Office_Shredder said:When you say "the slope", it's not clear what you mean because there is a slope in every direction from P for this function. If you did the correct procedure to figure out the sign of fx you should be able to do the exact same thing to figure out fy - why don't you elaborate on how you did fx?
A partial derivative is a mathematical concept used in multivariate calculus to describe how a function changes with respect to one of its variables while holding other variables constant. It is denoted by ∂ (partial) and can be thought of as the slope of a function in a specific direction.
To find the partial derivative of a function with multiple variables, you need to take the derivative with respect to one variable while treating all other variables as constants. This can be done by using the appropriate derivative rules, such as the power rule or chain rule.
The level curves in a partial derivative represent the points where the partial derivative has a constant value. They are also known as contour lines and can be used to visualize the behavior of a function in multiple dimensions.
The signs of partial derivatives on level curves indicate the direction of change of the function in a specific direction. A positive sign indicates that the function is increasing in that direction, while a negative sign indicates a decrease. Additionally, the magnitude of the partial derivative can also indicate the rate of change.
Partial derivatives are a special case of total derivatives, which describe the overall change of a function with respect to all its variables. While partial derivatives focus on a specific direction, total derivatives take into account changes in all directions. Partial derivatives can be used to find the total derivative of a multivariable function by taking the sum of all partial derivatives with respect to each variable.