Math 101 Exam 3

Transformations (continued)

Vertical/Horizontal Stretches and compressions: If $k>1$,
- $f(x)=kg(x)$ vertically stretches $g(x)$ by a factor of $k$
- $f(x)=\frac{1}{k}g(x)$ vertically compresses the graph of $g(x)$ by a factor of $k$
- $f(x)=g(kx)$ horizontally compresses $g(x)$ by a factor of $k$
- $f(x)=g(\frac{1}{k}x)$ horizontally stretches the graph of $g(x)$ by a factor of $k$
Combining Transformations: Order matters when we apply multiple types of vertical transformations or multiple types of odd transformations:
- To determine the order of vertical transformations, use PEMDAS
- To determine the order of horizontal transformations, use SADMEP
- You can deal with vertical transformations then horizontal, or vice-versa, the order between the two types doesn't matter.

Quadratic Functions

A quadratic function $f(x)$ is a function that can be written in standard form: $f(x)=ax^2+bx+c$, where $a,b,$ and $c$ are constants and $a\neq 0$.
- Observe that $f(0)=a(0)^2+b(0)+c=c$, so $c$ is the output value of the $y$-intercept. Hence, standard form is useful for finding the $y$-intercept.
The factored form of a quadratic (if it exists) is $f(x)=a(x-r)(x-s)$, where $a\neq 0$ and $r$ and $s$ are the $x$-intercepts.
- Sometimes, the $x$-intercepts can be hard to find. This is why it's handy to have the quadratic formula: $$x=\frac{-b\pm \sqrt{b^2-4ac}}{2a}.$$ This can be handy to indicate there are no $x$-intercepts if $\sqrt{b^2-4ac}$ is not possible to find.
- If a function is in standard form, you can put it into factored form by using the $ac$-method
The vertex form of a quadratic function is $f(x)=a(x-h)^2+k$, where $a\neq 0$, $(h,k)$ is the coordinate of the vertex of the parabola, and $x=h$ is the axis of symmetry for the parabola.
- You can view this as a transformation of the funcion $g(x)=x^2$, where we've shifted horizontally by $h$, vertically by $k$, and stretched or compressed our graph vertically by some factor.
- To get vertex form from standard form, use completing the square.

Combining Functions

Adding, subtracting, dividing, multiplying, scaling, and composing are all ways we can combine functions together
When determining the units of a combination of two functions, study the units of each function

Power Functions

A power function can be written in the form $f(x)=kx^p$, where $k$ and $p$ are constants.
- Just because it doesn't look like a power function, doesn't mean it can't be written as one. For example, $f(x)=\frac{6}{\sqrt{4t}}$ is a power function since $f(x)=\frac{6}{(4t)^{1/2}}=\frac{6}{2t^{1/2}}=3t^{-1/2}$. Here, $k=3$ and $p=-1/2$.
Graphs of $x^p$: See texed version. Use chapter 5 content to sketch graphs of $kx^p$.

Polynomial Functions

A polynomial function is a function that can be written as a sum of power functions whose exponents are non-negative integers. So a polynomial is a combination of special types of power functions.
- So $f(x)=x^4+\pi x^2+3$, linear, and quadratic functions are all examples of polynomials. Functions with negative exponents or exponents that are not whole numbers are not polynomials.
- When a polynomial is written as a sum of power functions, it is in standard form. (Think about the standard form for quadratics.)
- Each power function $kx^p$ is called a term.
- The leading term is the term with the largest exponent.
- The degree is the exponent of the leading term
The long-run behavior of a polynomial is the same as the long-run behavior of its leading term. But it's leading term is a power function... so we can use our graphs of $x^p$. (!!)
We can talk about the short-run behavior of a polynomial if it's in a factored form. Something like $f(x)=2(x-3)^2(x-1)(x+4)^5$, where we have a product of linear polynomials raised to some power.
- A function bounces off of the $x$-axis at zeroes with even multiplicities
- A function crosses through the $x$-axis at zeroes with odd multiplicities
- The sum of the multiplicities ends up being the degree of the polynomial. So the above polynomial has degree 8, and so the leading term is $2x^8$.

And although not on exam 3, the following doesn't really merit it's own page, so it's included here...

Rational Functions

A rational function $r(x)$ can be written as $r(x)=\frac{p(x)}{q(x)}$, where $p(x)$ and $q(x)$ are polynomials, and $q(x)\neq 0$. So a rational function is a combination of polynomials.
- Some simplification may be necessary to show a function is a rational function
The long run behavior of a rational function $r(x)=\frac{p(x)}{q(x)}$ is the same as the long run behavior of the leading term of $p(x)$ divided by the leading term of $q(x)$. This will be a power functions, so we can (again!) use our graphs of $x^p$. (!!)
- For example, if $r(x)=\frac{x^3+x^2+1}{3x^4+3}$, the long run behavior of $r(x)$ is the same as the long run behavior of $\frac{x^3}{3x^4}=\frac{1}{3}x^{-1}$.
The interesting short run behavior we're interested in involves holes, vertical asymptotes, and zeroes. If $r(x)=\frac{p(x)}{q(x)}$ is a rational function in simplified form,
- The zeroes of $r(x)$ are the same as the zeroes of $p(x)$.
- The vertical asymptotes of $r(x)$ are the same as the zeroes of $q(x)$.
- The holes come from the version of $r(x)$ that is not in simplified form -- it's the zeroes that $q(x)$ and $p(x)$ both have in common. These correspond to the factors you cancelled to get $r(x)$ into simplified form.

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