av Yap Wei Li 13 år siden
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Examples:
3. With 2x Sin2x = 0.55 Shift sin 0.55 2X = 0.58, 2.56 ( π-0.58) X= 0.29, 1.28
2. With special angle: Sin x = ½ x= π/6 Sin is also positive in the 2nd quadrant x=π-π/6 =5π/6
1. Without special angle: Cos x = 0.45 Shift cos 0.45 X= 1.10 Cos is also positive in 4th quadrant X= 1.10 + π = 4.24
2. Special Angles Most of the angles, you can use your calculator and use the shift sin/cos/tan function to find your answers. However, for special angles sometimes the calculator can mislead you. So it is best to memorize the special angles. In case you forgot the special angles, here are they: π/3,π/6,π/4 Please remember that the CAST rule applies for special angles also.
Secondly, to find the angle on the 2nd, 3rd and 4th quadrant, you must remember these few things: 2nd quadrant: π-θ 3rd quadrant: π+ θ 4th quadrant: 2π-θ
1. The CAST rule. According to the CAST rule, any angles in the first quadrant will be positive. ONLY sine will be positive on the second quadrant. ONLY tangent will be positive on the third quadrant. And ONLY cosine will be positive on fourth quadrant.
c=vertical shift
d=Horizonal shift/phase shift
k=change in period (Horizontal stretch/Horizontal compression) P=2π/k
a=change in amplitude(vertical stretch/vertical compression)
Example: 〖tan〗^(-1 ) (1)=π/4
Example: 〖sin〗^(-1 ) (√3/2)= π/3
Example: 〖cos〗^(-1 ) (1/2)=π/3
