√3 + 4√2 + 2√6).
If x = √(a + √b) + √(a – √b), find x^2.
Combined: Rationalize 1/(√7 – √5) + 1/(√5 – √3) + 1/(√3 – √7) and simplify.