Derivatives

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We denote the derivative of a function ${\displaystyle f}$ at a number ${\displaystyle a}$ as ${\displaystyle f'(a)\,\!}$.

The derivative of a function ${\displaystyle f}$ at a number ${\displaystyle a}$ a is given by the following limit (if it exists):

${\displaystyle f'(a)=\lim _{h\rightarrow 0}{\frac {f(a+h)-f(a)}{h}}}$

An analogous equation can be defined by letting ${\displaystyle x=(a+h)}$. Then ${\displaystyle h=(x-a)}$, which shows that when ${\displaystyle x}$ approaches ${\displaystyle a}$, ${\displaystyle h}$ approaches ${\displaystyle 0}$:

${\displaystyle f'(a)=\lim _{x\rightarrow a}{\frac {f(x)-f(a)}{x-a}}}$

Given a function ${\displaystyle y=f(x)\,\!}$, the derivative ${\displaystyle f'(a)\,\!}$ can be understood as the slope of the tangent line to ${\displaystyle f(x)}$ at ${\displaystyle x=a}$:

The derivative of a function ${\displaystyle f(x)}$ at a number ${\displaystyle a}$ can be understood as the instantaneous rate of change of ${\displaystyle f(x)}$ when ${\displaystyle x=a}$.

The point A(a; f(a)) is the point in contact of the tangent and Cf.

If f is differentiable in a, then the curve C admits at a point A which has for coordinates (a ; f(a)), a tangent : it is the straight line passing by A and of direction coefficient f'(a). An equation of that tangent is written: y = f'(a)*(x-a)+f(a)

The first degree derivative of a function, commonly showing the slope of the tangent line at one point of the function, shows its instantaneous rate of change. Intuitively, the first degree derivative reveals the direction of the function; a positive first degree derivative shows the increasing of a function, and it shows decreasing when negative.

Local minimums/maximums are found from solving for f'(x)=0, for f(x) is differentiable for all x on desired interval. When the first order derivative is zero, it suggests the stop in increasing or decreasing. Whether the point x at f'(x)=0 is a maximum or minimum requires the derivative to the left and right of x. If the derivative is positive on the left and negative on the right; if the graph shifts from increasing to decreasing at point x, f(x) at x would be a local maximum. Conversely, If the derivative is negative on the left and positive on the right; if the graph shifts from decreasing to increasing at point x, f(x) at x would be a local maximum.

Global minimums/maximums are found at the smallest/largest y-values of each graph.

A saddle point refers to the point where f'(x)=0 but the graph maintains its movement direction.

In a function that measures an object's disposition, the first order derivative shows its instantaneous change in position, i.e. velocity.

The second order derivative takes

An inflection point refers to the point where the function changes its concavity (from sloping up to down, vice versa). The inflection point is found from solving for f''(x)=0, for f(x) is differentiable for all x on desired interval.

In a function that measures an object's velocity, the first order derivative shows its instantaneous change in velocity, i.e. acceleration.

One of the most commonly used derivative rules for functions in the form of ${\displaystyle x^{n}}$(${\displaystyle x}$ raised to the ${\displaystyle n}$th power), ${\displaystyle n\in \mathbb {R} }$.

${\displaystyle {d \over dx}x^{n}=nx^{n-1}}$

Taking the derivative of a polynomial requires the differentiation procedure to be applied to each term including the variable ${\displaystyle x}$.

Example:

${\displaystyle f(x)=x^{5}+3x^{2}}$

${\displaystyle {d \over dx}f(x)=5x^{4}+6x}$

Taking the derivative of a function in the form ${\displaystyle 1 \over x^{n}}$ can be achieved through rewriting the function with a negative power, ${\displaystyle x^{-n}}$.

Example:

${\displaystyle f(x)={{1} \over {x^{7}}}=x^{-7}}$

${\displaystyle {d \over dx}f(x)=-7x^{-8}}$

Differentiating a function with a radical such as a square root,${\displaystyle {\sqrt {x}}}$, can be done through rewriting the function in the form with a fraction as the exponent, ${\displaystyle x^{1/2}}$.

Example:

${\displaystyle f(x)={\sqrt {x}}=x^{1/2}}$

${\displaystyle {d \over dx}f(x)={1 \over 2}x^{-1 \over 2}={1 \over {2{\sqrt {2}}}}}$

This rule is used to differentiate functions written in the form of ${\displaystyle f(x)={h(x) \over {g(x)}}}$.

${\displaystyle f'(x)={{h'(x)g(x)-g'(x)h(x)} \over {g(x)^{2}}}}$

Example:

${\displaystyle f(x)={{x^{2}+14x^{5}-{\sqrt {2}}} \over {{\sqrt {14}}+x^{-2}}}}$

${\displaystyle f'(x)={{-2x^{-3}(x^{2}+14x^{5}-{\sqrt {2}})-(2x+70x^{4})({\sqrt {14}}+x^{-2})} \over {({\sqrt {14}}+x^{-2})^{2}}}}$

Rules for differentiating trigonometric functions:

${\displaystyle {d \over dx}(sin(x))=cos(x)dx}$

${\displaystyle {d \over dx}(cos(x))=-sin(x)dx}$

${\displaystyle {d \over dx}(tan(x))=sec^{2}(x)dx}$

${\displaystyle {d \over dx}(cot(x))=-cosec^{2}(x)dx}$

${\displaystyle {d \over dx}(sec(x))=sec(x)tan(x)dx}$

${\displaystyle {d \over dx}(csc(x))=-cosec(x)cot(x)dx}$

Rules for differentiating logarithmic functions:

${\displaystyle {d \over dx}ln(x)={1 \over x}dx}$

${\displaystyle {d \over dx}\log _{b}(x)={1 \over {ln(b)x}}dx}$

Differentiate the following:

1. ${\displaystyle f(x)=2}$
2. ${\displaystyle f(x)=x}$
3. ${\displaystyle f(x)={x^{1 \over 2}+x^{5}-{\sqrt {x}}}}$
4. ${\displaystyle f(x)={{-(x+1)} \over {x^{2}}}}$
5. ${\displaystyle f(x)=2sin(3x)}$
6. ${\displaystyle f(x)={{2sin(3x)} \over {cos(2x)}}}$
7. ${\displaystyle f(x)=sec(3x)tan(2x)}$
8. ${\displaystyle f(x)={{lnx} \over 4cosec(x)}}$