Guide to Using the Ti-nspire for Methods - The simple and the overcomplicated Version 1.5 Ok guys and girls, this is a guide/reference for using the Ti-nspire for Mathematical Methods CAS. It go forth hide the simplest of things to a few tricks. This guide has been written for Version 3.1.0.392. To modify go to http://education.ti.com/calculators/downloads/US/Software/Detail?id=6767 undecomposable things will have green headings, complicated things and tricks will be in red. Firstly more or less simple things. Also note that for some questions, to obtain full marks you will make to hump how to do this by hand. Solve, Factor & Expand These are the introductory influences you will need to know. Open Calculate (A) Solve: [Menu] [3] [1] (equation, variable)| thought of action Factor: [Menu] [3] [2] (terms) Expand: [Menu] [3] [3] (terms) Matrices Matrices can be use as an easy way to solve the find the value of m for which there is zero or endlessly umteen solu tions questions. When the equations ax+by=c and dx+ey=f are explicit as a matrix , letting the determinant impact to 0 will allow you to solve for m. E.g.

Find the set of m for which there is no solutions or infinitely some solutions for the equations 2x+3y=4 and mx+y=1 Determinant: [Menu] [7] [3] place in matrix representing the coefficients, solve for det()=0. Remember Remember to taxicab back in to differentiate between the solutions for no solutions and infinitely many solutions. Modulus Functions charm being written as || on paper, the function for the modulus function is abs() (or absolute function). i.e. just add in abs(function) For example and delimit Domains Wh ile graphing or solving, domains can be defi! ned by the addition of |lowerboundIf you want to get a full essay, stage it on our website:
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