3. Techniques of Differentiation

Find the derivative of the function.

$f\left(x\right)=4x^2\sec x-\sqrt{x}$

Find the derivative of the function.

$y=\frac{\cot \theta }{3+\sec \theta }$

Find an equation of the line tangent to the curve y = sin x at x = 0.

Let f(x) = sin x. What is the value of f′(π)?

Find the derivative of the following functions.

y = sin x + cos x

Find the derivative of the following functions.

y = cos x/sin x + 1

23–51. Calculating derivatives Find the derivative of the following functions.

y = a sin x + b cos x/a sin x - b cos x; a and b are nonzero constants

23–51. Calculating derivatives Find the derivative of the following functions.

y = cos² x

23–51. Calculating derivatives Find the derivative of the following functions.

y = sin x / 1 + cos x

23–51. Calculating derivatives Find the derivative of the following functions.

y = tan x + cot x

Find the derivative of the following functions.

y = cot x / (1 + csc x)

An object oscillates along a vertical line, and its position in centimeters is given by y(t) = 30(sint - 1), where t ≥ 0 is measured in seconds and y is positive in the upward direction.

Find the velocity of the oscillator, v(t) =y′(t).

An object oscillates along a vertical line, and its position in centimeters is given by y(t)=30(sint - 1), where t ≥ 0 is measured in seconds and y is positive in the upward direction.

At what times and positions is the velocity zero?

An object oscillates along a vertical line, and its position in centimeters is given by y(t) = 30(sin t - 1), where t ≥ 0 is measured in seconds and y is positive in the upward direction.

The acceleration of the oscillator is a(t) = v′(t). Find and graph the acceleration function.

Verifying derivative formulas Verify the following derivative formulas using the Quotient Rule.

d/dx (sec x) = sec x tan x