|
Enhanced graphing capabilities combined with easy-to-use computer features distinguish TI-Nspire technology from traditional graphing calculators.
Extend learning beyond the classroom
TI-Nspire and TI-Nspire CAS handhelds and computer software provide students the option to use any of these as a stand-alone learning tool, at school and at home, extending the learning process beyond the classroom.
Comparably priced
The TI-Nspire handheld is priced comparably to the TI-84 Plus Silver Edition graphing calculator.
Snap-in keypad
The TI-Nspire handheld comes with the snap-in TI-84 Plus Keypad that provides compatibility with TI-83 Plus, TI-84 Plus and TI-84 Plus Silver Edition graphing calculators.
Easy transition to TI-Nspire technology
Whether handhelds are provided by your school or your students bring in personally-owned units, this side-by-side compatibility between TI-Nspire handhelds and existing TI graphing calculators delivers a comfortable transition to TI-Nspire technology. Simply remove the TI-Nspire Keypad and slide in the TI-84 Plus Keypad. It's fast and easy, and fits securely into place.
Exam acceptance
With either keypad in place, the TI-Nspire handheld can be used by students on high-stakes exams that permit TI-83 Plus and/or TI-84 Plus models, such as SAT, ACT, PSAT and AP exams.
Multiple representations
With TI-Nspire™ technology, you can see multiple representations of a single problem. Graphical, geometric, numeric, algebraic and written representations can be explored individually or up to four at a time on the same screen. Simply choose available split-screen options from a drop-down menu to select the number of representations and how to arrange them.
Dynamically linked representations
With TI-Nspire™ technology, the different representations of a problem can be dynamically linked together. This means that changes made to one representation are automatically reflected in others of that same problem, all in real time.
Deeper understanding
Research shows that students learn mathematical concepts more readily and with deeper understanding when they learn across different forms of representation. When they are able to see the math in different ways - through multiple representations - they begin to broaden their critical thinking skills and make meaningful connections.
|