\(f(x, y, z) = x^2e^{2y-3z}\) find
fx, fy, fz, fyz and fzy.
\(f_x = 2xe^{2y-3z}\)
\(f_y = 2x^2e^{2y-3z}\)
\(f_z = -3x^2e^{2y-3z}\)
\(f_{yz} = -6x^2e^{2y-3z}\)
\(f_{zy} = -6x^2e^{2y-3z}\)
The most valuable elements taken away from this course for was our
probability unit whose practicality seemed to reverberate through the
other classes. Markov chains were interesting as well as it seemed to be
the one thing I’ve always wanted to know but never heard about before.
Overall It was challenging class for me but I enjoyed it
tremendously.