Math 115 Lab #8
(for two lab periods)
M. Flashman Fall '07
I. Understanding Linear Parameters in Graphs of Trig Functions
- Phase Shift
- Tools for Winplot used in this lab:
- Equation menu
- Animation menu
- Families on Inventory.
- View ... grid.... pi on scales
I.Graphs of Trig Functions
II. Record your answers for the next work and submit them on Moodle by Wednesday, November 7th.
- Circles and the graphs of sin(x) vs Asin(Bx+C): [review in part]
- Set the parameters: A= 1 and B=1.
- Use implicit to graph the equation xx + yy = 1
- Use implicit to graph the equation xx + yy = AA
- Plot the point (cos(h), sin(h))
- Plot the point (Acos(Bh+C), Asin(Bh+C))
- Change scales on X axis to show "pi".
- Plot the point (h, sin(h))
- Plot the point (h, Asin(Bh+C))
- Plot graphs with explicit for
- y = f(x) = sin(x)
- y = g(x) = Asin(Bx+C)
- Use animator A; family A.
- Set A = 1, use animator for B; family B.[See
- Set B = 1, use animator for C; family C.[See A
- The amplitude of the function g is |A|.
- The period of the function g is |2pi/B|. [That is g(x + 2pi/B) = g(x). ]
- The phase shift of the function g is -C/B. [That is g(-C/B) = 0.]
- Find the smallest positive A and B so that y=Acos(Bx) with y(0)=10, y(pi/3)=10.
- Find the smallest positive C where y=cos(x + C) with y(-pi/3)=1.
- Find an estimate for any and all x in [-3,3] where 2sin(x) + 3cos(2x) = 1.
- Find the smallest positive A, B and C so that y=Acos(Bx +C) has amplitude 3, period 2 and y(-1)=3.