BQ #4: Unit T Concept 3

• Why is a “normal” tangent graph uphill, but a “normal” Cotangent graph downhill? Use unit circle ratios to explain.
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• A cotangent and tangent have goes different ways because of their ratios. Cotangent with x/y and tangent with y/x. These affect the graphs because it determines where the asymptotes will be. In a tangent graph when sine is 0 there will be an asymptote and when cosine is 0 there will be an asymptote for the cotangent graph. In the unit circle the quadrants are exactly the same but the ratio changes the graph. In quadrant 1 they are both positive but since sine is 0 at 90 degrees the tangent graph needs to go uphill in order to follow the unit circle of being positive and get near the asymptote. For the cotangent graph the asymptote is at 0 so the graph needs to start up near the asymptote to be positive then go downhill to be negative in the next quadrant.

BQ #3: Unit T Concept 1-3

• How do the graphs of sine and cosine relate to each of the others?  Emphasize asymptotes in your response.

Sine and cosine relate to generally all the other graphs. In tangent, tangent is equal to sin/cos. So when cosine is equal to 0 there will be an asymptote. This means there will be an asymptote at 90 degrees, pi/2 and 270 degrees, 3pi/2. At these two points tangent will have have an asymptote. For cotangent the ratio is cos/sin. So when sine is 0 cotangent will have an asymptote. In cosecant graph we know the ratio is the inverse of sine, 1/sin. So when sine is at 0 or 180 degrees there will be an asymptote for the cosecant graph. The secant graph relies on cosine to be 0 for there to be an asymptote since the ratio is 1/cos. Sine and cosine relate to the graphs because they are apart of their ratios.

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BQ #5: Unit T Concept 1-3

          Why do sine and cosine NOT have asymptotes, but the other four trig graphs do? Use unit circle ratios to explain.

Sine and cosine graphs will never have asymptotes and reason being is their unit circle ratio. The ratio for sine is y/r and for cosine it is x/r. In the unit circle we know that r will always equal 1. And we know that asymptotes are there when it is undefined which means there is a 0 as the denominator. But for sine and cosine according to the ratio it will always be over 1 keeping it from being undefined. All the other graphs may have asymptotes because their ratios are either over x or y. And it is possible for the x and y values to be 0. When any ratio is over 0 it becomes undefined creating an asymptote.

BQ #2 Unit T

How do the trig graphs relate to the unit circle?

The trig graphs relate to the unit circle with the use of the quadrants in the unit circle.For example sine is positive in quadrants 1 and 2 so the graph will be positive through pi since the end of the second quadrant is 180. As soon as the graph passes pi it becomes negative because that's where in quadrant 3 sine becomes negative. The graph will stay negative through quadrant 4, 2pi, because of the unit circle. Once the graph gets to 2 pi the graph as well as the unit circle start over. Since the pattern of this will begin again, the first whole time the graph goes through the unit circle is called a period. This is how the graph of a trig function comes from the unit circle.

Why is period for sine and cosine 2pi whereas period for tangent and contingent is pi?
This is so because sine and cosine have to go through the whole unit circle before it repeats itself again and to go around the whole unit circle is 360 degrees, or 2pi. Tangent and cotangent is only pi because in the unit circle their quadrants are positive negative positive negative. So within the first two quadrants tangent has gone through a period because after that it will already start repeating itself. The end of quadrant 2 would be 180 or pi. Leaving tangent and cotangent pi to become a period.

 How does the fact that sine and cosine have amplitudes of one (and the other trig functions don’t have amplitudes) relate to what we know about the Unit Circle?
Sine and cosine are the only trig functions that have amplitudes because these are the only ones that have restrictions. In the unit circle sine and cosine can't be greater than 1 our less than -1. All the other trig functions do not have restrictions therefore they do not contain amplitudes.

Reflection #1 - Unit Q

24. What does it actually mean to verify a trig identity?
        
      To verify a trig function is to make sure the equation is true by having both sides equal to each other. In order to do this we must not touch the right side of the equal sign. We must use identities to change the equation and find something to cancel out. Verifying a trig function is making both sides of equal sign look identical. 

25.What tips and tricks have you found helpful?

     A trick I have found helpful is looking for the cosine and sines to change into. Doing this makes it easier to change it into another function. It is also helpful to label the steps you are doing because it will help know where you are in the problem. And re-watch videos that you don't understand. Things make more sense when it's explained the second time. 

26.Explain your thought process and steps you take in verifying a trig identity. 

     My thought process looks for a trig function that can be changed in to either cosine or sine. If there is no possible way to do this then I will look for any other identity to replace the original function. If the function is complicated I will seek to split them apart such as (1/tanxsinx • secx/1). In this we split the original equation of secx/tanxsinx. After looking to split the functions I will see if there is any possible way to cancel anything out. This will lead to verifying the trig function.