Monday, October 28, 2013
Sunday, October 27, 2013
SV #4 : Unit I Concept 2- Graphing logarithmic functions and identifying factors
SV #4
What does the viewer need to pay special attention to in order to understand?
The viewer should pay attention to the fact that in this concept you use x=h instead of y=k. This one is slightly different than concept 1 and so the viewer should be cautious about that. Also, for the domain and range, it is as if they switch places compared to the last concept. The reason is because in this case the range is always all real numbers and then for the domain, it will basically always be the asymptote and then comma to infinity since we are always going to be focused to the right side of the asymptote. Lastly, when it comes to solving for the x and y intercepts just be aware and know how to solve properly.
What does the viewer need to pay special attention to in order to understand?
The viewer should pay attention to the fact that in this concept you use x=h instead of y=k. This one is slightly different than concept 1 and so the viewer should be cautious about that. Also, for the domain and range, it is as if they switch places compared to the last concept. The reason is because in this case the range is always all real numbers and then for the domain, it will basically always be the asymptote and then comma to infinity since we are always going to be focused to the right side of the asymptote. Lastly, when it comes to solving for the x and y intercepts just be aware and know how to solve properly.
Thursday, October 24, 2013
SP # 3: Unit I Concept 1
F(x)= -2(2)^(x+2)-1
For this problem, the first step that we would do is identify a-k and then the asymptote becomes easy (y=k). Then, finding the x and y intercepts would come and we would do so by plugging y as zero when solving for the x intercept and then plugging in zero for x to find the y intercept. The domain and range you can either do before or after graphing the equation. Plug in any key points, just make sure that the third one is your value of h to make it easy. Plot the points and then you are basically done.
What does the viewer need to pay special attention to in order to understand?
While solving the problem the viewer should pay special attention to the original equation and whether a indicates it as below or above the asymptote. This will come in handy for the graphing as well. Now, if and when you get a negative natural log then you have to realize and remember that it means it will be undefined. Remember that the domain is always all real numbers and then since in this case for the range it is below that means that you will start from negative infinity up to the asymptote.
Wednesday, October 16, 2013
SV #3: Unit H Concept 7
SV #3
What does the viewer need to pay special attention to in order to understand?
While watching the video, the viewer should pay special attention when it comes to having the clues in mind due to the fact that when breaking down the fraction given you should know the way to simplify it. Also when it comes to expanding because several times you can forget that you maybe there should be a coefficient since a number appeared more than once. The mistakes that you can make can be rather silly ones so paying attention while working the problem out would be helpful.
Monday, October 7, 2013
SV #2 Unit G Concept 1-7: Finding Vertical/Horizontal Asymptotes, Slants, etc
What is this problem about?
This problem is about finding the vertical asymptotes as well as the horizontal asymptotes and just finding several parts to it. Slants are included as well and a fact you know is that if you have a horizontal asymptote then you do not have a slant or vice versa since you cannot have both in one equation. Graphing it is another step to this and you have to find the domain, x intercepts, and y intercepts as well. There are several steps in this Unit and it requires a lot of memorization. A tip would be studying the flashcards or rehearsing the chants so that you know what to do when looking for a slant or vertical asymptote.
What does the viewer need to pay special attention to in order to understand?
These types of problems are very tricky and can be easy when it comes to messing up and forgetting how to solve for a certain part. The reason is because there are several parts to it and several techniques on how to do it. Now, the viewer has to pay special attention to the rules because if they should realize the fact that if they find a horizontal asymptote, then they should not have a slant. Also, when it comes remembering what to do specifically to find a certain part. They should know exactly what to do when solving and for example know that if looking for a slant then long division is what to use.
This problem is about finding the vertical asymptotes as well as the horizontal asymptotes and just finding several parts to it. Slants are included as well and a fact you know is that if you have a horizontal asymptote then you do not have a slant or vice versa since you cannot have both in one equation. Graphing it is another step to this and you have to find the domain, x intercepts, and y intercepts as well. There are several steps in this Unit and it requires a lot of memorization. A tip would be studying the flashcards or rehearsing the chants so that you know what to do when looking for a slant or vertical asymptote.
What does the viewer need to pay special attention to in order to understand?
These types of problems are very tricky and can be easy when it comes to messing up and forgetting how to solve for a certain part. The reason is because there are several parts to it and several techniques on how to do it. Now, the viewer has to pay special attention to the rules because if they should realize the fact that if they find a horizontal asymptote, then they should not have a slant. Also, when it comes remembering what to do specifically to find a certain part. They should know exactly what to do when solving and for example know that if looking for a slant then long division is what to use.
Subscribe to:
Posts (Atom)