Write the given function.

$h(x,y)=10(2xy-3x$² $-4y$²   $-18x+28y +12)$

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

Consider the function. $f(x,y,z)$

Then, the gradient of the function is,$\nabla f =\frac{\partial f}{\partial x}x + \frac{\partial f}{\partial z}y + \frac{\partial f}{\partial z}z$

(a) Write the given function.   

         $h(x,y) =10(2xy-3x$² $-4y$² $18x+28y+12)$   ……. (1) 

Differentiate the function with respect to x and equate it equal to 0. 

$$\begin{gathered} \frac{dh}{dx}=0 \\ 20y-60x-180=0 \end{gathered}$$

Differentiate the function with respect to y and equate it equal to 0. 

$$\begin{gathered} \frac{dh}{dy}=0 \\ 20x-80y+280=0 \end{gathered}$$

From the two equations. 

$$\begin{gathered} x=-2 \\ y=3 \end{gathered}$$

Therefore, the hill is 3 miles west and 2 miles to north.

(b) Substitute  for x and 3 for y in the equation (1). 

$h(x,y) =10(2 (-2\left)\right(3)-3(-2)$²  $-4\left(3\right)$² $-18(-2)+28\left(3\right)+12) = 720ft.$

Therefore, the height of the hill is 720 ft.

(c) Determine the gradient of the equation (1).

$=\left[\right\{ 20(y-3x+9)\}$² $+20(x-4y+14)$² $\left\}\right]$^1/2 

 Substitute1 for x and 1 for y in the equation. 

$\nabla h(x,y) =\left[\right\{20\left(\right(1) -3(1)+9)\}$²  $+20\left(\right(1)-4(1)+14)$² $]$ ^1/2

$=311ft/mile$

Therefore, the slope is 311 ft /mile, at the point (1, 1) and in the north west direction.