Asked by masaya
I heard that when we are proving Leibniz's formula for differentiating an integral, we use chain rule i.e.
dw/dx=(Ýw/Ýu)(du/dx) + =(Ýw/Ýv)(dv/dx) + (Ýw/Ýx)
where u is the upper limit and v is the lower limit of integration, and the w is integral of f(x,y) with respect to y.
how is this chain rule work?
i tried to c how it works, but i cannot get it.
dw/dx=(Ýw/Ýu)(du/dx) + =(Ýw/Ýv)(dv/dx) + (Ýw/Ýx)
where u is the upper limit and v is the lower limit of integration, and the w is integral of f(x,y) with respect to y.
how is this chain rule work?
i tried to c how it works, but i cannot get it.
Answers
Answered by
Damon
To figure it out graph a function from x = a to x = b
Then look for example at how the area under the function changes at x = b as b changes
It is the value of the function at b times the change of b
Then look for example at how the area under the function changes at x = b as b changes
It is the value of the function at b times the change of b
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