How do I find the derivative of $y = sin^2 x + cos^2x + ln(e^x)$ ?

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How do I find the derivative of $y = sin^2 x + cos^2x + ln(e^x)$ ?

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Answer 1 · 2015-01-27T18:18:49

Derivatives of $y=sin^2x+cos^2x+ln(e^x)$ can be easily find by finding the derivative for each component as the derivative of the sum is the sum of the derivative.

Derivative of $sin^2x$ is $2sin(x) * d(sin(x)) = 2sin(x)cos(x)$
Derivative of $cos^2x$ is $2cos(x) * d(cos(x)) = -2cos(x)sin(x)$
Derivative of $ln(e^x)$ is $1/e^x * d(e^x) = 1/e^x*e^x = 1$ [*]

Note [*] that the last component $ln(e^x)$ is actually $x$ . Therefore, the derivative of $x$ is actually $1$ .

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How do I find the derivative of $y = sin^2 x + cos^2x + ln(e^x)$ ?

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How do I find the derivative of y = sin^2 x + cos^2x + ln(e^x)y = sin^2 x + cos^2x + ln(e^x)?

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How do I find the derivative of $y = sin^2 x + cos^2x + ln(e^x)$ ?