A2A, x=(b-c) /(b+c), y=(c-a) /(c+a), z=(a-b) /(a+b) equation 1 can be written as x=(b/c-1) /(b/c+1), y=(c/a-1) /(c/a+1), z=(a/b-1) /(a/b+1), equation 2 let, b/c =k1, c/a = k2, a/b=k3 replace k1, ...

2d=(a-b)/(b-c)  No solutions found Rearrange: Rearrange the equation by subtracting what is to the right of the equal sign from both sides of the equation : ...

The problem is: Either a=b and you made a mistake by multiplying by b-a Or a\ne b and then c=-1 and you made a mistake when you cancelled c+1. To do it properly, you would need to always ...

They are equations of two planes and we need to find an equation of the common line of these planes. Thus, with assumption that they are not parallel planes we need to prove that (a,b,c)\perp\left(\frac{b-c}{a},\frac{c-a}{b},\frac{a-b}{c}\right), ...

In order to find the inflection point and maxima, minima first I need to find the derivative/rate of change of the function. So what would be the function expression that I need to use? You have j(t) = f(a(t), b(t)) ...

c=(P-a)+(P-b) = 8+6 =14 The same procedure we get a=10 and b= 12. So \cos \gamma = {10^2+12^2-14^2\over 2\cdot 10\cdot 12} ={1\over 5} Thus \gamma =\arccos{1\over 5}=...