trigonometry graphs
DESCRIPTION
TRIGONOMETRY GRAPHS. Lydia Valensia , S.Pd Guru Matematika SMA Negeri 2 Sekayu Email: [email protected]. HOME. INTRODUCTION. EXERCISE. EVALUATION. COMPETENCE. MATERIAL. Sine and Cosine. functions. squeeze. squeeze. y = sin(2x). y = sin(2x). y = sin(2x). - PowerPoint PPT PresentationTRANSCRIPT
TRIGONOMETRYGRAPHS
Lydia Valensia, S.PdGuru Matematika SMA Negeri 2 SekayuEmail: [email protected]
HOME INTRODUCTION COMPETENCE MATERIAL EXERCISE EVALUATION
y = sin(2x)
y = sin(2x)
y = sin(2x)Amplitude = 1 Period = πPhase shift = 0
y = -4sin(2x)
y = -4sin(2x)
y = -4sin(2x)
Amplitude = 4 Period = πPhase shift = 0
y = sin(x + π/2) x + π/2 = 0x = -π/2
π/2
y = sin(x + π/2) x + π/2 = 0x = -π/2
π/2
Amplitude = 1 Period = 2πPhase shift = -π/2
xxf 2cos)(
xxf 2cos)(
Amplitude = 1 Period = πPhase shift = 0
xxf 2cos3)(
3cos2)( xxf 0
3
x
3
x
π/3
Amplitude = 2Period = 2πPhase shift = π/3
03
x
3
x
3cos2)( xxf
π/3
12cos3)( xxf 02 x
2
x
π/2
12cos3)( xxf
UP1
UP1
12cos3)( xxf
UP1
UP1
Amplitude = 3Period = πPhase shift = π/2
HOME INTRODUCTION COMPETENCE MATERIAL EXERCISE EVALUATION
y = csc(x)
)sin(1x
y
y = csc(x)
Amplitude = 1Period = 2πPhase shift = 0
)sin(1x
y
y = sec(x)
)cos(1x
y
y = 3sec(x-π) 0 xx
π
y = 3sec(x-π) 0 xx
π
Amplitude = 3Period = 2πPhase shift = π
HOME INTRODUCTION COMPETENCE MATERIAL EXERCISE EVALUATION
y = tan(x)
)cos()sin(xxy
y = tan(x)
Amplitude = 1Period = πPhase shift = 0
y = cot(x)
)sin()cos(xxy
y = cot(x)
Amplitude = 1Period = πPhase shift = 0
Question 1
Question 2
Question 3
Question 4
Question 5
HOME INTRODUCTION COMPETENCE MATERIAL EXERCISE EVALUATION
Amplitude = 3 Period = πPhase shift = 0
xxf 2cos3)( Question 1
y = 3sin(x) Question 2
y = 3sin(x)Amplitude = 3 Period = 2πPhase shift = 0
y = sec(x)
Amplitude = 1Period = 2πPhase shift = 0
)cos(1x
y
Question 5
y = sec(x)
Amplitude = 1Period = 2πPhase shift = 0
)cos(1x
y
Question 3
Question 4
Question 3 and 4 is the evaluation
HOME INTRODUCTION COMPETENCE MATERIAL EXERCISE EVALUATION
xxf21cos)( Question
3
xxf21cos)(
Amplitude = 1 Period = 4πPhase shift = 0
y = tan(2x+π)
)2cos()2sin(
xxy
02 x
2
x
π/2
Question 4
y = tan(2x+π) 02 x
2
x
π/2
Amplitude = 1Period = π/2Phase shift = - π/2
Title
• Lorem ipsum dolor sit amet, consectetuer adipiscing elit. Vivamus et magna. Fusce sed sem sed magna suscipit egestas.
• Lorem ipsum dolor sit amet, consectetuer adipiscing elit. Vivamus et magna. Fusce sed sem sed magna suscipit egestas.