Partial Derivatives in Calculus

Let f(x,y) be a function with two variables. If we keep y constant and differentiate f (assuming f is differentiable) with respect to the variable x, we obtain what is called the partial derivative of f with respect to x which is denoted by
∂f
∂x or f_x
Similarly If we keep x constant and differentiate f (assuming f is differentiable) with respect to the variable y, we obtain what is called the partial derivative of f with respect to y which is denoted by
∂f
∂y or f_y

We might also define partial derivatives of function f as follows:

∂f
∂x = lim
h→0 f(x + h , y) - f(x , y)
h

∂f
∂y = lim
k→0 f(x , y + k) - f(x , y)
k

We now present several examples with detailed solution on how to calculate partial derivatives.

Example 1: Find the partial derivatives f_x and f_y if f(x , y) is given by

f(x , y) = x² y + 2x + y

Solution to Example 1:

Assume y is constant and differentiate with respect to x to obtain

f_x = ∂f
∂x = ∂
∂x [ x² y + 2x + y ]

= ∂
∂x [ x² y] + ∂
∂x [ 2 x ] + ∂
∂x [ y ] = [2 x y] + [ 2 ] + [ 0 ] = 2x y + 2

Now assume x is constant and differentiate with respect to y to obtain

f_y = ∂f
∂y = ∂
∂y [ x² y + 2x + y ]

= ∂
∂y [ x² y] + ∂
∂y [ 2 x ] + ∂
∂y [ y ] = [ x² ] + [ 0 ] + [ 1 ] = x² + 1

Example 2: Find f_x and f_y if f(x , y) is given by

f(x , y) = sin(x y) + cos x

Solution to Example 2:

Differentiate with respect to x assuming y is constant

f_x = ∂f
∂x = ∂
∂x [ sin(x y) + cos x ] = y cos(x y) - sin x

Differentiate with respect to y assuming x is constant

f_y = ∂f
∂y = ∂
∂y [ sin(x y) + cos x ] = x cos(x y)

Example 3: Find f_x and f_y if f(x , y) is given by

f(x , y) = x e^{x y}

Solution to Example 3:

Differentiate with respect to x assuming y is constant

f_x = ∂f
∂x = ∂
∂x [ x e^{x y} ] = e^{x y} + x y e^{x y} = (x y + 1)e^{x y}

Differentiate with respect to y

f_y = ∂f
∂y = ∂
∂y [ x e^{x y} ] = (x) (x e^{x y}) = x² e^{x y}

Example 4: Find f_x and f_y if f(x , y) is given by

f(x , y) = ln ( x² + 2 y)

Solution to Example 4:

Differentiate with respect to x to obtain

f_x = ∂f
∂x = ∂
∂x [ ln ( x² + 2 y) ] = 2x
x² + 2 y

Differentiate with respect to y

f_y = ∂f
∂y = ∂
∂y [ ln ( x² + 2 y) ] = 2
x² + 2 y

Example 5: Find f_x(2 , 3) and f_y(2 , 3) if f(x , y) is given by

f(x , y) = y x² + 2 y

Solution to Example 5:

We first find f_x and f_y

f_x(x,y) = 2x y

f_y(x,y) = x² + 2

We now calculate f_x(2 , 3) and f_y(2 , 3) by substituting x and y by their given values

f_x(2,3) = 2 (2)(3) = 12

f_y(2,3) = 2² + 2 = 6

Exercise: Find partial derivatives f_x and f_y of the following functions

1. f(x , y) = x e^{x + y}

2. f(x , y) = ln ( 2 x + y x)

3. f(x , y) = x sin(x - y)

Answer to Above Exercise:

1. f_x =(x + 1)e^{x + y} , f_y = x e^{x + y}

2. f_x = 1 / x , f_y = 1 / (y + 2)

3. f_x = x cos (x - y) + sin (x - y) , f_y = -x cos (x - y)

More on partial derivatives and mutlivariable functions. Multivariable Functions