See the entire solution process below: Explanation: First, group and combine like terms on the left side of the equation: \displaystyle-{4}{x}+{2}{x}+{3}{x}+{5}+{8}-{4}={3}+{3}\cdot{4} \displaystyle{\left(-{4}+{2}+{3}\right)}{x}+{\left({5}+{8}-{4}\right)}={3}+{3}\cdot{4} ...

If that is actually a sum, you can simply write P_n(x) = nx - \sum_{i=1}^{n} i = nx - \frac{n(n+1)}{2} So that P_{n-1}(x) = (n-1)x - \frac{(n-1)n}{2} And the answer is \frac{P_n(x)}{P_{n-1}(x)} = \frac{nx - \frac{n(n+1)}{2}}{(n-1)x - \frac{(n-1)n}{2}} = \frac{n}{n-1} \frac{x - \frac{n+1}{2}}{x - \frac{n}{2}} ...

The easiest description of the quadratic extension is that it has the same 25 elements as yours, with addition defined in the obvious way, and x^2 being defined as -x-2, that is, 4x+3. Then ...

Is there evidence of selection against long proteins and long genes? I am not aware of any such evidence and cursory googling did not reveal studies that researched a correlation between gene ...

Let we define the following (difference) operator: \delta : p(x) \mapsto (\delta p)(x)=p(x+1)-p(x). There are some simple properties if p(x) is a polynomial with degree d\geq 1: The degree of ...

We can at least work out the distribution of two IID {\rm Uniform}(0,1) variables X_1, X_2: Let Z_2 = X_1 X_2. Then the CDF is \begin{align*} F_{Z_2}(z) &= \Pr[Z_2 \le z] = \int_{x=0}^1 \Pr[X_2 \le z/x] f_{X_1}(x) \, dx \\ &= \int_{x=0}^z \, dx + \int_{x=z}^1 \frac{z}{x} \, dx \\ &= z - z \log z. \end{align*} ...