Calculus/Implicit differentiation

Implicit differentiation takes a relation and turns it into a rectangular regular equation.

For example, to differentiate a function explicitly,

${\displaystyle x^2+y^2=1}$

First we can separate variables to get

${\displaystyle y^2=1-x^2}$

Taking the square root of both sides we get a function of y:

${\displaystyle y=\pm \sqrt{1-x^2}}$

We can rewrite this as a fractional power as

${\displaystyle y=\pm (1-x^2{)}^{\frac{1}{2}}}$

Using the chain rule and simplifying we get,

${\displaystyle y^{\prime }=-\frac{x}{y}}$

Using the same equation

${\displaystyle x^2+y^2=1}$

First, differentiate the individual terms of the equation:

${\displaystyle 2x+2y{y}^{\prime }=0}$

Separate the variables:

${\displaystyle 2y{y}^{\prime }=-2x}$

Divide both sides by ${\displaystyle 2y}$, and simplify to get the same result as above:

${\displaystyle y^{\prime }=-\frac{2x}{2y}}$

${\displaystyle y^{\prime }=-\frac{x}{y}}$

Implicit differentiation is useful when differentiating an equation that cannot be explicitly differentiated because it is impossible to isolate variables.

For example, consider the equation,

${\displaystyle x^2+xy+y^2=16}$

Differentiate both sides of the equation (remember to use the product rule on the term xy) :

${\displaystyle 2x+y+x{y}^{\prime }+y{y}^{\prime }=0}$

Isolate terms with y':

${\displaystyle x{y}^{\prime }+y{y}^{\prime }=-2x-y}$

Factor out a y' and divide both sides by the other term:

${\displaystyle y^{\prime }=\frac{-2x-y}{x+y}}$

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