Quiz

Generating...

quiz05c_n1

Choose the correct statement regarding the extreme value for $f(x,y) = e^{3\,x\,y}$ subject to $\displaystyle x^3+y^3=2$ .
The point at the extreme value satisfies $\begin{displaymath}\begin{cases} 3\,y\,e^{3\,x\,y} = \lambda ( 3\,x^2); \\ 3\... ...^{3\,x\,y} = \lambda ( 3\,y^2); \\ x^3+y^3 = 2. \end{cases}\end{displaymath}$
The point at the extreme value satisfies $\begin{displaymath}\begin{cases} 3\,y\,e^{3\,x\,y} = \lambda ( x^3+y^3); \\ 3... ...{3\,x\,y} = \lambda ( x^3+y^3); \\ x^3+y^3 = 2. \end{cases}\end{displaymath}$
The point at the extreme value satisfies $\begin{displaymath}\begin{cases} 3\,x\,y\,e^{3\,x\,y} = \lambda ( 3\,y^2); \\ ... ...^{3\,x\,y} = \lambda ( 3\,x^2); \\ x^3+y^3 = 2. \end{cases}\end{displaymath}$
The point at the extreme value satisfies $\begin{displaymath}\begin{cases} e^{3\,x\,y} = \lambda ( 3\,x^2); \\ e^{3\,x\,y} = \lambda ( 3\,y^2); \\ x^3+y^3 = 2. \end{cases}\end{displaymath}$
Suppose that $\displaystyle \frac{9\,x}{92}+\frac{9\,y}{23}-\frac{z}{46}=1$ is the tangent plane at the point [ 2 , 2 , − 1 ] to the ellipsoid $\dfrac{x^2}{a^2} + \dfrac{y^2}{b^2} + \dfrac{z^2}{c^2} = 1$ . Then find the values , and .
$a = \frac{2\,\sqrt{46}}{3}$ , $b = \frac{\sqrt{46}}{3}$ , and $c = \sqrt{46}$ . $a = \frac{\sqrt{46}}{3}$ , $b = \sqrt{46}$ , and $c = \frac{2\,\sqrt{46}}{3}$ . $a = \sqrt{46}$ , $b = \frac{\sqrt{46}}{3}$ , and $c = \frac{2\,\sqrt{46}}{3}$ . $a = \frac{\sqrt{46}}{3}$ , $b = \frac{2\,\sqrt{46}}{3}$ , and $c = \sqrt{46}$ .
Let $f(x,y) = 2\,x^2+x^3+3\,y^2+x\,y^2$ . Find the value at the critical point [ y = 0 , x = 0 ] for second derivative test.
$D = -\frac{40}{3}$ $D = -\frac{16}{3}$
Let $\displaystyle \frac{36\,x^2}{49}+\frac{9\,y^2}{49}+\frac{4\,z^2}{49}=1$ be the ellipsoid. Find the tangent plane at the point [ − 1 , 1 , 1 ] .
$\displaystyle -\frac{9\,x}{49}+\frac{36\,y}{49}+\frac{4\,z}{49}=1$ $\displaystyle -\frac{4\,x}{49}+\frac{9\,y}{49}+\frac{36\,z}{49}=1$ $\displaystyle -\frac{36\,x}{49}+\frac{4\,y}{49}+\frac{9\,z}{49}=1$ $\displaystyle -\frac{36\,x}{49}+\frac{9\,y}{49}+\frac{4\,z}{49}=1$
Let $f(x,y) = x^2+x^3+3\,y^2+x\,y^2$ . Find the gradient $\nabla f(x,y)$ .
$\displaystyle \left[ 4\,x+3\,x^2+y^2 , 6\,y+2\,x\,y \right]$
$\displaystyle \left[ 4\,x+3\,x^2+y^2 , 4\,y+2\,x\,y \right]$
$\displaystyle \left[ 2\,x+3\,x^2+y^2 , 6\,y+2\,x\,y \right]$
$\displaystyle \left[ 2\,x+3\,x^2+y^2 , 4\,y+2\,x\,y \right]$
Let $f(x,y) = 2\,x^2+2\,x^2\,y+y^2$ . Find all the critical points.
[ y = 0 , x = 0 ] , $\displaystyle \left[ y=-\frac{1}{2} , x=-\frac{1}{\sqrt{2}} \right]$ and $\displaystyle \left[ y=-\frac{1}{2} , x=\frac{1}{\sqrt{2}} \right]$ [ y = 0 , x = 0 ] , [ y = −2 , x = 2 ] and [ y = −2 , x = − 2 ] [ y = 0 , x = 0 ] , $\displaystyle \left[ y=-1 , x=-\sqrt{2} \right]$ and $\displaystyle \left[ y=-1 , x=\sqrt{2} \right]$ [ y = 0 , x = 0 ] , [ y = −1 , x = − 1 ] and [ y = −1 , x = 1 ]
Find the extreme value for $f(x,y,z) = 2\,x+y+z$ subject to $\displaystyle x^2+y+z^2=3$ .
The extreme value $\displaystyle \frac{3}{2}$ at $\displaystyle \left[ y=\frac{1}{2} , z=\frac{1}{2} , x=\frac{1}{2} \right]$
The extreme value $\displaystyle \frac{9}{4}$ at $\displaystyle \left[ y=-\frac{1}{4} , z=\frac{1}{2} , x=1 \right]$
The extreme value $\displaystyle \frac{17}{4}$ at $\displaystyle \left[ y=\frac{7}{4} , z=\frac{1}{2} , x=1 \right]$
The extreme value $\displaystyle \frac{7}{2}$ at $\displaystyle \left[ y=\frac{5}{2} , z=\frac{1}{2} , x=\frac{1}{2} \right]$
Choose the correct answer regarding the critical point [ y = 0 , x = 0 ] for $f(x,y) = 2\,x^2+x^3+2\,y^2+x\,y^2$ .
It is a local minimum
It is a saddle point
Let $f(x,y) = 2\,x^2+x^2\,y+y^2$ . Find the gradient $\nabla f(x,y)$ .
$\displaystyle \left[ 2\,x+2\,x\,y , x^2+2\,y \right]$
$\displaystyle \left[ 4\,x+2\,x\,y , x^2+2\,y \right]$
$\displaystyle \left[ 4\,x+4\,x\,y , 2\,x^2+2\,y \right]$
$\displaystyle \left[ 2\,x+4\,x\,y , 2\,x^2+2\,y \right]$
Find the extreme value for $f(x,y,z) = 2\,x^2+y^2+z^2$ subject to x + y + 2z = 1 .
The extreme value $\displaystyle \frac{1}{6}$ at $\displaystyle \left[ z=\frac{1}{3} , y=\frac{1}{6} , x=\frac{1}{6} \right]$
The extreme value $\displaystyle \frac{3}{2}$ at $\displaystyle \left[ z=1 , y=\frac{1}{2} , x=\frac{1}{2} \right]$
The extreme value $\displaystyle \frac{18}{11}$ at $\displaystyle \left[ z=\frac{12}{11} , y=\frac{6}{11} , x=\frac{3}{11} \right]$
The extreme value $\displaystyle \frac{2}{11}$ at $\displaystyle \left[ z=\frac{4}{11} , y=\frac{2}{11} , x=\frac{1}{11} \right]$

Department of Mathematics
Last modified: 2026-02-06