Everything Maths Grade 10

(Marvins-Underground-K-12) #1
0

0 ◦
360 ◦

90 ◦

180 ◦

270 ◦

Quadrant II Quadrant I

Quadrant III Quadrant IV

A
all ratios

S
sin

T
tan

C
cos

This diagram is known as the CAST diagram.


We note the following using the general definitions of the trigonometric ratios:



  • Quadrant I
    Both thexandyvalues are positive so all ratios are positive in this quadrant.

  • Quadrant II
    Theyvalues are positive thereforesinand cosec are positive in this quadrant (recall thatsinand cosec
    are defined in terms ofyandr).

  • Quadrant III
    Both thexand theyvalues are negative thereforetanandcotare positive in this quadrant (recall that
    tanandcotare defined in terms ofxandy).

  • Quadrant IV
    Thexvalues are positive thereforecosandsecare positive in this quadrant (recall thatcosandsecare
    defined in terms ofxandr).


IMPORTANT!


The hypotenuse,r, is a length, and is therefore always positive.


VISIT:


The following video provides a summary of the trigonometric ratios in the Cartesian plane.
See video:2FSNatwww.everythingmaths.co.za

Special angles in the Cartesian plane


When working in the Cartesian plane we include two other special angles in right-angled triangles: 0° and
90°.


Notice that when= 0°the length of the opposite side is equal to 0 and the length of the adjacent side is
equal to the length of the hypotenuse.


Chapter 5. Trigonometry 133
Free download pdf