p=10-q Geometric figure: Straight Line   Slope = -2.000/2.000 = -1.000   p-intercept = 10/1 = 10.00000   q-intercept = 10/1 = 10.00000 Rearrange: Rearrange the equation by subtracting what ...

If F(T) is uniformly distributed, so is 1 - F(T). P(1 - F(T) < t) = P(F(T) > 1 - t) = 1 - P(F(T) \leq 1 - t) = 1 - (1 - t) = t Where in the second to last inequality, we use that F(T) is ...

Your solutions to problems 3, 4, and 5 are correct. The side length of a square is 4~\text{m} . When each side is increased by the same amount, the side length of the square doubles. By how much ...

The shifted Legendre polynomials \frac{P_n(2x-1)}{\sqrt{2n+1}} provide an orthonormal base of L^2(0,1) with respect to the standard inner product. Assuming |p(x)| = \sum_{n\geq 0} a_n \frac{P_n(2x-1)}{\sqrt{2n+1}} ...

Gauss' lemma tells us to look at the number of negative least residues in the list of numbers a, 2a, 3a, ..., \frac{p-1}{2}a When that number is even, then (\frac{a}{p})=1, when odd, then (\frac{a}{p})=-1 ...

We deal first with the p of shape 4n+1 case you had trouble with. Suppose that the congruence has a solution s. Then p divides (s+i)(s-i). If p were irreducible, it would be a Gaussian ...