5* 2^x - 3*2^(x-1) = 224 let 2^x = y   5* y - 3*2^x*2^-1 = 224   5*y - 3*y/2=224   10 y -3y = 448   7 y = 448   y = 64   2^x = 64   2^x = 2^6   x = 6 Exponential Function

Yes, you are right, so far. But, why can’t you just sum up terms with same power of x , that is, (x^3+3x^2+3x+1)(1+x+x^2) = (x^\color{red}{5})+(3x^\color{green}{4} + x^\color{green}{4}) + (x^\color{blue}{3}+3x^\color{blue}{3}+3x^\color{blue}{3})+(3x^\color{orange}{2}+3x^\color{orange}{2}+x^\color{orange}{2})+(3x^\color{cyan}{1}+x^\color{cyan}{1})+1 ...

I like to do things in what I call “the dumbest way possible.” First I draw a rough graph of x*(100+2x) and 10*1.5^x I realize that the solution can be found using an iterative technique as follows. ...

The soln. is \displaystyle{x}=-{3.} Explanation: \displaystyle{4}^{{{3}{x}+{2}}}\times{32}^{{{x}-{2}}}={8}^{{{3}{x}-{4}}} \displaystyle\Rightarrow{\left({2}^{{2}}\right)}^{{{3}{x}+{2}}}\cdot{\left({2}^{{5}}\right)}^{{{x}-{2}}}={\left({2}^{{3}}\right)}^{{{3}{x}-{4}}} ...

First, a simplification (using 0<\epsilon<1): \arctan\left(\frac{\epsilon-1}{\sqrt{1-\epsilon^2}}\tan\frac\theta2\right) =\arctan\left(-\frac{\sqrt{1-\epsilon}\sqrt{1-\epsilon}}{\sqrt{1-\epsilon}\sqrt{1+\epsilon}}\tan\frac\theta2\right)= -\arctan\left(\sqrt{\frac{{1-\epsilon}}{{1+\epsilon}}}\tan\frac\theta2\right) ...

When you take log of both sides it should be as follows: ln(1.6^{2012}+1.6^{2013})=xln(1.6) You can't separate those logarithms on the LHS as you did.