MAT137Y1 Lecture Notes - Lecture 16: Infimum And Supremum, Empty Set

Question 4. Consider the following subsets of the real numbers. I'l write No for the set of positive integers. A- -1,5.2, 1,3.7) B=[2.3)-(x E R : 2 3) に1 G-cos(n) nEN H-(100n-n2 : n EN) Determine which of these sets have upper bounds. For each set that has an upper bound give two different upper bounds and say what you think the least upper bound is. If you are confident of what the least upper bound is then prove it, otherwise just say that you can't prove it. Note that for a mathematician "confidence of truth" "ability to prove".

Find the smallest positive integer and the largest negative integer that, by the Upper- and Lower-Bound Theorem, are upper and lower bounds for the real zeros of the polynomial function. P(x) = x^3 + 6x^2 - 3x - 5 Write the leading coefficient of the polynomial P(x) = x^3 + 6x^2 - 3x - 5. Recall the Upper- and Lower-Bound Theorem. Let P be a polynomial function with real coefficients, Use synthetic division to divide P by x - b, where b a nonzero real number. For the upper bound: If b > and the leading coefficient of P is positive, then b is an upper bound for the real zeros of P provided all of the numbers in the bottom row of the synthetic division are positive. If b > and the leading coefficient of P is negative, then b is an upper bound for the real zeros of P provided all of the numbers in the bottom row of the synthetic division are negative. For the lower bound: If b

CHAPTER PRECALCULUS REVIEW Right Circular Cylinder Right Circular Cone volume mrh lateral area 27trh total surface area-2rr2 + 2trh slant height = lateral area-ar-/rr total surface area-πr2 + π^/T+ EXERCISES 1.2 Exercises 1-10. Is the number rational or irrational? 1. 3.2.131313 .. . = 2. 3. 41. 10, 1,2,3,4) 43. The set of even integers. 44. (x:x s4). 45, (x êµ° > 3. 6, π-2. s. 0.125 47. Te set ofnational numbers less than、压 Ezercises 11-16. Replace the symbol e by MLet x-2 and define ì œ= -for n= Find at least five values for ì œ. Is the set ) bounded above, bounded be- 1,2, 3, 4, S = (xo, xi, χ2 . , Xn, low, bounded? If so, give a lower bound and/or an upper bound for S. If n is a large positive integer, what is the ap 18.1-4. 20.1-5-18 22-12-지. proximate value of x,? 50. Rework Exercise 49 with 10 = 3 and x. Exercises 51-56. Write the expression in factored form 231 +4x 54.27x3-8 56. 4x+4x2 +1 53. 8r6 +64 55. 4x+12x +9 Exercises 57-64. Find the real roots of the equation. 57. r1-1-2-0. 5%22-6叶归0. 61. r2-2r + 2-0. 63. z2 + 4x + 13 = 0, 64, x2-2x+5=0. Exerclses 65-69. Evaluate. 65. 51. 27.x2