1 / 22

Core 3 Trigonometry

Core 3 Trigonometry. http://www.tes.co.uk/ResourceDetail.aspx?storyCode=3009773. Know the definitions of arcsin arccos arctan in relation to the three basic trigonometrical functions and the graphs, domains and ranges of all these functions. Know the definitions of secant

starbuck
Download Presentation

Core 3 Trigonometry

An Image/Link below is provided (as is) to download presentation Download Policy: Content on the Website is provided to you AS IS for your information and personal use and may not be sold / licensed / shared on other websites without getting consent from its author. Content is provided to you AS IS for your information and personal use only. Download presentation by click this link. While downloading, if for some reason you are not able to download a presentation, the publisher may have deleted the file from their server. During download, if you can't get a presentation, the file might be deleted by the publisher.

E N D

Presentation Transcript


  1. Core 3 Trigonometry http://www.tes.co.uk/ResourceDetail.aspx?storyCode=3009773

  2. Know the definitions of arcsin arccos arctan in relation to the three basic trigonometrical functions and the graphs, domainsand ranges of all these functions

  3. Know the definitions of secant cosecant cotangent in relation to the three basic trigonometrical functions and the graphs, domainsand ranges of all these functions

  4. Understand radian measure as an alternative to degree measure, and be able to switch between the two systems

  5. Know the exact values of sin θ, cos θ and tan θ (where defined) for values of θ in the set Θ = {0°,30 °,45 °,60 °,90 °,180 °,270 °,360 °} and their radian equivalents

  6. Know how to use the unit circle and Pythagoras’ Theorem to deduce the relationship between sin θand cos θ and to deduce the equivalent relationships involving sec θ, cosec θ, tan θ and cot θ

  7. Understand and use the Addition (Compound Angle) formulae for sin(A ± B) , cos(A ± B) and tan(A ± B) to deduce the Double Angle Formulae

  8. Understand and use the Addition formulae for sin(A ± B) , cos(A ± B) and tan(A ± B) And other basic trigonometric identities to prove new identities

  9. Know how to derive the Trigonometric Factor Formulae from the Trigonometric Addition Formulae Know how to use the Factor Formulae to write a sum or difference using sin θ or cos θ to a product using sin θ and cos θ

  10. Know how to use the standard trigonometric identities to find exact values of Trigonometric expressions without a calculator

  11. http://www.gogeometry.com/mindmap/khan_trigonometry_videos_mind_map_elearning.htmlhttp://www.gogeometry.com/mindmap/khan_trigonometry_videos_mind_map_elearning.html

More Related