I will assume that a and b are \ge 0, but are not both 0. Take the square root(s). We get \sqrt{a} \,x=\pm\sqrt{b}(x-10). Now we have two linear equations. Deal with them separately. The ...

We know, a^(m+n) = (a^m) ×(a^n) [a,m,n are all natural numbers] According to the problem, 7^(2x+1) = (7^2x)×(7^1) =(7^2x)×7……….(1) Now, a^(mn) = (a^m)^n [a,m,n are all natural numbers] According ...

you can simplify 1- 3^{-x} + 2*3^{-x-1} = 1 + 3^{-x}\left(2*3^{-1} - 1\right) = 1 + 3^{-x}\left(\dfrac23 - 1\right) = 1 - 3^{-x-1}

What you have found is that 10^{.7} is very close to 5; to put it another way, \log_{10}5 is close to .7; yet another equivalent statment is that \log_{10}2 is very close to .3, and yet ...

Of all the properties of a distance, the one requiring some work is the triangle inequality. Before tackling it, note the following: in (3) take \alpha = \frac 1 2, x_2=0, x_1=x. Then \phi (\frac 1 2 x) \geq \frac 1 2 \phi (x) ...

Let's be clear about the meaning of the problem. First, each server's behavior is independent of the others. If one fails, that does not affect the state of the others. Second, the random variables X_1, X_2, X_3 ...