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Exercises 1—14, to establish a big-Orelationship, find witnessesCandksuch that
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Chapter 3 Solutions
DISCRETE MATH.+ITS APPLICATIONS CUSTOM
- please solve the questions Q1Let that the function f: R→R (‘R’ stands for real line) defined by; f(x)= 〖(x+1) 〗^3/(〖(x-1) 〗^3 ) ; Check it for following;One-One Function Onto Function Q2 If A=1; B=0; C=1 & D=0 then by using the definition of Boolean algebra make sure that the sum of this term ;(A ̅+B+C ̅+D) must be equal to zero.(b). Let ‘C’ & ‘D’ are any two non-empty sets and there order are as follows; let ; |C| = m and |D| = nWhat is the order of its cartesian productWrite down the power set of its Cartesian productarrow_forward10) Chapter 3.1 Show that the function f (x) = x* is decreasing on the open (Show Graph interval (-00, 0) and increasing on the open interval (0, o0).arrow_forwardAsaparrow_forward
- Use graphs to determine if each function f in Exercises 45–48 is continuous at the given point x = c. [2 – x, if x rational x², if x irrational, 45. f(x) c = 2 x² – 3, if x rational 46. f(x) = { 3x +1, if x irrational, c = 0 [2 – x, if x rational 47. f(x) = { x², if x irrational, c = 1 x² – 3, if x rational 3x +1, if x irrational, 48. f(x) : c = 4arrow_forwardPls help ASAParrow_forwardProve that coth-la = In x +1 for |a> 1 x - 1arrow_forward
- 3.) if f(x)= aw f(x) = x-1 and a (x) = X-1 EX1 and 9 what is the valie of )arrow_forward4. a) Suppose that for some specific problem, heuristic function h is admissible. Is h? admissible? How about h? If your answer is yes for any of these two functions, would you prefer them over h? Explain your answer. b) Prove that if h is consistent, n and n' are two nodes on the path to goal and n' is the successor of n, then f(n) <= f(n').arrow_forwardExercises 121–140: (Refer to Examples 12–14.) Complete the following for the given f(x). (a) Find f(x + h). (b) Find the difference quotient of f and simplify. 121. f(x) = 3 122. f(x) = -5 123. f(x) = 2x + 1 124. f(x) = -3x + 4 %3D 125. f(x) = 4x + 3 126. f(x) = 5x – 6 127. f(x) = -6x² - x + 4 128. f(x) = x² + 4x 129. f(x) = 1 – x² 130. f(x) = 3x² 131. f(x) = 132. /(x) 3D글 = = 132. f(: 133. f(x) = 3x² + 1 134. f(x) = x² –- 2 135. f(x) = -x² + 2r 136. f(x) = -4xr² + 1 137. f(x) = 2x - x +1 138. f(x) = x² + 3x - 2 139. f(x) = x' 140. f(x) = 1 – xarrow_forward
- Linear Algebra: A Modern IntroductionAlgebraISBN:9781285463247Author:David PoolePublisher:Cengage LearningAlgebra & Trigonometry with Analytic GeometryAlgebraISBN:9781133382119Author:SwokowskiPublisher:Cengage