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mathematics
calculus graphical, numerical, algebraic
Questions and Answers of
Calculus Graphical, Numerical, Algebraic
In Exercises a table of values is given for the linear function f (x) = mx + b. Determine m and b. X 2 4 6 f(x) -1 -4 -7
For a curve to be symmetric about the x-axis, the point (x, y) must lie on the curve if and only if the point (x, -y) lies on the curve. Explain why a curve that is symmetric about the x-axis is not
In Exercises solve the equation in the specified interval.cot x = - 1, - ∞ < x < ∞
The vertical line test to determine whether a curve is the graph of a function states: If every vertical line in the xy-plane intersects a given curve in at most one point, then the curve is the
In Exercises solve the equation algebraically. Support your solution graphically.ex + e-x = 3
In Exercises write an equation for the line through P that is (a) Parallel to L, (b) Perpendicular to LP(-2, 2), L: 2x + y = 4
In Exercises write an equation for the line through P that is (a) Parallel to L, (b) Perpendicular to LP(-2,4), L: x = 5
In Exercise graph the piecewise-defined functions. (4-x². f(x) = (3/2)x+3/2. x + 3. x < 1 1≤x≤3 x>3
In Exercises find the(a) Domain (b) Range, (c) Graph the function. y = x²/5
In Exercises write an equation for the line through P that is (a) parallel to L, and (b) perpendicular to L P(- l, 1/2), L: y = 3
In Exercises solve the equation in the specified interval.sec x = - 3, - π ≤ x ≤ π
In Exercises find the (a) Slope (b) y-intercept, (c) Graph the line.3x + 4y = 12
In Exercises find the (a) Domain (b) Range, (c) Graph the function. y=√16-x²
In Exercises find the(a) Slope (b) y-intercept, (c) Graph the line. X 3 = 1
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer). I-X y= 11
In Exercises find the (a) Domain (b) Range, (c) Graph the function. y = 3²-x+1
In Exercises refer to the graph ofShown in the figure. Find the values of t that produce the graph in the given quadrant.Quadrant II x = 3-t, y=t-1, -5 ≤t≤5,
In Exercises give the measure of the angle in radians and degrees. Give exact answers whenever possible.tan-1 (- 5)
In Exercises give the measure of the angle in radians and degrees. Give exact answers whenever possible.cos-1 (0.7)
In Exercise graph the piecewise-defined functions. f(x) = x³, (2x-1, x < 0 0≤x≤1 x>1
In Exercises find a parametrization for the part of the graph that lies in Quadrant I.y = x2 + 2x + 2
In Exercises a table of values is given for the linear function f (x) = mx + b. Determine m and b. 1 3 نیا 5 الا f(x) 2 9 16
In Exercises solve the equation algebraically. Support your solution graphically.(1.045)t = 2
In Exercises find the (a) Romain (b) Range, (c) Graph the function. y In (x-3) + 1
In Exercises find a parametrization for the part of the graph that lies in Quadrant I.y = √x + 3
In Exercises find the(a) Domain (b) Range, (c) Graph the function. y=-2 + V1-x
In Exercises solve the equation algebraically. Support your solution graphically.e0.05t = 3
In Exercises find ∫-1 and verify that∫(x) = 2x + 3 (fof ¹)(x) = (f¹ of)(x) =
In Exercises solve the equation in the specified interval.sin x = - 0.5, - ∞ < x < ∞
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer). y = V2-x
Find parametrizations to model the motion of a particle that starts at (a, 0) and traces the circle x2 + y2 = a2, a > 0, as indicated.(a) Once clockwise (b) Once counterclockwise(c) Twice
In Exercises give the measure of the angle in radians and degrees. Give exact answers whenever possible. sin-1 2
In Exercises a parametrization is given for a curve.(a) Graph the curve. What are the initial and terminal points, if any? Indicate the direction in which the curve is traced.(b) Find a Cartesian
Give one way to restrict the domain of the function ∫(x) = x4 - 2 to make the resulting function one-to-one.
In Exercises refer to the graph ofShown in the figure. Find the values of t that produce the graph in the given quadrant.Quadrant I x= 3-t, y=t-1, -5 ≤t≤5,
In Exercises find a parametrization for the curve.The ray (half line) with initial point (2, 3) that passes through the point (-1, -1)
In Exercises find a parametrization for the curve.The ray (half line) with initial point (-1, 2) that passes through the point (0, 0)
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x) = 3-x
In Exercises find the (a) Slope (b) y-intercept, (c) Graph the line.x + y = 2
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x) = ln x
In Exercises find the (a) Domain (b) Range, (c) Graph the function. y = 2e x-3
In Exercises refer to the graph ofShown in the figure. Find the values of t that produce the graph in the given quadrant.Quadrant III x= 3-t, y=t-1, -5≤t≤5,
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer). 1 y=x²-1
In Exercises find the (a) Domain (b) Range, (c) Graph the function. y = tan (2x - 7)
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x) = log x
In Exercises refer to the graph ofShown in the figure. Find the values of t that produce the graph in the given quadrant.Quadrant IV x= 3-t, y=t-1, -5≤t≤5,
In Exercises find the (a) Slope (b) y-intercept, (c) Graph the line. y = 2x + 4
In Exercises solve the equation in the specified interval.tan x = 2.5, 0 ≤ x ≤ 2π
In Exercise graph the piecewise-defined functions. 1. f(x) = {√₁. x < 0 x=0
In Exercises find the (a) Domain (b) Range, (c) Graph the function. y = 2 sin (3x + 7) - 1
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x) = sin-1 x
In Exercises write an equation for the line through P that is (a) Parallel to L, (b) Perpendicular to L P(0, 0), L: y = -x + 2
In Exercises solve the equation in the specified interval.cos x = - 0.7, 2π ≤ x ≤ 4π
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x ) = tan-1 x
In Exercises solve the equation in the specified interval.csc x = 2, 0 < x < 2π
In Exercises specify (a) The period (b) The amplitude(c) Identify the viewing window that is shown y = 2 cos 3x
In Exercises give the measure of the angle in radians and degrees. Give exact answers whenever possible.sin-1 (0.5)
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer). y = X x²-1
In Exercises find the (a) domain and (b) range, and (c) graph the function. y = |x| -2
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x) = 2-x
In Exercises determine whether the function is even, odd, or neither.y = x + x3
In Exercises the line contains the origin and the point in the upper right comer of the grapher screen. Write an equation for the line. [-5, 5] by [-2, 2]
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x) = 3x
In Exercises show that the function is one-to-one, and graph its inverse. y = tan x. 플
In Exercises determine whether the function is even, odd, or neither. y = √x²-1
In Exercises find a parametrization for the curve.The left half of the parabola y = x2 + 2x
In Exercises the line contains the origin and the point in the upper right comer of the grapher screen. Write an equation for the line. [-10, 10] by [-25, 25]
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer).y = √x2 + 2
In Exercises use parametric graphing to graph ∫, ∫-1, and y = x.∫(x) = ex
In Exercises determine whether the function is even, odd, or neither. y = x + cos x
In Exercises show that the function is one-to-one, and graph its inverse.y = cos x, 0 ≤ x ≤ π
In Exercises find a parametrization for the curve.The lower half of the parabola x -1 = y2
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer).y = x2 - 3
In Exercises find ∫-1 and verify that (fof ¹)(x) = (f¹ of)(x) =
In Exercises write a general linear equation for the line through the two points. (-2, 1), (2, -2)
Table 1.21 gives the average monthly temperatures for St. Louis for a 12-month period starting with January. Model the monthly temperature with an equation of the formy in degrees Fahrenheit, t in
In Exercises find a parametrization for the curve.The line segment with endpoints (-1, 3) and (3, -2)
In Exercises determine whether the function is even, odd, or neither. y = 1 - sin x
In Exercises find a parametrization for the curve.The line segment with endpoints (-1, -3) and (4, 1)
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer).y = x + 2
In Exercises find ∫-1 and verify that (fof ¹)(x) = (f¹ of)(x) =
In Exercises write a general linear equation for the line through the two points. (-2, 0), (-2, - 2)
A musical note like that produced with a tuning fork or pitch meter is a pressure wave. Table 1.19 gives frequencies (in Hz) of musical notes on the tempered scale. The pressure versus time tuning
In Exercises determine whether the function is even, odd, or neither. y = x + 1 x³ - 2x
In Exercises a parametrization is given for a curve.(a) Graph the curve. What are the initial and terminal points, if any? Indicate the direction in which the curve is traced.(b) Find a Cartesian
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer).y = x + x2
In Exercises write a general linear equation for the line through the two points.(1, 1), (2, 1)
In Exercises find ∫-1 and verify that (fof ¹)(x) = (f¹ of)(x) =
In Exercises determine whether the function is even, odd, or neither. y = sec x tan x
In Exercises specify (a) The period (b) The amplitude(c) Identify the viewing window that is shown y = cos TX M
In Exercises a parametrization is given for a curve.(a) Graph the curve. What are the initial and terminal points, if any? Indicate the direction in which the curve is traced.(b) Find a Cartesian
In Exercises determine whether the function is even, odd, or neither. Try to answer without writing anything (except the answer).y = x4
In Exercises write a general linear equation for the line through the two points.(0,0), (2,3)
In Exercises find ∫-1 and verify that (fof ¹)(x) = (f¹ of)(x) =
In Exercises specify (a) The period (b) The amplitude(c) Identify the viewing window that is shown TT y = -4 sin x 3
In Exercises determine whether the function is even, odd, or neither. y = 1 - cos x
In Exercises a parametrization is given for a curve.(a) Graph the curve. What are the initial and terminal points, if any? Indicate the direction in which the curve is traced.(b) Find a Cartesian
In Exercises use a grapher to (a) Identify the domain and range and (b) Draw the graph of the function. y = 1 √4-x²
In Exercises find ∫-1 and verify that∫(x) = x2 + 2x + l, x ≥ - 1 (fof ¹)(x) = (f¹ of)(x) =
In Exercises write the slope-intercept equation for the line with slope m and y-intercept b.m = 1/3, b = -I
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