\displaystyle-{3}{x}^{{2}}-{x}^{{2}}{y}+{4}{y} Explanation: In this expression the brackets are not necessary because it is an addition. \displaystyle{\left({x}^{{2}}{y}\right)}{\left(\ \text{ }\ -{3}{x}^{{2}}\right)}{\left(\ \text{ }\ +{y}+{3}{y}\right)}{\left(\ \text{ }\ -{2}{x}^{{2}}{y}\right)}\ \text{ }\ \leftarrow ...

Good try thus far. You got the factorization wrong, but it is 2x+y times 3x+y, so the idea to factorize the first three terms was correct. Write : 6x^2 + 5xy + y^2 + x + 2y - 15 = (2x+y + a)(3x +y + b) ...

x2+3y2-2x+12y+13=0  No solutions found Step by step solution : Step  1  :Equation at the end of step  1  : ((((x2) + 3y2) - 2x) + 12y) + 13 = 0 Step  2  :Equation at the end of step  2  : x2 - 2x + ...

\displaystyle{\left({x}-{1.41}\right)}^{{2}}+{\left({y}+{2.49}\right)}^{{2}}={23.385} Explanation: For this we should first find points of intersection of the two circles \displaystyle{x}^{{2}}+{y}^{{2}}-{4}{x}-{2}{y}-{31}={0} ...

HINT: z = 2x^2 + y^2 +2xy -2x +2y +2=(x+y+1)^2+(x-2)^2+2-4-1 Derivation : Let 2x^2 + y^2 +2xy -2x +2y +2=(x+y+a)^2+(x+b)^2+2-a^2-b^2 \implies 2x^2 + y^2 +2xy -2x +2y +2=2x^2+y^2+2xy+2x(a+b)+2ay+2-a^2-b^2 ...

\displaystyle{32}{x}^{{13}}{y}^{{2}}{z}^{{12}} Explanation: Given - \displaystyle{\left(-{x}^{{4}}{y}^{{2}}{z}^{{3}}\right)}{\left(-{2}{x}^{{3}}{z}^{{3}}\right)}^{{3}} \displaystyle{\left(-{x}^{{4}}{y}^{{2}}{z}^{{3}}\right)}{\left({\left(-{2}\right)}^{{3}}{\left({x}^{{3}}\right)}^{{3}}{\left({z}^{{3}}\right)}^{{3}}\right)} ...