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Trigonometry: Review. SOHCAHTOA Show that tan Ө =sin Ө / cos Ө Pythagoras a 2 +b 2 =c 2 Show that cos 2 Ө +sin 2 Ө =1 (÷c & substitute with trig ratios) π radians =180° Non-right Angles: When would you use the following?. H. O. Ө. A. SOH CAH TOA. Sin=0/H -- O=H Sinx. - PowerPoint PPT Presentation
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TRIGONOMETRY: REVIEW
SOHCAHTOA Show that tanӨ=sin Ө/cosӨ
Pythagoras a2+b2=c2
Show that cos2 Ө+sin2 Ө=1 (÷c & substitute with trig ratios)
• π radians =180°
• Non-right Angles: When would you use the following?
Ө
O
A
H
C
c
B
b
A
a
sinsinsin bcCosAcba 2222 abSinCA
2
1
SOH CAH TOA
Sin=0/H --O=H Sinx Applet:
http://www.ies.co.jp/math/products/trig/applets/sixtrigfn/sixtrigfn.html
Sketch the 3 trig functions
Sine Graph y=sinx
1.2 – 1.2 1.2 – 1.2 405 – 45 1.2 – 1.2
x
90
90
180
180
270
270
360
360
y
– 1
– 1
1
1
Amplitude=1Period=360 or 2π
Amplitude:Period:Frequency:
Cosine graph
1.2 – 1.2 1.2 – 1.2 6.28318531 – 0.78539816 1.2 – 1.2
x
2
2
32
32
2
2
y
– 1
– 1
1
1 Amplitude:Period:Frequency:
Tangent graph
4 – 4 4 – 4 6.28318531 – 0.78539816 4 – 4
x
2
2
32
32
2
2
y
– 4
– 4
– 2
– 2
2
2
4
4 Amplitude:Period:Frequency:
y=±A sinB(x±C) ± D
Reflects in the x axis
-sinx -cosx -tanx
1.2 – 1.2 1.2 – 1.2 405 – 45 1.2 – 1.2
x
90
90
180
180
270
270
360
360
y
– 1
– 1
1
1
1.2 – 1.2 1.2 – 1.2 6.28318531 – 0.78539816 1.2 – 1.2
x
2
2
32
32
2
2
y
– 1
– 1
1
1
asinx acosx atanxChanges the amplitude (max
distance from resting) of the graph
y=2sinx y= cosx
2
1
1.2 – 1.2 1.2 – 1.2 405 – 45 1.2 – 1.2
x
90
90
180
180
270
270
360
360
y
– 1
– 1
1
1
1.2 – 1.2 1.2 – 1.2 6.28318531 – 0.78539816 1.2 – 1.2
x
2
2
32
32
2
2
y
– 1
– 1
1
1
sinbx cosbx tanbxChanges the frequency (how
often it repeats in 2π) & period (horizontal distance for one cycle)
y=sin3x frequency x3 , period ÷3
y=cos1/2 x frequency ½ ed, period x2
1.2 – 1.2 1.2 – 1.2 405 – 45 1.2 – 1.2
x
90
90
180
180
270
270
360
360
y
– 1
– 1
1
1
1.2 – 1.2 1.2 – 1.2 6.28318531 – 0.78539816 1.2 – 1.2
x
2
2
32
32
2
2
y
– 1
– 1
1
1
sin(x-c) cos(x-c) tan (x-c) Moves graph sideways ( + left
- right ) y=sin(x-45)y=cos(x+90)
1.2 – 1.2 1.2 – 1.2 405 – 45 1.2 – 1.2
x
90
90
180
180
270
270
360
360
y
– 1
– 1
1
1
1.2 – 1.2 1.2 – 1.2 6.28318531 – 0.78539816 1.2 – 1.2
x
2
2
32
32
2
2
y
– 1
– 1
1
1
sin(x)+d cos(x)+d tan(x)+dMoves graph up or down (+ up -
down )y=sin(x)+2y=cos(x)-1
1.2 – 1.2 1.2 – 1.2 405 – 45 1.2 – 1.2
x
90
90
180
180
270
270
360
360
y
– 1
– 1
1
1
1.2 – 1.2 1.2 – 1.2 6.28318531 – 0.78539816 1.2 – 1.2
x
2
2
32
32
2
2
y
– 1
– 1
1
1
On Graphics Calculatoreg: sketch f(x)=3sin2(x-π/4)
Make sure you are in the right mode (rad/degrees)
Enter equation (use brackets around inner function)
Adjust view window: ◦ Think about the domain you want to see:
one cycle/ 2π (consider frequency & horizontal shift)
◦ Think about the range (consider amplitude change & vertical shift)
◦ If in radians, set the step as something including π (often π /2)
Remember you can g-solve for points/use table function to plot.
