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- '''MTH 130 College Algebra.''' 3 hrs. Polynomial, rational, exponential, and logarithmic functions. Graphs, systems of equations and inequalities, * 7.1 Exponential Functions and their Graphs10 KB (1,078 words) - 19:07, 16 December 2016
- where $G:R\to R$ is some function and $q:C_1({\mathbb R})\to C_0({\mathbb R})$ is given by The growth is exponential (geometric), as expected.47 KB (8,415 words) - 15:46, 1 December 2015
- ...plications.''' Functions used in calculus including polynomial, rational, exponential, logarithmic, and trigonometric. Systems of equations and inequalities, con ...ting Information from the Graph of a Function. Average Rate of Change of a Function. Transformations of Functions. Combining Functions. One-to-One Functions an7 KB (890 words) - 16:32, 20 April 2016
- 10 A function as a black box 11 Give the function a domain...16 KB (1,933 words) - 19:50, 28 June 2021
- '''MTH 130 College Algebra.''' 3 hrs. Polynomial, rational, exponential, and logarithmic functions. Graphs, systems of equations and inequalities, 3.2 The Graph of a Function6 KB (752 words) - 04:19, 13 December 2013
- ''MTH 130 College Algebra.'' 3 hrs. Polynomial, rational, exponential, and logarithmic functions. Graphs, systems of equations and inequalities, 3.2 The Graph of a Function6 KB (850 words) - 16:52, 29 November 2014
- $$ \underbrace{x^{2}}_{\text{function}} = \underbrace{1}_{\text{Number}} \to \text{ find a particular number} x$$ $$ u^{2} = \sin x \to \text{ find a particular function } u$$9 KB (1,445 words) - 15:50, 2 May 2011
- 1.5 [[Inverse function|Inverse Function]]s 1.6 [[Exponential and logarithmic functions|Exponential and Logarithmic Functions]]6 KB (634 words) - 16:38, 1 March 2013
- Now graphically, what is the mathematical idea of continuity? A [[continuous function]] should have a "continuous" graph, i.e. one made up of one piece. What doe Let's consider this in detail. Given a point $a$ and a function $f$, we have three non-overlapping pieces:10 KB (1,839 words) - 00:26, 25 September 2013
- 3.2 The Graph of a Function 5.3 The Graph of a Rational Function3 KB (349 words) - 16:29, 8 August 2013
- 3.4 The Real [[Zeros]] of a Polynomial Function 3.5 The Complex Zeros of a Polynomial Function2 KB (269 words) - 18:53, 16 November 2011
- As $\lambda_{1},\lambda_2<0$, we have exponential decay (a stable node of the vector ODE): the friction brings the ODE back t Again, as $\lambda=\lambda_{1}=\lambda_2<0$, we see exponential decay (a stable improper node of the ODE): the ODE's motion dies out, even50 KB (8,692 words) - 14:29, 24 November 2018
- ...dā into any other. In fact, a simpler idea is to push the graph of a given function $f$ to the $x$-axis: <center>homotopy is a continuous transformation of a continuous function.</center>46 KB (7,846 words) - 02:47, 30 November 2015
- .... Graphing calculators and computers. [[Exponential function]]s. [[Inverse function]]s and [[logarithm]]s. ...Writing project: early methods for finding tangents. The [[derivative as a function]].6 KB (794 words) - 16:29, 13 August 2017
- ; Growth : Know if $k > 0$, then this function is increasing and $\lim\limits_{x \to \infty} y(x) = \infty $. ; Decay : if $k < 0$, the this function is decreasing and $\lim\limits_{x \to \infty} y(x) = 0$.8 KB (1,201 words) - 15:45, 2 May 2011
- Sometimes there is a [[continuous function]] or process behind the numbers but often there isn't. The issues one has t What is commonly done is to go back to [[continuous function]]s via [[approximation]], [[interpolation]], [[curve fitting]], etc. This a8 KB (1,196 words) - 13:02, 24 August 2015
- where $G:{\bf R}\to {\bf R}$ is some function and $q:C_1({\mathbb R})\to C_0({\mathbb R})$ is given by The growth is exponential (geometric), as expected. To verify, suppose $b:=[B,B+1]$. Then compute:16 KB (2,913 words) - 22:40, 15 July 2016
- We won't call it "rule" or "law" because it's about a specific function. Compare to: : for any [[differentiable function]] $f\cdot g$ wrt $x$.6 KB (1,004 words) - 16:00, 2 May 2011
- [[image:location as a function of time.png| center]] [[image:velocity as a function of time.png| center]]113 KB (18,425 words) - 13:42, 8 February 2019
- In general, we consider a function: ...the dimension of the geometric object and the "degree" or "order" of this function.18 KB (3,325 words) - 13:32, 26 August 2013
