Answer to Question #103442 in Calculus for Effiong

The two variables function is given by:

"F(x,y) = x^3 + y^3 - 63(x+y) + 12xy"

The first order partial derivatives of this function are:

"F_x = 3x^2 - 63 + 12y \\, \\, and \\,\\, F_y = 3y^2 - 63 + 12x"

The second order partial derivatives of this function are:

"F_{xx} = 6x \\,\\,\\, , \\,\\,\\, F_{yy} = 6y \\,\\,\\, and \\,\\,\\, F_{xy} = 12"

For finding critical points of this function, we have to set "F_x = 0 \\,\\,\\, and \\,\\,\\, F_y = 0"

Hence:

"F_x = 0 \\\\\n\\Rightarrow 3x^2 - 63 + 12y = 0 \\\\\n\\Rightarrow 12y = 63 - 3x^2"

"\\Rightarrow 4y = 21 - x^2 \\\\\n\\Rightarrow y = \\frac{21 - x^2}{4}" (Equation 1)

And:

"F_y = 0 \\\\\n\\Rightarrow 3y^2 - 63 + 12x = 0 \\\\\n\\Rightarrow y^2 + 4x - 21 = 0"

"\\Rightarrow \\frac{(21 - x^2)^2}{16} + 4x - 21 = 0 \\hspace{1 cm} \\left[ \\because y = \\frac{21 - x^2}{4} \\right]"

"\\Rightarrow 441 - 42x^2 + x^4 + 64x - 336 = 0 \\\\\n\\Rightarrow x^4 - 42x^2 + 64x + 105 = 0 \\\\"

Using graphing calculator, we get the solutions of this polynomial equation and which are:

"x = -7 \\,\\,\\, , \\,\\,\\, x = -1 \\,\\,\\, , \\,\\,\\, x = 3 \\,\\,\\, and \\,\\,\\, x = 5"

Inserting "x = -7" into the (Equation 1), we have:

"y = \\frac{21 - (-7)^2}{4} \\\\\n\\Rightarrow y = -7"

Inserting "x = -1" into the (Equation 1), we have:

"y = \\frac{21 - (-1)^2}{4} \\\\ \n\\Rightarrow y = 5"

Inserting "x = 3" into the (Equation 1), we have:

"y = \\frac{21 - 3^2}{4} \\\\ \n\\Rightarrow y = 3"

Inserting "x = 5" into the (Equation 1), we have:

"y = \\frac{21 - 5^2}{4} \\\\\n \\Rightarrow y = -1"

Hence:

The critical points of this function are:

"(-7, -7) \\,\\,\\, , \\,\\,\\, (-1,5) \\,\\,\\, , \\,\\,\\, (3,3) \\,\\,\\, and \\,\\,\\ (5, -1)"

Now:

For classifying the critical points and obtaine the relative extrema values of this function, we will use the following "D"

"D = F_{xx} F_{yy} - (F_{xy})^2 \\\\\n \\,\\,\\,\\,\\,\\, = (6x)(6y) -(12)^2 \\\\\n \\,\\,\\,\\,\\,\\, = 36xy - 144"

At "(-7,-7)":

"D = 36(-7)(-7) - 144 \\\\\n\\,\\,\\,\\,\\,\\,\\, = 1620 > 0"

And:

"F_{xx} (-7,-7) \\,= 6(-7) \\\\\n\\hspace{1 cm} \\hspace{1 cm} = -42 < 0"

At "(-1,5)":

"D = 36(-1)(5) - 144 \\\\\n \\,\\,\\,\\,\\,\\,\\, = -324 < 0"

At "(3,3)":

"D = 36(3)(3) - 144 \\\\\n\\,\\,\\,\\,\\,\\,\\, = 180> 0"

"F_{xx} (3,3) \\,= 6(x) \\\\\n\\hspace{1 cm} \\hspace{1 cm} = 18 > 0"

At "(5,-1)":

"D = 36(5)(-1) - 144 \\\\\n \\,\\,\\,\\,\\,\\,\\, = -324 < 0"

So:

We can say that:

The saddle points of this function are:

"(5,-1) \\,\\,\\,\\, and \\,\\,\\,\\, (-1,5)"

The relative maximum of this function is exist at "(-7,-7)"

And:

The relative minimum of this function is exist at "(3,3)"

The relative maximum value of the function is:

"F(-7,-7) = (-7)^3 + (-7)^3 - 63(-7-7)" "+ 12(-7)(-7)"

"\\hspace{1 cm} \\,\\,\\,\\,\\,\\,\\,\\,\\,\\,\\,\\,\\, = 784"

The relative minimum value of the function is:

"F(3,3) = 3^3 + 3^3 - 63(3+3) + 12(3)(3)"

"\\hspace{1cm} \\,\\,= -216"