5. Sketch the graph of z= -3+4i and its conjugate. (Label each graph correctly). y 5 4 + 3 2 1+ + 1 3 -5 -4 -3 -2 -21 4 5 N -27 -3 - 4 -5
5 Draw a computational graph to compute the function f(, y) ( graph to compute f (2,3) -y). Use the Draw a reverse mode graph to compute the derivatives f/0x and อ//ay for f 3( y). Use the graph to find those derivatives at 2 and 3. 6
5 Draw a computational graph to compute the function f(, y) ( graph to compute f (2,3) -y). Use the Draw a reverse mode graph to compute the derivatives f/0x and อ//ay...
UNIT 5 - CHALLENGE 3: Exponential and The graph or the exponential function y =3is the graph of the logarithmic function y =log3x reflected over O a.) the y-axis b.) the line y = 1 O c.) the x-axis d.) the line y = x Submit My Answer Type here to search
Question 28 1 pts Solve the problem. Use the graph of y = =* to graph the function. Write the domain and range in interval notation. f(x) = { 1 ++4-3 -10 Domain: (--,) Range: (-0,3)
Problem #5: The graph of f is given to the 4- f() dt 3 right. Let g(x) y f(x) 2 2 1 0 1 3 1 (a) Find g(3) (b) Find g'(1) (c) Find g"(-2) (d) On what interval is g decreasing? Enter your answer symbolically, as in these examples Problem #5(a): #5(b) Pr Problem #5(c): If your interval is (a,b) then enter a,b in the answer box. Problem #5(d): Submit Problem # 5 for Grading Your work has been...
(1 point) The following masses mare located at the given points P: m = 6, mass of the system. P1(1,5) m2 = 5, P2(3,-2) m3 = 10, P3(-2, -1) Find the moments Mx, My, and the x and y-coordinates of the center of M, = My = x-coordinate of the center of mass: x= y-coordinate of the center of mass: y =
Problem 5: Reading from a graph This is a snapshot of a harmonic wave y-A cos [2π (x-T)| taken at a time t -3s. A COS 2T y(m) 2 a) What is the amplitude A, wavelength A, period T (if there are more options, pick the biggest value) and the di- rection of the propagation of X(m) 4 the wave b) What is the speed of the prop- agation of the wave given λ and l from previous question! 2
2. The following graph is a graph of weekly hundred labor hours are used and y thousand refrigerators are produced. costs (in thousands $) for a certain company when x Mark the critical point on the graph with an X 201 a. b. Is the critical point a relative maximum, relative minimum or a saddle point 15 200 300 400 500 y 10 c. Interpret the critical point (3 coordinates!) in the context of the problem. 5- 10 15 5...
y=(x-1)3(x+7)5(x-11)10 Graph
[21 Marks] APPLICATIONS: 1. Sketch the graph of y = -2(0.5) +5. [6] Parent function: y = 0.5 y=-2(0.5)' +5 у у х -3 -2 -1 0 1 х -3 -2 -1 0 1 State the following for the graph y = -2(0.5)* +5 Equation of the horizontal asymptote: y-intercept Range APPLICATIONS: [21 Marks] 1. Sketch the graph of y = -2(0.5)* +5. [6] Parent function: y = 0.5% y = -2(0.5)* +5 у у х -3 -2 -1 0...