Multivariable function F(t)=f(x(t),y(t)), and we find derivative of F with respect to t....

Uriel Hartman

Uriel Hartman

Answered question

2022-11-05

Multivariable function F ( t ) = f ( x ( t ) , y ( t ) ), and we find derivative of F with respect to t . . . . in our derivative the first member is d f d x βˆ— d x d t + . . . . .) Why d f d x depends on x and y.

Answer & Explanation

Lillianna Salazar

Lillianna Salazar

Beginner2022-11-06Added 22 answers

The variable t is irrelevant here.
The partial derivative f x β€² ( x , y ) measures the slope of the graph z = f ( x , y ) in the π‘₯ direction at the point ( x , y ), and of course that slope can be different at different points. So it depends on x and y, in general.

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