please show all work. Thanks in advance :) To determine the 5 key points, you want to determine the x-coordinates of...
PLEASE SHOW WORK!!!!! 6) List the 5 key points for each of the following steps 9 if the step is not applicable, just write none), then graph the function, including 2 full periods, be sure to label the axis. y= 2+cos(x+1) Original Points: Amplitude: Period and endpoints: Reflection: Vertical Shift: Graph: 7) Graph the function for 2 full periods. Be sure to show and label the vertical asymptotes as well as the x-intercepts. F(x) = 4 tan (2x) 8) Evaluate...
show full solution thanks MHF 401 Page 5 1 9. For f(x) = sin(2x + 2) +2: (4 marks) (a) Complete a table of values for the "key" points. (c) Write a mapping formula. (e) Sketch the new graph. (b) Sketch the starting function. (d) Determine the translated "key" points. (a) (d) 1x) = sinx x) 0 JI 2 TT 3 2 2 T (c)(x, y) - 11. Prove: sinxtanxsex-cos X
e the amplitude, period, phase shift, vertical shift. Find the coordinates of the first two points (xo, yo) and (x1,y) of the five key points for the trig function y-3 sin(x T) in one period starting with the phase shift. (No need to sketch the graph) e the amplitude, period, phase shift, vertical shift. Find the coordinates of the first two points (xo, yo) and (x1,y) of the five key points for the trig function y-3 sin(x T) in one...
1. Graph one period of the given functions below. You must use radian measure to graph and have numerical scales on both axes. Indicate any vertical asymptotes as dashed lines. Proper labeling is required for full points. a. y = 3 sin(2x – ) - 3 b. y = sec(2x + 1) c. y = tan(2x)
Math 37 7/20/10 Name 1. (5 Points) Show all work to determine cos(172), without the aid of a calculator 2. (5 Points) Show all work to determine sin ). without the aid of a calculator 3. (5 Points) Show all work to determine tan(-) Math 37 7/20/10 4. (5 Points) Show all work to determine csc(-) 5. (5 Points) Show all work to determine sec(-420°) 6. (5 Points) Show all work to determine cot(495) Math 37 7/20/10 Name 7. (10...
Include all relevant work please. s. Consider f(x) = *** a. Find the domain. [3] b. Find any vertical asymptotes. [3] c. Determine if there are any holes. If so, give the coordinates of the hole. [2] d. Find any horizontal or oblique asymptotes. [3] e. Determine if the graph intersects a horizontal/oblique asymptote, if it exists. Show work! [3] f. Sketch a graph of the function. To receive full credit, label any x and y intercepts and the asymptotes....
please help due in 5 min!!! please help do all!!! 12 1. Let F(a)- (a) Determine any discontinuities of F(a) and classify them as either removable or nonre- movable. (b) Determine the any horizontal or vertical asymptotes of F(x). (c) Sketch a graph of F(x), indicating the asymptotes and any removable singular points. Be sure that you choose an appropriate scale. 12 1. Let F(a)- (a) Determine any discontinuities of F(a) and classify them as either removable or nonre- movable....
please show all your work . (6 points) Of the four initial or boundary value problems below, ouly one is guaranteed to have a unique solution according to the Existence and Uniqueness Theorons. Which one i i (a) ty"-Py, + e'y = ), y(1)s 0, V(1) = T. tan (f (b) ty" + 2/-3y = 0, y (0)0. y(0) = 2, y(5) = 0. (d) V, + sec(t)y = sin(2t), . (6 points) Of the four initial or boundary value...
please type up a clear explination for how to do these and explain what the unit circle is. hw due at 12 tonight. thank you! Graph the function. y 3 tan (2x-x) Choose the correct graph of y 3 tan (2x-x). O A. OB. O C. t/2 A 6- /2 4y 6- 6- 3/4 3s/4 /4 5/4 g/4 5x/4 Use a calculator to find the approximate value of the expression. Round the answer to two decimal places. tan 8 tan...
Determine the x-coordinates of the points (if any) at which the graph of each function as a horizontal tangent line. Please include explanation and steps. Thank you! I will rate. Determine the x-coordinates of the points (if any) at which the graph of each function has a horizontal tangent line. (a) g(x) = x2 - 9 (b) r(x) = x4 – 2x2 – 3