Nghi N. May 26, 2015 \displaystyle{\left[{\left({x}^{{2}}+{6}{x}+{9}\right)}-{y}^{{2}}\right]}={\left({x}+{3}\right)}^{{2}}-{y}^{{2}}={\left({x}+{3}-{y}\right)}{\left({x}+{3}+{y}\right)}

X^2-6xy+9y^2=x^2-3xy-3xy+9y^2                                =x(x-3y)-3y(x-3y)                                =(x-3y) (x-3y)  or                                =(x-3y) ^2   2. ...

Factors of \displaystyle{4}{x}^{{2}}-{6}{x}{y}+{9}{y}^{{2}} are \displaystyle{\left({4}{x}-{3}{y}-{3}\sqrt{{3}}{y}{i}\right)}{\left({x}-\frac{{3}}{{4}}{y}+\frac{{3}}{{4}}\sqrt{{3}}{y}{i}\right)} ...

vince Feb 16, 2015 Hello ! Do you really need integrals to calculate these aera ? Maybe I did not understand your problem, but the aera is easy : \displaystyle{\mathcal{{{A}}}}={\frac{{{1}}}{{{4}}}}\pi\cdot{6}^{{2}}-{\frac{{{1}}}{{{2}}}}\pi\cdot{3}^{{2}}={\frac{{{9}}}{{{2}}}}\pi ...

the zeros are \displaystyle{x}_{{1}}={1}+\sqrt{{2}}{i} \displaystyle{x}_{{2}}={1}-\sqrt{{2}}{i} Explanation: In order to solve for the zeros, we equate the given equation to zero. Let y=0 ...

(4x^4+9y^4)(1/4+1/9) \geq (\frac{1}{2}2x^2+\frac{1}{3}3y^2)^2=(x^2+y^2)^2 by Cauchy Schwartz inequality. Now substitute the values to get the answer. When using lagrange multiplier. From your first ...