WPP #4: Unit I Concept 3-5 - Investment application problem

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SV #4: Unit I Concept 2 - Graphing logarithmic equations

   The viewers need to pay special attention on how the asymptote is found. The asymptote equation is x=h and h comes from the "base of" portion of the log and is equal to 0. In this video for example, the "base of" is x+2, it is equal to 0 and solve algebraically to get the asymptote of x=-2. The viewer also need to pay attention to how the x and y intercepts are solve. For the x intercept, the equation is equaled to 0 and solved algebraically, however exponentiate is required. For the y intercept, x is 0 and solved algebraically; in this video log base b of b=1 property is used. And finally, the range is always (-infinity, infinity), but the domain is (asymptote, infinity).

SP #3: Unit I Concept 1 - Graphing exponential equations w/out x-intercept

     The viewer needs to pay special attention to on how the aymtptote was found and the restrictions on the range. Remember "EXPONENTIAL YaK Died", which means that in an exponential graph, y=k and there are no restriction on the domain. The range (y-intervals) depends on the asymptote. The viewer also needs to pay special attention to why this graph does not have an x-intercept. There can be no natural log of a negative number, which results to no solution/no x-intercept. For y-intercept, make y equal 0. And finally, remember that if +a will place the graph above the asymptote, and -a below; if |b|<1 the graph is close to the asymptote to the right side and |b|>1 is on the left; x+h shifts the graph left and right; and fourthly, "k" is the asymptote.

SV #3: Unit H Concept 7 - Finding logs with given approximations

          The viewer needs to pay special attention to the approximations that he/she would use and the ones on the video. There are several ways to factor the logs, and the approximations, itself, can be factored (for ex. in this video: 4 and 2). Remember that when expanding logs: multiplication corresponds to addition; division corresponds with subtraction; and exponents move to the front of the log and act like coefficients. And finally, one must know and remember that logbb=1 and logb1=0, which serves as two extra approximations.

SV #2: Unit G Concepts 1-7 - Finding all parts and graphing a rational function

     This problem is about graphing rational functions. The equations is a fraction with polynomials on both numerator and denominator. The problem contains several steps in order to graph the function and it's asymptotes. In order to graph it, we must find the domain, x-intercept(s), y-intercept(s), and a few points. This problem also contains:

• a numerator with a degree of 3
• a denominator with a degree of 2
• one hole
• one vertical asymptote

The viewer needs to pay special attention to the degrees to understand the rules of finding the asymptotes.(There is no horizaontal asymptote because the degree is bigger on the top. To find the slant asymptote,, long division is used. Factor and simplify the equation, and make the denominator equal to 0 to find the vertical asymptote. The common factors are equaled to 0 and are the holes.) The viewer also needs to pay attention the graph. In order for the graph to fit, the intervals were changed: x by 1s and y by 2s. Remember that DIVAH stands for Domain Is Vertical Asymptote(s) and Holes.To find the x-intercept(s), y equals to 0, and vice versa.