a2y-3a2b+4xy-12bx Final result : a2y - 3a2b + 4yx - 12bx Step by step solution : Step  1  :Equation at the end of step  1  : ((((a2)•y)-(3a2•b))+4yx)-12bx Step  2  :Final result : a2y - 3a2b + 4yx - ...

A Explanation: You may notice that it bears some similarities to a circle with the general form \displaystyle{\left({x}-{h}\right)}^{{2}}+{\left({y}-{k}\right)}^{{2}}={r}^{{2}} where \displaystyle{\left({h},{k}\right)} ...

not the same coefficient Explanation: The equation of the circle in the standard form is the following: \displaystyle{x}^{{2}}+{y}^{{2}}+{a}{x}+{b}{y}+{c}={0} that is reachable if the terms of ...

\displaystyle{m}=-\frac{{65}}{{3}} Explanation: Substitute \displaystyle{x}={4} , \displaystyle{y}={3} into the equation to find: \displaystyle{3}{\left({4}^{{2}}\right)}+{3}{\left({3}^{{2}}\right)}-{2}{\left({4}\right)}+{m}{\left({3}\right)}-{2}={0} ...

8y5-10x4+2x3-5=0  No solutions found Step by step solution : Step  1  :Equation at the end of step  1  : (((8•(y5))-(10•(x4)))+2x3)-5 = 0 Step  2  :Equation at the end of step  2  : (((8 • (y5)) - ...

We don't have to find the coordinates of the four points. Since (x^2+y^2+6x-24y+72)-(x^2-y^2+6x+16y-46)=0 \Rightarrow 2y^2-40y+118=0 we can set the four points as (-3\pm\alpha,\beta),(-3\pm\gamma,\omega) ...