Answer:
A. [tex]\frac{\partial{h}}{\partial{t}}=0[/tex]
Step-by-step explanation:
A. The problems asked for 2 ways to solve it, expanding the equation with the substitution x(t)=2 cos(t) and y(t)=4 sin(t) to differentiate it . The other way is by chain rule.
Expanding and differentiating:
We start by substituting x(t)=2 cos(t) and y(t)=4 sin(t) in h(x,y)=4x2+y2:
[tex]h(x,y)=4x^{2}+y^{2}= 4(2cos(t))^{2}+(4sin(t))^{2}\\h(x,y)=4(4cos^{2}(t))+(16sen^{2}(t))\\h(x,y)=16cos^{2}(t)+16sen^{2}(t)=16(sen^{2}(t)+cos^{2}(t))\\h(x,y)=16[/tex]
So, in the path that the hiker chose:
[tex]\frac{\partial{h}}{\partial{t}}=0[/tex]
Chain rule:
We start differentiating h(x,y) using chain rule as follows:
[tex]\frac{\partial{h}}{\partial{t}}= \frac{\partial{h}}{\partial{x}}\frac{\partial{x}}{\partial{t}}+\frac{\partial{h}}{\partial{y}}\frac{\partial{y}}{\partial{t}}[/tex]
Now, it´s easy to find all these derivatives:
[tex]\frac{\partial{h}}{\partial{x}}=8x\\\frac{\partial{x}}{\partial{t}}=-2sin(t)\\\frac{\partial{h}}{\partial{y}}=2y\\\frac{\partial{y}}{\partial{t}}=4cos(t)[/tex]
Now we replace them in the chain rule, with the replacement x=2cos(t) and y=4sin(t) in the x,y that are left and we operate everything:
[tex]\frac{\partial{h}}{\partial{t}}= 8x(-2sin(t))+2y(4cos(t)[/tex]
[tex]\frac{\partial{h}}{\partial{t}}= 8(2cos(t))(-2sin(t))+2(4sin(t))(4cos(t)[/tex]
[tex]\frac{\partial{h}}{\partial{t}}= -32cos(t)sin(t)+32sin(t)cos(t)[/tex]
[tex]\frac{\partial{h}}{\partial{t}}= 0[/tex]
This will be our answer
