Graphing Sine and Cosine Section 4.5

Objectives Students will be able to… Use the unit circle to generate the parent graphs of sine and cosine Recognize the sine and cosine parent graphs by their shape Graph the sine and cosine functions using transformations Determine all characteristics given the equation (amplitude, phase shift, vertical shift) Determine starting point and ending point of graph (5 points labeled on x-axis – 1 cycle) Write the equation given the characteristics of the trig function or the graph

Discovery Today, you are going to discover what the graphs of sine and cosine look like. Complete the table of values given to you using your Unit Circle. Plot those points on a graph and connect the dots. Enter your values into the stat plot on your calculator and plot the scatterplot. Go to stat, calc, sinreg. Does your graph match the one on the calculator?

This is what you SHOULD have gotten! Graph y = sin x y = cos x

Angle (degrees) Value Cos Sin   30 45 60 90 120 135 150 180 210 225 240 270 300 315 330 360 390 405 420 450 480 495 510 540

Changing the Graph Just like any other parent graph, we can shift and change this graph in any way that we want. First though, what is the domain and range of our parent functions? What is the period of the graphs? What is the amplitude?

𝒂∗𝒇(𝒃(𝒙−𝒄))+𝒅 Again, using the same equation as before to shift the graph. Let’s see what happens when we change these letters. Graphs!

What Does Each Parameter Do? General form “a” stands for _____________ Makes graph ___________ or _____________. “b” determines the ______________ b>1 period _____________ 0<b<1 period _____________ “c” moves the graph __________ or __________. C<0 graph moves _____________. C>0 graph moves ______________. “d” moves graph ______ or _________. d>0 moves graph _________. d<0 moves graph __________.

To Graph… Procedures: Find the … Graph the … Use amplitude to graph the … Adjust for … And then for … Plot the… Then …

PRACTICE!! 1. 𝑦=2 sin 𝑥 2. 𝑦=2 cos 𝑥 +3 3. 𝑦= sin (2𝑥) 4. 𝑦= cos 1 2 𝑥 +4 5. 𝑦= sin 𝑥−90° 6. 𝑦= cos 𝑥+ 𝜋 4

When would I use this? The normal monthly temperature in degrees Fahrenheit in Albany, NY, for six months are given in the table. Create a scatterplot of the data. x(month) y(temperature) Jan 21 Mar 34 May 58 Jul 72 Sept 61 Nov 40

How? Find a trigonometric model that fits the data. Steps to follow: Enter your data in LIST Check your WINDOW settings to make sure your values will be seen in the viewing window Turn on Plot1 STAT  CALC  SinReg This will give you the values for the sine curve created by the data To graph the sine function created … Y= VARS Statistics  EQ  RegEq GRAPH

What is the period of the model? Find the normal temperature in December. A painting company will accept exterior jobs only when the normal temperature is 64 degrees or higher. During what month will this company accept exterior jobs?

Closure On Post – It Note: Identify the amplitude, period and 5 critical points 𝑦= 1 2 sin 𝑥− 𝜋 3

Homework Worksheet 4.5 (identify amplitude, period and 5 critical points) No Graphing (yet!)