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Feb 11, 2011. The transformed trigonometric functions. f(x) = a sin b(x – h) + k. Recall which is which in the rule:. Match the parameters to the number:. k. h. b. a. Match the parameters to the number:. k. h. b. a. 5. 7. 4. 1. Which is affected by parameter a?. a = 1.
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Feb 11, 2011 The transformed trigonometric functions
f(x) = a sin b(x – h) + k • Recall which is which in the rule:
Match the parameters to the number: k h b a 5 7 4 1
Which is affected by parameter a? a = 1 Amplitude Period Frequency l.o.o.
Which is affected by parameter a? a = 2 Amplitude Period Frequency l.o.o.
Which is affected by parameter a? a = 3 Amplitude Period Frequency l.o.o.
Which is affected by parameter a? Amplitude Period Frequency l.o.o.
In fact, parameter a = amplitude Amplitude Period Frequency l.o.o.
y = 2 cos x y = 8 sin 2x y = -3 cos x y = 4 sin 9x - 2 What would be the amplitude:
y = 2 cos x y = 8 sin 2x y = -3 cos x y = 2.4 sin 9x - 2 amplitude = 2 amplitude = 8 amplitude = 3 amplitude = 2.4 What would be the amplitude:
Another way to find amplitude: Amplitude = half the distance between the Max and min values = (M – m) 2 = (2 - -6) 2 = 8 2 = 4
Another way to find amplitude: Amplitude = half the distance between the Max and min values = (M – m) 2 = (2 - -6) 2 = 8 2 = 4 2 -6
What would be the value of a in the rule? a = 1 Amplitude = half the distance between the Max and min values = (M – m) 2 = (2 - 0) 2 = 2 2 = 1
In general then: • For f(x) = a sin b(x – h) + k OR: • f(x) = a cos b(x – h) + k Amplitude =
In general then: • For f(x) = a sin b(x – h) + k OR: • f(x) = a cos b(x – h) + k Amplitude = |a|
In general then: • For f(x) = a sin b(x – h) + k OR: • f(x) = a cos b(x – h) + k Amplitude = |a|
Which is affected by parameter b? b = 1 Amplitude Period Frequency l.o.o.
Which is affected by parameter b? b = 2 Amplitude Period Frequency l.o.o.
Which is affected by parameter b? b = 4 Amplitude Period Frequency l.o.o.
Which is affected by parameter b? Amplitude Period Frequency l.o.o.
Which is affected by parameter b? 4 cycles Amplitude Period Frequency l.o.o.
Which is affected by parameter b? Amplitude Period Frequency l.o.o.
In fact, b = frequency y = sin 4x Amplitude Period Frequency = 4 = b l.o.o.
y = cos 4x y = 8 sin 2x y = -3 cos (x + 1) -2 y = 2.4 sin (-9x) - 2 What would be the frequency:
y = cos 4x y = 8 sin 2x y = -3 cos (x + 1) -2 y = 2.4 sin (-9x) - 2 frequency = 4 frequency = 2 frequency = frequency = 9 What would be the frequency:
In general then: • For f(x) = a sin b(x – h) + k OR: • f(x) = a cos b(x – h) + k Frequency =
In general then: • For f(x) = a sin b(x – h) + k OR: • f(x) = a cos b(x – h) + k Frequency = |b|
And if 4 cycles have a total width of 2.... ...then one of those cycles must have a width of... y = sin 4x Amplitude Period Frequency l.o.o.
And if 4 cycles have a total width of 2.... ...then one of those cycles must have a width of... y = sin 4x Amplitude Period Frequency l.o.o. ?
And if 4 cycles have a total width of 2.... ...then one of those cycles must have a width of... y = sin 4x Amplitude Period = Frequency l.o.o.
And if 4 cycles have a total width of 2.... ...then one of those cycles must have a width of... y = sin 4x Amplitude Period = Frequency l.o.o.
In fact, period = y = sin 4x Amplitude Period = Frequency l.o.o.
In fact, period = y = sin 4x Amplitude Period = Frequency l.o.o.
y = cos 4x y = 8 sin 2x y = -3 cos (x + 1) -2 y = 2.4 sin (-9x) - 2 period = period = period = period = What would be the period:
y = cos 4x y = 8 sin 2x y = -3 cos (x + 1) -2 y = 2.4 sin (-9x) - 2 period = period = period = period = What would be the period:
In general then: • For f(x) = a sin b(x – h) + k OR: • f(x) = a cos b(x – h) + k Frequency = |b| Period =
Which is affected by parameter h? h = 0 Amplitude Period Frequency l.o.o.
