Suppose I have that:
$$F(x)= \frac{d H(Z)}{dZ}\cdot\frac{d^2 Z}{d x \,d y}$$
Now I want to find
$$\int F(x) \, dx $$
So can I say that
$$\int F(x) \, dx =\int \frac{d H(Z)}{dY} \, dZ\ ?$$
Any thoughts ?
Suppose I have that:
$$F(x)= \frac{d H(Z)}{dZ}\cdot\frac{d^2 Z}{d x \,d y}$$
Now I want to find
$$\int F(x) \, dx $$
So can I say that
$$\int F(x) \, dx =\int \frac{d H(Z)}{dY} \, dZ\ ?$$
Any thoughts ?