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Published byJoella Judith Smith Modified over 9 years ago
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3.5 Derivatives of Trig Functions
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Consider the function We could make a graph of the slope: slope Now we connect the dots! The resulting curve is a cosine curve. What function does the red curve look like?
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Derivative of y = sin x USING LIMITS:
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We can do the same thing for slope The resulting curve is a sine curve that has been reflected about the x-axis.
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We can find the derivative of tangent x by using the quotient rule. Now use the quotient rule:
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Derivatives of the remaining trig functions can be determined the same way.
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SAME Rules for Finding Derivatives Simple Power rule Sum and difference rule Constant multiple rule Product rule Quotient rule
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Trig Identities Don’t forget these!!!!
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Example 1 Find if We need to use the product rule to solve.
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Example 2 Find if We need to use the quotient rule to solve.
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Example 3 Find if.
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Find the derivatives
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Simple Harmonic Motion A weight hanging from a spring is stretched 5 units beyond its rest position (s = 0) and released at time t = 0 to bob up and down. Its position at any later time t is s = 5cos. What is its velocity and acceleration at time t? Describe it’s motion. Position : Velocity : Acceleration :
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Find the slope at the given point: 1.) at the point (0, 1)
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Find the slope at the given point: 1.) at the point (0, 1)
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Find the slope at the given point: 1.) at the point (π, -π)
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Find the slope at the given point: 1.) at the point
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Find the derivative of each: 1.)2.)
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Find the derivative of each: 3.)4.)
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Find the derivative of each: 5.)6.)
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Find the derivative of each: 7.)8.)
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Find the derivative of each: 9.)10.)
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Find:
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