How do you graph #y = 3cos(-2x + pi/2)#? Trigonometry Graphing Trigonometric Functions General Sinusoidal Graphs 1 Answer sankarankalyanam Jun 7, 2018 As below. Explanation: #y = A cos (Bx - C) + D# is the standard form #y = 3 cos (-2x + pi/2)# #A = 3, B = -2, C = pi/2, D = 0# #Amplitude = |A| = 3# #"Period " = (2pi)/|B| = (2pi) / 2 = pi# #"Phase Shift " = -C / B = -(pi/2) / -2 = pi/4#, #color(red)(pi/4 " to the right"# #"Vertical Shift " = 0# graph{3 cos(pi/2 - 2x) [-10, 10, -5, 5]} Answer link Related questions What does sinusoidal mean? Given any sinusoidal equation, how do you identify the type of transformations that are made? How do you graph any sinusoidal graph? What does the coefficients A, B, C, and D to the graph #y=D \pm A \cos(B(x \pm C))#? What is the period, amplitude, and frequency for the graph #f(x) = 1 + 2 \sin(2(x + \pi))#? What is the period, amplitude, and frequency for #f(x)=3+3 cos (\frac{1}{2}(x-frac{\pi}{2}))#? How do you graph #y=2+3 \sin(2(x-1))#? How do you graph #y=2 cos(-x)+3#? How do you graph #y=3cos(4x)#? How do you graph #y=(cos2x)/2#? See all questions in General Sinusoidal Graphs Impact of this question 4498 views around the world You can reuse this answer Creative Commons License