2. A rational function is any function which can be written as the ratio of two polynomial functions. What is a Rational Function?
3. Asymptotes Asymptote - a straight line that is the limiting value of a curve The red line on the graph indicates that y=x is the asymptote.
4. 2 types There are two types of asymptotes. Vertical Asymptote- x=___, ** CAN’T BE CROSSED**. Can be found be the zeros, or x- intercepts, which are in the denominator. Horizontal Asymptote- y=___, ** Can be crossed*. But there are three different ways you can find a horizontal asymptote.
5. VA and HA The Vertical Asymptote of out function would be, x=-3 and x=1 The Horizontal Asymptote is y=0.
6. Three types of Horizontal asymptote. Type 1: when the degree of the denominator- degree being the exponential value of x- is larger than the degree of the numerator, then the HA is y=0. Type 2: When the numerator degree and the denominator degree are the same , y= The HA= y= * When the power of the numerator is bigger than the denominator, the asymptote with be a slant, or oblique. To find the horizontal asymptote of these equations you have to use long division.
7. X-intercepts. To find the x- intercepts you have to take the numerator and set it equal to zero. Going back to the first equation this is what find the x-ints, would look like. The you solve for x by dividing both sides by -5 . So you would get, and since zero can’t be divided , There are no x- intercepts.
8. Y- intercepts. To find the y- intercepts you set x = to zero. And it equals 0, so the y- intercept would be at the origin, (0,0).
9. tables To find possible points of where the line would cross on a graph, you make an x-y tables, of x’s to the left and right of each asymptote.
10. Domain and Range The domain of a function is the set of all possible x values which will make the function "work" and will output real y-values The range of a function is the possible y values of a function that result when we substitute all the possible x-values into the function.
11. The domain in the graph is (-∞,o)U (0,∞)The range would be the same.
12. Domain and Range cont. The Domain of this function would be D: (-∞,-3] U [-3,1] U [1,∞) The Range would be (-∞,∞)