Transcript CHAPTER 11
CHAPTER 11 Rational and Irrational Numbers Rational Numbers 11-1 Properties of Rational Numbers Rational Numbers • A real number that can be expressed as the quotient of two integers. Examples • 7 = 7/1 • 5 2/3 = 17/3 • .43 = 43/100 • -1 4/5 = -9/5 Write as a quotient of integers •3 • 48% • .60 • - 2 3/5 Which rational number is greater 8/3 or 17/7 Rules • a/c > b/d if and only if ad > bc. • a/c < b/d if and only if ad < bc Examples • 4/7 ? 3/8 • 7/9 ? 4/5 • 8/15 ? 3/4 Density Property • Between every pair of different rational numbers there is another rational number Implication • The density property implies that it is possible to find an unlimited or endless number of rational numbers between two given rational numbers. Formula If a < b, then to find the number halfway from a to b use: a + ½(b – a) Example • Find a rational number between -5/8 and -1/3. Rational Numbers 11-2 Decimal Forms of Rational Numbers Forms of Rational Numbers • Any common fraction can be written as a decimal by dividing the numerator by the denominator. Decimal Forms • Terminating • Nonterminating Examples Express each fraction as a terminating or repeating decimal 5/6 7/11 3 2/7 Rule • For every integer n and every positive integer d, the decimal form of the rational number n/d either terminates or eventually repeats in a block of fewer than d digits. Rule • To express a terminating decimal as a common fraction, express the decimal as a common fraction with a power of 10 as the denominator. Express as a fraction • .38 • .425 Solutions • .38 = 38/100 or 19/50 • .425 = 425/1000= 17/40 Express a Repeating Decimal as a fraction • .542 • let N = 0.542 • Multiply both sides of the equation by a power of 10 Continued • Subtract the original equation from the new equation • Solve Rational Numbers 11-3 Rational Square Roots Rule 2 a If = b, then a is a square root of b. Terminology • Radical sign is • Radicand is the number beneath the radical sign Product Property of Square Roots For any nonnegative real numbers a and b: ab = (a) (b) Quotient Property of Square Roots For any nonnegative real number a and any positive real number b: a/b = (a) /(b) Examples • 36 • 100 • - 81/1600 • 0.04 Irrational Numbers 11-4 Irrational Square Roots Irrational Numbers • Real number that cannot be expressed in the form a/b where a and b are integers. Property of Completeness • Every decimal number represents a real number, and every real number can be represented as a decimal. Rational or Irrational • 17 • 49 • 1.21 • 5 + 2 2 Simplify • 63 • 128 • 50 • 6108 Simplify • 63 = 9 7 = 37 • 128 = 64 2 = 82 • 50 = 25 5 = 55 • 6108= 636 3=36 3 Rational Numbers 11-5 Square Roots of Variable Expressions Simplify • 196y2 • 36x8 2 • m -6m + 9 3 • 18a Solutions • 196y2 = ± 18y • 36x8 = ± 6x4 2 • m -6m + 9 = ±(m -3) 3 • 18a = ± 3a 2a Solve by factoring • Get the equation equal to zero • Factor • Set each factor equal to zero and solve Examples • = 64 • 45r2 – 500 = 0 2 • 81y – 16= 0 2 9x Irrational Numbers 11-6 The Pythagorean Theorem The Pythagorean Theorem In any right triangle, the square of the length of the hypotenuse equals the sum of the squares of the lengths of the 2 2 2 legs. a + b = c Example c a b Example c 8 15 Solution 2 a 2 b 2 c + = 2 2 2 8 + 15 = c 64 + 225 =c2 289 =c2 17 = c Example The length of one side of a right triangle is 28 cm. The length of the hypotenuse is 53 cm. Find the length of the unknown side. Solution 2 a 2 b 2 c + = 2 2 2 a + 28 = 53 a2 + 784 =2809 a2 =2025 a = 45 Converse of the Pythagorean Theorem If the sum of the squares of the lengths of the two shorter sides of a triangle is equal to the square of the length of the longest, then the triangle is a right triangle. The right side is opposite the longest side. Radical Expressions 11-7 Multiplying, Dividing, and Simplifying Radicals Rationalization The process of eliminating a radical from the denominator. Simplest Form • No integral radicand has a perfect-square factor other than 1 • No fractions are under a radical sign, and • No radicals are in a denominator Simplify • 3/5 • 7/ 8 • 3 3/7 • 9 3/ 24 Solution • 3/5 = 3 5 /5 • 7/ 8= 14/4 • 3 3/7= 22 • 9 3/ 24 = 9 2/4 Radical Expressions 11-8 Adding and Subtracting Radicals Simplifying Sums or Differences • Express each radical in simplest form. • Use the distributive property to add or subtract radicals with like radicands. Examples • 47 + 57 • 36 - 213 • 73 - 46 + 248 Solution • 97 • 86 - 213 • 153 -46 Radical Expressions 11-9 Multiplication of Binomials Containing Radicals Terminology • Binomials – variable expressions containing two terms. • Conjugates – binomials that differ only in the sign of one term. Rationalization of Binomials • Use conjugates to rationalize denominators that contain radicals. Simplify • (6 + 11)(6 - 11) 2 • (3 + 5) • (23 - 57) 2 • 3/(5 - 27) Solution • 25 • 14 + 65 • 187 – 2021 • -5 - 2 7 Radical Expressions 11-10 Simple Radical Equations Terminology • Radical equation – an equation that has a variable in the radicand. Examples • d = 1000 •x = 3 •x = ± 3 Solutions • 140 = 2(9.8)d • (5x +1) + 2 = 6 • (11x2 – 63) -2x = 0 End…End…End…End…End... End