Implicit Differentiation and Partial Derivatives

It avoids the need for the chain rule.

It provides a more straightforward calculation.

It eliminates the need for any derivatives.

It is only applicable to polynomial equations.

To find the partial derivative with respect to x only.

To eliminate the need for partial derivatives.

To differentiate the entire equation with respect to y.

To differentiate each term separately with respect to x and y.

x^2

2xy

4y^3

12

It uses the product rule instead of the chain rule.

It only works for linear equations.

It requires solving a system of equations.

It involves more steps and is generally slower.

sec^2(xy) * x

tan(xy)

cos(x)

sec^2(xy) * y

cos(x) / (y sec^2(xy)) + x

tan(x) / (x sec^2(xy)) - y

sin(x) / (y sec^2(xy)) + xy

cos(x) / (x sec^2(xy)) - yx

Quotient property

Product property

Change of base property

Power property

To convert the equation into a polynomial form.

To eliminate all variables from the equation.

To ensure the equation is set to zero.

To simplify the expression for easier interpretation.

2x + 3y

1 / (x^2 + y^2) * 2y

1 / (x^2 + y^2) * 2x

3xy

Because the terms are not like terms.

Because addition and subtraction prevent cross-term simplification.

Because the expression is not a polynomial.

Because they are already in their simplest form.