The given function is: 

$z=x^2\sin y+y\sin x$

First we find the gradient of the given function.

$\nabla z=\frac{\partial z}{\partial x}\hat{\mathrm{i}}+\frac{\partial z}{\partial y}\hat{\mathrm{j}}=\left(2x\sin y+y\cos x\right)\hat{\mathrm{i}}+\left(2x\sin y+y\cos x\right)\hat{\mathrm{j}}$

Now we find the gradient of the function at the point $\left(\mathrm{\pi },\frac{\mathrm{\pi }}{2}\right)$ by putting $x=\mathrm{\pi } \mathrm{and} \mathrm{y}=\frac{\mathrm{\pi }}{2}$ we will get,

$\overline{)\nabla z}\left({}_{\mathrm{\pi },\frac{\mathrm{\pi }}{2}}\right)=\frac{3\mathrm{\pi }}{2}\hat{\mathrm{i}}+0\hat{\mathrm{j}}$

So, the direction in which the given function increases most rapidly is $\left(\frac{3\mathrm{\pi }}{2},0\right)$.

The rate of change of the function in $\left(\frac{3\mathrm{\pi }}{2}\hat{\mathrm{i}}+0\hat{\mathrm{j}}\right)$direction is:

$||\nabla z\left(\mathrm{\pi },\frac{\mathrm{\pi }}{2}\right)||=\sqrt{{\left(\frac{3\mathrm{\pi }}{2}\right)}^2+0^2}=\frac{3\mathrm{\pi }}{2}$

The direction in which the given function decreases most rapidly at $\left(\mathrm{\pi },\frac{\mathrm{\pi }}{2}\right)$ is the opposite of direction in which the function increases the most rapidly that is:

$-\left(\frac{3\mathrm{\pi }}{2}\hat{\mathrm{i}}+0\hat{\mathrm{j}}\right)$

So, the direction in which the given function decreases most rapidly is $-\left(\frac{3\mathrm{\pi }}{2}+0\right)$.