Implicit Diff Problem

[Jason76]

Post Edited 9/27/13

Solving for y'

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

\(\displaystyle 6x^{2} + y(2x) + x^{2}(1)y' - y^{3}(1) + x(3y^{2})y' = 0\)

\(\displaystyle 6x^{2} + 2xy + x^{2}y' - y^{3} + 3xy^{2}y' = 0\)

\(\displaystyle 6x^{2} + 2xy - y^{3} + x^{2}y' + 3xy^{2}y' = 0\)

\(\displaystyle 6x^{2} + 2xy - y^{3} + y'(x^{2} + 3xy^{2}) = 0\)

\(\displaystyle y'(x^{2} + 3xy^{2}) = -6x^{2} - 2xy + y^{3}\)

\(\displaystyle y' = \dfrac{ -6x^{2} - 2xy + y^{3}}{x^{2} + 3xy^{2}}\)

 

[fcabanski]

Your second step is incorrect. You have to use the power rule to differentiate x^2 * y. The derivative of that term is: 2xy + dy/dx * x^2 . You made the same mistake with another term. When performing implicit differentiation this way, do not treat y as a constant. It is a variable, just like x, and it can be differentiated according to the same rules.

A shortcut to implicit differentiation is to use the result of the Implicit Function Theorem. According to that, the implicit derivative of a function of x and y is -f'(x)/f'(y), where f'(x) is the derivative of f(x) with respect to x, and f'(y) is the derivative of f(y) with respect to y.

First move all the terms to the left side, = 0. Then differentiate each term that contains x, treating y as a constant, as the numerator. Negate the numerator. Differentiate each term that contains y, treating x as a constant, as the denominator.

(I don't know the Latex code.)

2x^3 + x^2 *y - xy^3 -3 = 0

- (6x^2 +2xy -y^3)/(x^2 - 3xy^2) = (-6x^2 -2xy + y^3)/x(x-3y^2)

 

[Deleted member 4993]

Solving for y'

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

If f(x) = 3 → f'(x) = 0

\(\displaystyle f'(x) = 6x^{2} + 2xyy' - 3y^{2}y' = 0\)

\(\displaystyle f'(x) = 2xyy' - 3y^{2}y' - 3y^{2}y' = -6x^{2}\)

\(\displaystyle f'(x) = y'y(2x - 3y) = -6x^{2}\)

\(\displaystyle f'(x) = y'y = \dfrac{ -6x^{2}}{(2x - 3y)} \)

\(\displaystyle f'(x) = yy'(\dfrac{1}{y}) = \dfrac{ -6x^{2}}{(2x - 3y)} (\dfrac{1}{y}) \)

\(\displaystyle f'(x) = y' = \dfrac{ -6x^{2}}{(2x - 3y^{2})}\)

.

 

[Jason76]

Again, I see the mistake of not using the product rule.

 

[Jason76]

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

\(\displaystyle f'(x) = 2x^{3} + y(2x)y' + x^{2}(1)y' - y^{3}(1)y' + x(3y^{2})y' = 0\)

\(\displaystyle f'(x) = 2x^{3} + 2xyy' + x^{2}y' - y^{3}y' + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 2x^{3} + y'(2xy - + x^{2}y' - y^{3} + 3xy^{2}= 0\)

\(\displaystyle f'(x) = 2x^{3} + y'(2xy + x^{2}y' - y^{3} + 3xy^{2}) = x^{2}\)

\(\displaystyle f'(x) = y'(2xy + x^{2}y' - y^{3} + 3xy^{2}) = x^{2}\)

\(\displaystyle y' = \dfrac{x^{2}}{2xy + x^{2}y' - y^{3} + 3xy^{2}}\)

 

[Deleted member 4993]

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

\(\displaystyle f'(x) = 2x^{3} + y(2x)y' + x^{2}(1)y' - y^{3}(1)y' + x(3y^{2})y' = 0\) .............. Incorrect .................should be

\(\displaystyle 6x^{2} + y(2x) + x^{2}(1)y' - y^{3}(1) - x(3y^{2})y' = 0\)

.

 

[Jason76]

.

Why?

 

[Jason76]

Solving for y'

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

\(\displaystyle f'(x) = 2x^{3} + y(2x) + x^{2}(1)y' - y^{3}(1) + x(3y^{2})y' = 0\)

\(\displaystyle f'(x) = 2x^{3} + 2xy + x^{2}y' - y^{3} + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 2x^{3} + 2xy - y^{3} + x^{2}y' + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 2x^{3} + 2xy - y^{3} + y'(x^{2} + 3xy^{2}) = 0\)

\(\displaystyle f'(x) = y'(x^{2} + 3xy^{2}) = -2x^{3} - 2xy + y^{3}\)

 

[srmichael]

Solving for y'

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

\(\displaystyle f'(x) = 2x^{3} + y(2x) + x^{2}(1)y' - y^{3}(1) + x(3y^{2})y' = 0\) DUDE, WRONG! SEE SKHAN'S POST ABOVE!

\(\displaystyle f'(x) = 2x^{3} + 2xy + x^{2}y' - y^{3} + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 2x^{3} + 2xy - y^{3} + x^{2}y' + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 2x^{3} + 2xy - y^{3} + y'(x^{2} + 3xy^{2}) = 0\)

\(\displaystyle f'(x) = y'(x^{2} + 3xy^{2}) = -2x^{3} - 2xy + y^{3}\)

.

 

[Jason76]

Post Edited 9/27/13

Solving for y'

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

\(\displaystyle f'(x) = 6x^{2} + y(2x) + x^{2}(1)y' - y^{3}(1) + x(3y^{2})y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy + x^{2}y' - y^{3} + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + x^{2}y' + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + y'(x^{2} + 3xy^{2}) = 0\)

\(\displaystyle f'(x) = y'(x^{2} + 3xy^{2}) = -6x^{2} - 2xy + y^{3}\)

\(\displaystyle y' = \dfrac{ -6x^{2} - 2xy + y^{3}}{x^{2} + 3xy^{2}}\)

 

[srmichael]

Post Edited 9/27/13

Solving for y'

\(\displaystyle f(x) = 2x^{3} + x^{2}y - xy^{3} = 3\)

\(\displaystyle f'(x) = 6x^{2} + y(2x) + x^{2}(1)y' - y^{3}(1) + x(3y^{2})y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy + x^{2}y' - y^{3} + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + x^{2}y' + 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + y'(x^{2} + 3xy^{2}) = 0\)

\(\displaystyle f'(x) = y'(x^{2} + 3xy^{2}) = -6x^{2} - 2xy + y^{3}\)

\(\displaystyle y' = \dfrac{ -6x^{2} - 2xy + y^{3}}{x^{2} + 3xy^{2}}\)

I believe SKhan had a typo in his derivation:

\(\displaystyle f'(x) = 6x^{2} + y(2x) + x^{2}(1)y' - y^{3}(1) - x(3y^{2})y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy + x^{2}y' - y^{3} - 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + x^{2}y' - 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + y'(x^{2} - 3xy^{2}) = 0\)

\(\displaystyle f'(x) = y'(x^{2} - 3xy^{2}) = -6x^{2} - 2xy + y^{3}\)

\(\displaystyle y' = \dfrac{ -6x^{2} - 2xy + y^{3}}{x^{2} - 3xy^{2}}\)

 

[Jason76]

I believe SKhan had a typo in his derivation:

\(\displaystyle f'(x) = 6x^{2} + y(2x) + x^{2}(1)y' - y^{3}(1) - x(3y^{2})y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy + x^{2}y' - y^{3} - 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + x^{2}y' - 3xy^{2}y' = 0\)

\(\displaystyle f'(x) = 6x^{2} + 2xy - y^{3} + y'(x^{2} - 3xy^{2}) = 0\)

\(\displaystyle f'(x) = y'(x^{2} - 3xy^{2}) = -6x^{2} - 2xy + y^{3}\)

\(\displaystyle y' = \dfrac{ -6x^{2} - 2xy + y^{3}}{x^{2} - 3xy^{2}}\)

No, it was my mistake. I did some editing on some posts.

 

[Deleted member 4993]

Why?

Short answer - that's the law!!

 

[Jason76]

Sorry, but my online homework still says it's wrong. I wonder what is the problem?

Oh, wait. Never mind. I just typed it in wrong.