1 Limits And Continuity 2 The Derivative 3 Topics In Differentiation 4 The Derivative In Graphing And Applications 5 Integration 6 Applications Of The Definite Integral In Geometry, Science, And Engineering 7 Principles Of Integral Evaluation 8 Mathematical Modeling With Differential Equations 9 Infinite Series 10 Parametric And Polar Curves; Conic Sections 11 Three-dimensional Space; Vectors 12 Vector-valued Functions 13 Partial Derivatives 14 Multiple Integrals 15 Topics In Vector Calculus expand_more
1.1 Limits (an Intuitive Approach) 1.2 Computing Limits 1.3 Limits At Infinity; End Behavior Of A Function 1.4 Limits (discussed More Rigorously) 1.5 Continuity 1.6 Continuity Of Trigonometric Functions 1.7 Inverse Trigonometric Functions 1.8 Exponential And Logarithmic Functions Chapter Questions expand_more
Problem 1QCE: The definition of a two-sided limit states: limxafx=L if given any number there is a number such... Problem 2QCE: Suppose that fx is a function such that for any given 0, the condition 0x1/2 guarantees that fx5 .... Problem 3QCE: Suppose that is any positive number. Find the largest value of such that 5x10 if 0x2 . Problem 4QCE: The definition of limit at + states: limx+fx=L if given any number there is a positive number such... Problem 5QCE: Find the smallest positive number N such that for each xN, the value of fx=1/x is within 0.01 of 0 . Problem 1ES: (a) Find the largest open interval, centered at the origin on the x-axis , such that for each x in... Problem 2ES Problem 3ES: (a) Find the values of x0 and x1 in the accompanying figure. (b) Find a positive number such that... Problem 4ES: (a) Find the values of x0 and x1 in the accompanying figure. (b) Find a positive number such that... Problem 5ES: Generate the graph of fx=x34x+5 with a graphing utility, and use the graph to find a number such... Problem 6ES Problem 7ES Problem 8ES: Let fx=sin2x/x and use a graphing utility to conjecture the value of L=limxafx . The let =0.1 and... Problem 9ES Problem 10ES: A positive number and the limit L of a function f at a are given. Find a number such that fxL if... Problem 11ES Problem 12ES Problem 13ES: A positive number and the limit L of a function f at a are given. Find a number such that fxL if... Problem 14ES Problem 15ES Problem 16ES Problem 17ES Problem 18ES Problem 19ES: Use Definition 1.4.1 to prove that the limit is correct. limx53x=15 Problem 20ES Problem 21ES Problem 22ES: Use Definition 1.4.1 to prove that the limit is correct. limx3x29x+3=6 Problem 23ES: Use Definition 1.4.1 to prove that the limit is correct. limx1fx=3,wherefx=x+2,x110,x=1 Problem 24ES: Use Definition 1.4.1 to prove that the limit is correct. limx2fx=5,wherefx=92x,x249,x=2 Problem 25ES: Use Definition 1.4.1 to prove that the limit is correct. limx0x=0 Problem 26ES Problem 27ES: Given rigorous definitions of limxa+fx=L and limxafx=L . Problem 28ES: Consider the statement that limxafxL=0 . (a) Using definition 1.4.1, write down precisely what this... Problem 29ES: (a) Show that 3x2+2x20300=3x+32x10 (b) Find an upper bound for 3x+32 if x satisfies x101 . (c) Fill... Problem 30ES: (a) Show that 283x+14=123x+1x2 (b) Is 123x+1 bounded if x24 ? If not, explain; if so, give a bound.... Problem 31ES: Use Definition 1.4.1 to prove that the stated limit is correct. In each case, to show that... Problem 32ES: Use Definition 1.4.1 to prove that the stated limit is correct. In each case, to show that... Problem 33ES Problem 34ES Problem 35ES: Use Definition 1.4.1 to prove that the stated limit is correct. In each case, to show that... Problem 36ES: Use Definition 1.4.1 to prove that the stated limit is correct. In each case, to show that... Problem 37ES: Let fx0,ifxisrationalx,ifxisirrational Use Definition 1.4.1 to prove that limx0fx=0 . Problem 38ES: Let fx0,ifxisrational1,ifxisirrational Use Definition 1.4.1 to prove that limx0fx=0 does not exist. Problem 39ES: (a) Find the smallest positive number N such that for each x in the interval N,+ , the value of the... Problem 40ES: In each part, find the smallest positive value of N such that for each x in the interval N,+ , the... Problem 41ES: (a) Find the values of x1 and x2 in the accompanying figure. (b) Find a positive number N such that... Problem 42ES: (a) Find the values of x1 and x2 in the accompanying figure on the next page. (b) Find a positive... Problem 43ES: A positive number and the limit L of a function f at + are given. Find a positive number N such... Problem 44ES: A positive number and the limit L of a function f at + are given. Find a positive number N such... Problem 45ES: A positive number and the limit L of a function f at + are given. Find a positive number N such... Problem 46ES: A positive number and the limit L of a function f at + are given. Find a positive number N such... Problem 47ES: A positive number and the limit L of a function f at are given. Find a positive number N such that... Problem 48ES: A positive number and the limit L of a function f at are given. Find a positive number N such that... Problem 49ES: A positive number and the limit L of a function f at are given. Find a positive number N such that... Problem 50ES Problem 51ES: Use Definition 1.4.2 or 1.4.3 to prove that the stated limit is correct. limx+1x2=0 Problem 52ES Problem 53ES: Use Definition 1.4.2 or 1.4.3 to prove that the stated limit is correct. limx4x12x+5=2 Problem 54ES: Use Definition 1.4.2 or 1.4.3 to prove that the stated limit is correct. limxxx+1=1 Problem 55ES: Use Definition 1.4.2 or 1.4.3 to prove that the stated limit is correct. limx+2xx1=2 Problem 56ES: Use Definition 1.4.2 or 1.4.3 to prove that the stated limit is correct. limxx3x3+2=1 Problem 57ES: (a) Find the largest open interval, centered at the origin on the x-axis , such that for each x in... Problem 58ES: In each part, find the largest open interval centered at x=1, such that for each x in the interval,... Problem 59ES: Use Definition 1.4.4 or 1.4.5 to prove that the stated limit is correct. limx31x32=+ Problem 60ES: Use Definition 1.4.4 or 1.4.5 to prove that the stated limit is correct. limx31x32= Problem 61ES: Use Definition 1.4.4 or 1.4.5 to prove that the stated limit is correct. limx01x=+ Problem 62ES: Use Definition 1.4.4 or 1.4.5 to prove that the stated limit is correct. limx11x1=+ Problem 63ES: Use Definition 1.4.4 or 1.4.5 to prove that the stated limit is correct. limx01x4= Problem 64ES: Use Definition 1.4.4 or 1.4.5 to prove that the stated limit is correct. limx01x4=+ Problem 65ES: Use the definitions in Exercise 27 to prove that the stated one-sided limit is correct. limx2+x+1=3 Problem 66ES: Use the definitions in Exercise 27 to prove that the stated one-sided limit is correct. limx13x+2=5 Problem 67ES: Use the definitions in Exercise 27 to prove that the stated one-sided limit is correct. limx4+x4=0 Problem 68ES: Use the definitions in Exercise 27 to prove that the stated one-sided limit is correct. limx0x=0 Problem 69ES Problem 70ES Problem 71ES: Write out the definition for the corresponding limit in the marginal note on page 36, and use your... Problem 72ES: Write out the definition for the corresponding limit in the marginal note on page 36, and use your... Problem 73ES: Write out the definition for the corresponding limit in the marginal note on page 36, and use your... Problem 74ES: Write out the definition for the corresponding limit in the marginal note on page 36, and use your... Problem 75ES: According to Ohm’s law, when a voltage of V volts is applied across a resistor with a resistance... Problem 76ES Problem 77ES format_list_bulleted