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The derivative of ${\displaystyle f(x)}$ at the point ${\displaystyle x=a}$, denoted ${\displaystyle f'(a)}$,^[1] is defined as the slope of the tangent to ${\displaystyle (a,f(a))}$.^[2] In order to gain an intuition for this definition, one must first be familiar with finding the slope of a linear equation, written in the form ${\displaystyle y=mx+b}$. The slope of an equation is its steepness. It can be found by picking any two points and dividing the change in ${\displaystyle y}$ by the change in ${\displaystyle x}$, meaning that ${\displaystyle {\text{slope }}={\tfrac {{\text{change in }}y}{{\text{change in }}x}}}$. As an example, the graph of ${\displaystyle y=-2x+13}$ has a slope of ${\displaystyle -2}$, as shown in the diagram below:

${\displaystyle {\frac {{\text{change in }}y}{{\text{change in }}x}}={\frac {-6}{+3}}=-2}$

For brevity, ${\displaystyle {\frac {{\text{change in }}y}{{\text{change in }}x}}}$ is often written as ${\displaystyle {\frac {\Delta y}{\Delta x}}}$, with ${\displaystyle \Delta }$ being the Greek letter Delta, meaning 'change' or 'increment'.^[3] The slope of a linear equation is constant, meaning that the steepness is the same everywhere. However, many graphs, including ${\displaystyle y=x^{2}}$, vary in their steepness. This means that one can no longer pick any two arbitrary points and compute the slope. Instead, the slope of the graph is defined using a tangent line—a line that 'just touches' a particular point. The slope of a curve at a particular point is defined as the slope of the tangent to that point. For example, ${\displaystyle y=x^{2}}$ has a slope of ${\displaystyle 4}$ at ${\displaystyle x=2}$, because the slope of the tangent line to that point is equal to ${\displaystyle 4}$:

The derivative of a function is defined as the slope of this tangent line.^{[Note 1]} Even though the tangent line only touches a single point, it can be approximated by a line that goes through two points. This is known as a secant line. If the two points that the secant line goes through are close together, then the secant line closely resembles the tangent line, and, as a result, its slope is also very similar:

The advantage of using a secant line is that its slope can be calculated directly. Consider the two points on the graph ${\displaystyle (x,f(x))}$ and ${\displaystyle (x+\Delta x,f(x+\Delta x))}$, where ${\displaystyle \Delta x}$ is a small number. As before, the slope of the line passing through these two points can be calculated with the formula ${\displaystyle {\text{slope }}={\frac {\Delta y}{\Delta x}}}$. This gives

${\displaystyle {\text{slope}}={\frac {f(x+\Delta x)-f(x)}{\Delta x}}}$

As ${\displaystyle \Delta x}$ gets closer and closer to ${\displaystyle 0}$, the slope of the secant line gets closer and closer to the slope of the tangent line. This is formally written as^[3]

${\displaystyle \lim _{\Delta x\to 0}{\frac {f(x+\Delta x)-f(x)}{\Delta x}}}$

The above expression means 'as ${\displaystyle x}$ gets closer and closer to 0, the slope of the secant line gets closer and closer to a certain value'. The value that is being approached is the derivative of ${\displaystyle f(x)}$; this can be written as ${\displaystyle f'(x)}$.^[1][4] If ${\displaystyle y=f(x)}$, the derivative can also be written as ${\displaystyle {\tfrac {dy}{dx}}}$, with ${\displaystyle d}$ representing an infinitesimal change. For example, ${\displaystyle dx}$ represents an infinitesimal change in x.^{[Note 2]} In summary, if ${\displaystyle y=f(x)}$, then the derivative of ${\displaystyle f(x)}$ is^[3]

${\displaystyle {\frac {dy}{dx}}=f'(x)=\lim _{\Delta x\to 0}{\frac {f(x+\Delta x)-f(x)}{\Delta x}}}$

provided such a limit exists.^{[4][Note 3]} Differentiating a function using the above definition is known as differentiation from first principles. Here is a proof, using differentiation from first principles, that the derivative of ${\displaystyle y=x^{2}}$ is ${\displaystyle 2x}$:

${\displaystyle {\begin{aligned}{\frac {dy}{dx}}&=\lim _{\Delta x\to 0}{\frac {f(x+\Delta x)-f(x)}{\Delta x}}\\&=\lim _{\Delta x\to 0}{\frac {(x+\Delta x)^{2}-x^{2}}{\Delta x}}\\&=\lim _{\Delta x\to 0}{\frac {x^{2}+2x\Delta x+(\Delta x)^{2}-x^{2}}{\Delta x}}\\&=\lim _{\Delta x\to 0}{\frac {2x\Delta x+(\Delta x)^{2}}{\Delta x}}\\&=\lim _{\Delta x\to 0}2x+\Delta x\\\end{aligned}}}$

As ${\displaystyle \Delta x\to 0}$, ${\displaystyle 2x+\Delta x\to 2x}$. Therefore, ${\displaystyle {\tfrac {dy}{dx}}=2x}$. This proof can be generalised to show that ${\displaystyle {\tfrac {d(ax^{n})}{dx}}=anx^{n-1}}$, if ${\displaystyle a}$ and ${\displaystyle n}$ are constants. This is known as the power rule. For example, ${\displaystyle {\tfrac {d}{dx}}(5x^{4})=5(4)x^{3}=20x^{3}}$. However, many other functions cannot be differentiated as easily as polynomial functions, meaning that sometimes further techniques are needed to find the derivative of a function. These techniques include the chain rule, product rule, and quotient rule. Other functions cannot be differentiated at all, giving rise to the concept of differentiability.

The derivative of ${\displaystyle f(x)}$ at the point ${\displaystyle x=a}$, denoted ${\displaystyle f'(a)}$,^[1] is defined as the slope of the tangent to ${\displaystyle (a,f(a))}$.^[5] In order to gain an intuition for this definition, one must first be familiar with finding the slope of a linear equation, written in the form ${\displaystyle y=mx+b}$. The slope of an equation is its steepness. It can be found by picking any two points and dividing the change in ${\displaystyle y}$ by the change in ${\displaystyle x}$, meaning that ${\displaystyle {\text{slope }}={\tfrac {{\text{change in }}y}{{\text{change in }}x}}}$. As an example, the graph of ${\displaystyle y=-2x+13}$ has a slope of ${\displaystyle -2}$, as shown in the diagram below:

${\displaystyle {\frac {{\text{change in }}y}{{\text{change in }}x}}={\frac {-6}{+3}}=-2}$

For brevity, ${\displaystyle {\frac {{\text{change in }}y}{{\text{change in }}x}}}$ is often written as ${\displaystyle {\frac {\Delta y}{\Delta x}}}$, with ${\displaystyle \Delta }$ being the Greek letter Delta, meaning 'change' or 'increment'.^[3] The slope of a linear equation is constant, meaning that the steepness is the same everywhere. However, many graphs, including ${\displaystyle y=x^{2}}$, vary in their steepness. This means that one can no longer pick any two arbitrary points and compute the slope. Instead, the slope of the graph is defined using a tangent line—a line that 'just touches' a particular point. The slope of a curve at a particular point is defined as the slope of the tangent to that point. For example, ${\displaystyle y=x^{2}}$ has a slope of ${\displaystyle 4}$ at ${\displaystyle x=2}$, because the slope of the tangent line to that point is equal to ${\displaystyle 4}$:

The derivative of a function is defined as the slope of this tangent line.^{[Note 4]} Even though the tangent line only touches a single point, it can be approximated by a line that goes through two points. This is known as a secant line. If the two points that the secant line goes through are close together, then the secant line closely resembles the tangent line, and, as a result, its slope is also very similar:

The advantage of using a secant line is that its slope can be calculated directly. Consider the two points on the graph ${\displaystyle (x,f(x))}$ and ${\displaystyle (x+\Delta x,f(x+\Delta x))}$, where ${\displaystyle \Delta x}$ is a small number. As before, the slope of the line passing through these two points can be calculated with the formula ${\displaystyle {\text{slope }}={\frac {\Delta y}{\Delta x}}}$. This gives

${\displaystyle {\text{slope}}={\frac {f(x+\Delta x)-f(x)}{\Delta x}}}$

As ${\displaystyle \Delta x}$ gets closer and closer to ${\displaystyle 0}$, the slope of the secant line gets closer and closer to the slope of the tangent line. This is formally written as^[3]

${\displaystyle \lim _{\Delta x\to 0}{\frac {f(x+\Delta x)-f(x)}{\Delta x}}}$

The above expression means 'as ${\displaystyle x}$ gets closer and closer to 0, the slope of the secant line gets closer and closer to a certain value'. The value that is being approached is the derivative of ${\displaystyle f(x)}$; this can be written as ${\displaystyle f'(x)}$.^[1][4] If ${\displaystyle y=f(x)}$, the derivative can also be written as ${\displaystyle {\tfrac {dy}{dx}}}$, with ${\displaystyle d}$ representing an infinitesimal change. For example, ${\displaystyle dx}$ represents an infinitesimal change in x.^{[Note 5]} In summary, if ${\displaystyle y=f(x)}$, then the derivative of ${\displaystyle f(x)}$ is^[3]

${\displaystyle {\frac {dy}{dx}}=f'(x)=\lim _{\Delta x\to 0}{\frac {f(x+\Delta x)-f(x)}{\Delta x}}}$

provided such a limit exists.^{[4][Note 6]} Differentiating a function using the above definition is known as differentiation from first principles. Here is a proof, using differentiation from first principles, that the derivative of ${\displaystyle y=x^{2}}$ is ${\displaystyle 2x}$:

${\displaystyle {\begin{aligned}{\frac {dy}{dx}}&=\lim _{\Delta x\to 0}{\frac {f(x+\Delta x)-f(x)}{\Delta x}}\\&=\lim _{\Delta x\to 0}{\frac {(x+\Delta x)^{2}-x^{2}}{\Delta x}}\\&=\lim _{\Delta x\to 0}{\frac {x^{2}+2x\Delta x+(\Delta x)^{2}-x^{2}}{\Delta x}}\\&=\lim _{\Delta x\to 0}{\frac {2x\Delta x+(\Delta x)^{2}}{\Delta x}}\\&=\lim _{\Delta x\to 0}2x+\Delta x\\\end{aligned}}}$

As ${\displaystyle \Delta x\to 0}$, ${\displaystyle 2x+\Delta x\to 2x}$. Therefore, ${\displaystyle {\tfrac {dy}{dx}}=2x}$. This proof can be generalised to show that ${\displaystyle {\tfrac {d(ax^{n})}{dx}}=anx^{n-1}}$, if ${\displaystyle a}$ and ${\displaystyle n}$ are constants. This is known as the power rule. For example, ${\displaystyle {\tfrac {d}{dx}}(5x^{4})=5(4)x^{3}=20x^{3}}$. However, many other functions cannot be differentiated as easily as polynomial functions, meaning that sometimes further techniques are needed to find the derivative of a function. These techniques include the chain rule, product rule, and quotient rule. Other functions cannot be differentiated at all, giving rise to the concept of differentiability.

The meaning of ${\displaystyle a^{x}}$, where ${\displaystyle a}$ and ${\displaystyle x}$ are positive real numbers, can also come from natural logarithm. This avoids the difficulty surrounding the definition of ${\displaystyle a^{x}}$ for irrational ${\displaystyle x}$. First, we may define, for ${\displaystyle x>0}$,

${\displaystyle \log x=\int _{1}^{x}{\frac {1}{t}}dt}$

It can then be proven that ${\displaystyle \log x}$ satisfies the basic properties of logarithms, in particular ${\displaystyle \log a+\log b=\log ab}$. Then, ${\displaystyle \exp }$ can be defined as the inverse of ${\displaystyle \log }$, and ${\displaystyle e}$ can be defined as the number ${\displaystyle a}$ such that ${\displaystyle \log a=1}$.

Finally, ${\displaystyle a^{x}}$ can be defined as ${\displaystyle \exp(x\log a)}$. Since ${\displaystyle e^{x}=\exp(x\log e)=\exp(x)}$, ${\displaystyle a^{x}}$ can also be interpreted to mean ${\displaystyle e^{x\log a}}$. In any case, this approach sidesteps the issue surrounding the definition of ${\displaystyle a^{x}}$ for irrational ${\displaystyle x}$; in fact, ${\displaystyle a^{x}}$ has the same definition regardless of whether ${\displaystyle x}$ is a natural number, an integer, a rational number, or a real number.

The Maclaurin series expansions of the main trigonometric functions are

${\displaystyle {\begin{aligned}\sin \theta &=\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{(2n+1)!}}\theta ^{2n+1}\\&=\theta -{\frac {\theta ^{3}}{3!}}+{\frac {\theta ^{5}}{5!}}-{\frac {\theta ^{7}}{7!}}+\cdots \\[6pt]\cos \theta &=\sum _{n=0}^{\infty }{\frac {(-1)^{n}}{(2n)!}}\theta ^{2n}\\&=1-{\frac {\theta ^{2}}{2!}}+{\frac {\theta ^{4}}{4!}}-{\frac {\theta ^{6}}{6!}}+\cdots \theta \\[6pt]\tan \theta &=\sum _{n=1}^{\infty }{\frac {B_{2n}(-4)^{n}\left(1-4^{n}\right)}{(2n)!}}\theta ^{2n-1}\\&=\theta +{\frac {\theta ^{3}}{3}}+{\frac {2\theta ^{5}}{15}}+{\frac {17\theta ^{7}}{315}}+\cdots \\[6pt]\end{aligned}}}$

where θ is the angle in radians.

It is readily seen that the second most significant (third-order) term falls off as the cube of the first term; thus, even for a not-so-small argument such as 0.01, the value of the second most significant term is on the order of 0.000001, or ⁠1/10000⁠ the first term. One can thus safely approximate:

${\displaystyle \sin \theta \approx \theta }$

By extension, since the cosine of a small angle is very nearly 1, and the tangent is given by the sine divided by the cosine,

${\displaystyle \tan \theta \approx \sin \theta \approx \theta }$,

Unlike factoring by inspection, completing the square can be used to solve any quadratic equation. Consider the example

${\displaystyle x^{2}+10x=39\,.}$

In order to isolate for ${\displaystyle x}$, it helps to consider this problem geometrically. The first term, ${\displaystyle x^{2}}$ can be interpreted as the area of square with side length ${\displaystyle x}$. The second term, ${\displaystyle 10x}$ can be interpreted as the area of a rectangle with lengths ${\displaystyle 10}$ and ${\displaystyle x}$, or, as the combined area of two rectangles that have lengths ${\displaystyle 5}$ and ${\displaystyle x}$:

This diagram suggests that ${\displaystyle x^{2}+10x}$ is almost a perfect square with side length ${\displaystyle x+5}$. If we add ${\displaystyle 25}$ to both sides of the equation, then it becomes

${\displaystyle x^{2}+10x+25=64}$

The left-hand side of the equation can then be written as ${\displaystyle (x+5)^{2}}$, and so

${\displaystyle (x+5)^{2}=64}$