prove that: x^3+y^3=(x+y)(x+yi)(x+yi^2)

Let X=2N={x=(x1,x2,…):xi∈{0,1}} and define d(x,y)=2∑(i≥1)(3^−i)*|xi−yi|. Define f:X→[0,1] by f(x)=d(0,x), where 0=(0,0,0,…). Prove that maps X onto...

Let X=2N={x=(x1,x2,…):xi∈{0,1}} and define d(x,y)=2∑(i≥1)(3^−i)*|xi−yi|. Define f:X→[0,1] by f(x)=d(0,x), where 0=(0,0,0,…). Prove that maps X onto the Cantor set and satisfies (1/3)*d(x,y)≤|f(x)−f(y)|≤d(x,y) for x,y∈2N.

Data for two variables, x and y, follow. xi 1   2   3   4   5 yi 5  ...

Data for two variables, x and y, follow. xi 1   2   3   4   5 yi 5   9   7   13   16 (a) Develop the estimated regression equation for these data. (Round your numerical values to two decimal places.) ŷ = 2.20+2.60x Compute the studentized deleted residuals for these data. (Round your answers to two decimal places.) xi yi Studentized Deleted Residual 1 5 2 9 3 7 4 13 5 16

Prove that if x, y are both odd, then x^2 + y^2 is not a perfect...

Prove that if x, y are both odd, then x^2 + y^2 is not a perfect square. (Hint: first prove that if a number is a square and even, it is congruent to zero modulo four.)

Prove that the set S = {(x, y, z) ∈ R 3 : x + y...

Prove that the set S = {(x, y, z) ∈ R 3 : x + y + z = b}. is a subspace of R 3 if and only if b = 0.

Prove that there exists a point (a, b) inside the circle (x − 3)^2 + (y...

Prove that there exists a point (a, b) inside the circle (x − 3)^2 + (y − 2)^2 = 13 such that a < 0 and b > 3.5. (recall: the point (a, b) is inside the circle means that (a − 3)^2 + (b − 2)^2 ≤ 13)

Below shows a sample of 5 pairs of data: x y 5 3 1 4 3...

Below shows a sample of 5 pairs of data: x y 5 3 1 4 3 5 8 6 3 1 The following are some summaries of the data: ∑ni=1xi=20,∑ni=1yi=19,∑ni=1(xi−x¯)=0,∑ni=1(yi−y¯)=0,∑i=1nxi=20,∑i=1nyi=19,∑i=1n(xi−x¯)=0,∑i=1n(yi−y¯)=0, ∑ni=1(xi−x¯)2=28,∑ni=1(yi−y¯)2=14.8,∑ni=1(xi−x¯)(yi−y¯)=9.∑i=1n(xi−x¯)2=28,∑i=1n(yi−y¯)2=14.8,∑i=1n(xi−x¯)(yi−y¯)=9. Calculate the regression line. Provide an interpretation of the intercept and slope coefficient. Round your answer to 4 decimal points.

Prove the following properties of Boolean algebras. Give a reason for each step. 1.(x.y)+(x′.z)+(x′.y.z′)=y+(x′.z) 2.x.y+x′=y+x′.y′ 3.x.y+y.z.x′=y.z+y.x.z′...

Prove the following properties of Boolean algebras. Give a reason for each step. 1.(x.y)+(x′.z)+(x′.y.z′)=y+(x′.z) 2.x.y+x′=y+x′.y′ 3.x.y+y.z.x′=y.z+y.x.z′ Prove that for any Boolean algebra: a. If x+y=0,then x=0 and y=0. b. x = y if and only if x . y′ + y .x′ = 0.

Prove that gradients of functions f(x, y) = 1/2 log(x^2+y^2) and g(x, y) = arctan(x) are...

Prove that gradients of functions f(x, y) = 1/2 log(x^2+y^2) and g(x, y) = arctan(x) are orthogonal and have the same magnitude at any point different from origin.

4. Prove that {(x, y) ∈ R 2 ∶ x − y ∈ Q} is an...

4. Prove that {(x, y) ∈ R 2 ∶ x − y ∈ Q} is an equivalence relation on the set of real numbers, where Q denotes the set of rational numbers.

Given are five observations for two variables, x and y. xi 1 2 3 4 5...

Given are five observations for two variables, x and y. xi 1 2 3 4 5 yi 2 8 6 11 13 a) Develop the estimated regression equation by computing the values of b0 and b1 using b1 = Σ(xi − x)(yi − y) Σ(xi − x)2 and b0 = y − b1x. ŷ =? b) Use the estimated regression equation to predict the value of y when x = 2.