The given functions are,

(a) $f(x,y,z) = x$⁴ $+ y$³ $+z$⁴

(b) $f(x,y,z) =x$² $y$³ $z$⁴

(c) $f(x,y,z) = e$^x  $\sin \left(y\right) In \left(z\right)$$\sin \left(y\right) In \left(z\right)$

The gradient of the function is defined as its slope on the curve of that function for the given particular point.

Write the given function.

$f(x,y,z)=x$⁴  + $y$³ $+ z$⁴ 

Differentiate the above function as,

$\partial f/\partial x= 2x$

$\partial f/\partial y=3y$²

$\partial f/\partial z=4z$² 

Then, the gradient of the function is written as,

$\nabla f=\partial f/\partial x x +\partial f/\partial y y+ \partial f/\partial z z$

      $=\left(2x\right)x +(3y$² $) y+(4z$³ $)z$

Write the given function.

$f(x,y,z) =x$²$y$³ $z$⁴ 

Differentiate the above function as,

$\partial f/\partial x=2xy$² $z$⁴

$\partial f/\partial y=3x$² $y$² $z$⁴

$\partial f/\partial f=4 x$²  $y$³ $z$³

Then, the gradient of the function is written as,

$\nabla f=\partial f/\partial x x +\partial f/\partial y y + \partial f/\partial z z$

$=(2xy$² $z$⁴ $)$$x + (3x$² $y$² $z$⁴ $)y+ (4x$² y³  z³   $)z$

Write the given function.

$f(x,y,z)=e$^x   $\sin \left(y\right)In \left(z\right)$

Differentiate the above function as,

$\partial f/\partial x=e$^x $\sin y In z$

$\frac{df}{dy}=e$^x $\cos y In z$

$\frac{\partial f}{\partial z}=e$^x $\sin y /z$

Then, the gradient of the function is written as, 

$\nabla ·f=\frac{\partial f}{\partial x}x +\frac{\partial f}{\partial y}y+\frac{\partial f}{\partial z}z$

$=(e$^x $\sin y In z)x+(e$^x  $\cos y In z)$

$y + (e$^x $\sin y /z ) z$

Therefore, the gradient of the function is.

$(e$^x $\sin y In z)x +(e$^x $\cos y In z )y +(e$^x $\sin y /z) z$