Lagrange mean value theorem

Statement

Suppose ${\displaystyle f}$ is a function defined on a closed interval ${\displaystyle [a,b]}$ (with ${\displaystyle a<b}$) such that the following two conditions hold:

1. ${\displaystyle f}$ is a continuous function on the closed interval ${\displaystyle [a,b]}$ (i.e., it is right continuous at ${\displaystyle a}$, left continuous at ${\displaystyle b}$, and two-sided continuous at all points in the open interval ${\displaystyle (a,b)}$).
2. ${\displaystyle f}$ is a differentiable function on the open interval ${\displaystyle (a,b)}$, i.e., the derivative exists at all points in ${\displaystyle (a,b)}$. Note that we do not require the derivative of ${\displaystyle f}$ to be a continuous function.

Then, there exists ${\displaystyle c}$ in the open interval ${\displaystyle (a,b)}$ such that the derivative of ${\displaystyle f}$ at ${\displaystyle c}$ equals the difference quotient ${\displaystyle \Delta f(a,b)}$. More explicitly:

${\displaystyle f'(c)={\frac {f(b)-f(a)}{b-a}}}$

Geometrically, this is equivalent to stating that the tangent line to the graph of ${\displaystyle f}$ at ${\displaystyle c}$ is parallel to the chord joining the points ${\displaystyle (a,f(a))}$ and ${\displaystyle (b,f(b))}$.

Note that the theorem simply guarantees the existence of ${\displaystyle c}$, and does not give a formula for finding such a ${\displaystyle c}$ (which may or may not be unique).

Related facts

• Rolle's theorem
• Zero derivative implies locally constant
• Fundamental theorem of calculus
• Positive derivative implies increasing
• Increasing and differentiable implies nonnegative derivative
• Derivative of differentiable function on interval satisfies intermediate value property

Facts used

1. Continuous functions form a vector space
2. Differentiable functions form a vector space
3. Rolle's theorem
4. Differentiation is linear

Proof

Step no.	Assertion/construction	Facts used	Given data used	Previous steps used	Explanation
1	Consider the function ${\displaystyle h(x):={\frac {f(b)-f(a)}{b-a}}x+{\frac {bf(a)-af(b)}{b-a}}}$. Then, ${\displaystyle h}$ is a linear (and hence a continuous and differentiable) function with ${\displaystyle h(a)=f(a)}$ and ${\displaystyle h(b)=f(b)}$				Just plug in and check. Secretly, we obtained ${\displaystyle h}$ by trying to write the equation of the line joining the points ${\displaystyle (a,f(a))}$ and ${\displaystyle (b,f(b))}$.
2	Define ${\displaystyle g=f-h}$ on ${\displaystyle [a,b]}$, i.e., ${\displaystyle g(x):=f(x)-h(x)}$.
3	${\displaystyle g}$ is continuous on ${\displaystyle [a,b]}$	Fact (1)	${\displaystyle f}$ is continuous on ${\displaystyle [a,b]}$	Steps (1), (2)	[SHOW MORE] By Step (2), ${\displaystyle g=f-h}$. By Step (1), ${\displaystyle h}$ is linear and hence continuous on ${\displaystyle [a,b]}$. Thus, by Fact (1), ${\displaystyle g=f-h}$, being the difference of two continuous functions, is continuous on ${\displaystyle [a,b]}$.
4	${\displaystyle g}$ is differentiable on ${\displaystyle (a,b)}$	Fact (2)	${\displaystyle f}$ is differentiable on ${\displaystyle (a,b)}$	Steps (1), (2)	[SHOW MORE] By Step (2), ${\displaystyle g=f-h}$. By Step (1), ${\displaystyle h}$ is linear and hence differentiable on ${\displaystyle (a,b)}$. Thus, by Fact (1), ${\displaystyle g=f-h}$, being the difference of two differentiable functions, is differentiable on ${\displaystyle (a,b)}$.
5	${\displaystyle g(a)=g(b)=0}$			Steps (1), (2)	[SHOW MORE] ${\displaystyle h(a)=f(a)}$ yields ${\displaystyle g(a)=0}$. ${\displaystyle h(b)=f(b)}$ yields ${\displaystyle g(b)=0}$.
6	There exists ${\displaystyle c\in (a,b)}$ such that ${\displaystyle \!g'(c)=0}$.	Fact (3)		Steps (3), (4), (5)	[SHOW MORE] Steps (3), (4), (5) together show that ${\displaystyle g}$ satisfies the conditions of Rolle's theorem on the interval ${\displaystyle [a,b]}$, hence we get the conclusion of the theorem.
7	For the ${\displaystyle c}$ obtained in step (6), ${\displaystyle \!f'(c)=h'(c)}$	Fact (4)		Steps (2), (6)	[SHOW MORE] From Step (2), ${\displaystyle g=f-h}$. Differentiating both sides by Fact (4), we get ${\displaystyle g'=f'-h'}$ on ${\displaystyle (a,b)}$. Since ${\displaystyle g'(c)=0}$, we obtain that ${\displaystyle f'(c)=h'(c)}$.
8	${\displaystyle h'(x)={\frac {f(b)-f(a)}{b-a}}}$ for all ${\displaystyle x}$. In particular, ${\displaystyle h'(c)={\frac {f(b)-f(a)}{b-a}}}$.			Step (1)	Differentiate the expression for ${\displaystyle h(x)}$ from Step (1).
9	${\displaystyle f'(c)={\frac {f(b)-f(a)}{b-a}}}$			Steps (7), (8)	Step-combination direct