Graph each function over a two-period interval. Give the perio...

Question

Graph each function over a two-period interval. Give the period and amplitude. See Examples 2–5.

y = sin ⅔ x

Accepted Answer

Hello, today we are going to be graphing the trigonometric equation given below. We will be graphing two periods of this equation. And we want to determine the period and amplitude of the equation. So we are given Y is equal to sine A four divided by nine X. Let's go ahead and start by identifying the period and amplitude of this equation. In order to obtain the period in amplitude, we can compare the given equation to the general equation. Y is equal to a multiplied by sine of B multiplied by X minus C plus D. We will start by identifying the amplitude. Now the amplitude is going to equal to the absolute value of A. This is where the variable A is going to be the coefficient in front of the sine function in our equation, the coefficient in front of the sine function is just one. What this means is that the amplitude of the equation will equal to the absolute value of one which will simplify to give us positive one. Now s has a standard amplitude of just one. So this means that we are not going to have a change to the standard amplitude and our range of the function will remain to be negative one to positive one. Now, we will identify the period of the function. The period of a sine function can be defined as two pi divided by the absolute value of the B term. This is where the B term is the coefficient that sits in front of the X minus C term. In our given equation, that coefficient is four divided by nine. So our B term is going to equal to four divided by nine. And that means we can identify our period to be two pi divided by four divided by nine. The absolute value this will simplify to give us two pi divided by positive four divided by nine, which can further be simplified to be 18 pi divided by four, which will give us a final period of nine pi divided by two. Now, the standard period for a sine function is from 0 to 2 pi but since the period is nine pi divided by two, that means the period of our sine function is going to be from 0 to 9 pi divided by two. Now, what this means is that the starting point of the first period of our sine function is going to be at the origin and will end at nine pi divided by two. The zero of the sine function will be the halfway point between zero and nine pi divided by two. And this point will be nine pi divided by four. The maximum value of our first period will be located at the halfway point between zero and nine pi divided by four. This value is going to be nine pi divided by eight. So our maximum value with respect to the Standard Amplitude will be located at nine pi divided by eight comma one. And our minimum value will be located at the halfway point between nine pi divided by four and nine pi divided by two. The halfway value will be 90. I mean, I'm sorry, 27 pi divided by eight and will be located at negative one with respect to the Standard Amplitude. Once we connect the dots, this is going to be the shape of the first period of our sine function. Now this is the shape of the first period, but we want to graph two periods total. The starting point of our second period will be located at nine pi divided by two. But if we add another total of nine pi divided by two, our second period will end at exactly nine pi. The zero will be located at the halfway value between nine pi divided by two and nine pi. This will be location at 27 pi divided by four. The maximum value of the second period is between nine pi divided by two and 27 pi divided by four. So the maximum value of the second period will be located at 45 pi divided by eight comma one and just like the other minimum value, the minimum will be located between 27 pi divided by four and nine pi. This value will be 63 pi divided by eight comma negative one. The second period will follow the same shape as the first period. And once we connect the dots, we will have both periods of sine of four divided by nine X. And this will be the answer to the equation to the problem. So I hope this video helps you in understanding how to approach this type of problem. And I'll go ahead and see you all in the next video.

Graph each function over a two-period interval. Give the period and amplitude. See Examples 2–5.
y = sin ⅔ x

Key Concepts

Period of a Trigonometric Function

Amplitude of a Trigonometric Function

Graphing Trigonometric Functions

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