Find ∫∫R xy2/x2+1dA,  R=[0,1]×[−4,4]

Let R=[0,1]×[0,1]. Find the volume of the region above R and below the plane which passes...

Let R=[0,1]×[0,1]. Find the volume of the region above R and below the plane which passes through the three points (0,0,1), (1,0,9) and (0,1,5).

For z=x2-xy2 find: a. the gradient of Z b. the directional derivative in direction of <3,1>...

For z=x2-xy2 find: a. the gradient of Z b. the directional derivative in direction of <3,1> c. the approximation for Δ? when taking a Δs =0.05 step from (1,2) in direction of <3,-1> d. the approximation to the maximum Δ? possible when taking a Δs =0.05 step from (1,2).

Prove that |R^2| = |R| by showing |(0,1) x (0,1)| = |(0,1)| through cardinality.

Prove that |R^2| = |R| by showing |(0,1) x (0,1)| = |(0,1)| through cardinality.

If X1, X2 are random sample from a distribution which is N(0,1), find the joint p.d.f...

If X1, X2 are random sample from a distribution which is N(0,1), find the joint p.d.f of Y1 = (X1)^2 + (X2)^2 and the marginal p.d.f of Y1

Let C [0,1] be the set of all continuous functions from [0,1] to R. For any...

Let C [0,1] be the set of all continuous functions from [0,1] to R. For any f,g ∈ C[0,1] define dsup(f,g) = maxxE[0,1] |f(x)−g(x)| and d1(f,g) = ∫10 |f(x)−g(x)| dx. a) Prove that for any n≥1, one can find n points in C[0,1] such that, in dsup metric, the distance between any two points is equal to 1. b) Can one find 100 points in C[0,1] such that, in d1 metric, the distance between any two points is equal to...

Use Stokes' theorem to find the flux curl ∫∫s (CurlG). dS where G(x,y,z) = <-xy2, x2y,...

Use Stokes' theorem to find the flux curl ∫∫s (CurlG). dS where G(x,y,z) = <-xy2, x2y, 1> and S is the portion of the paraboloid z = x2 + y2 inside the cylinder x2 + y2 = 1. Use an upward-pointing normal.

Let f: (0,1) -> R be uniformly continuous and let Xn be in (0,1) be such...

Let f: (0,1) -> R be uniformly continuous and let Xn be in (0,1) be such that Xn-> 1 as n -> infinity. Prove that the sequence f(Xn) converges

Prove that the function f(x) = x2 is uniformly continuous on the interval (0,1).

Prove that the function f(x) = x2 is uniformly continuous on the interval (0,1).

Let X1, X2, X3 be independent random variables, uniformly distributed on [0,1]. Let Y be the...

Let X1, X2, X3 be independent random variables, uniformly distributed on [0,1]. Let Y be the median of X1, X2, X3 (that is the middle of the three values). Find the conditional CDF of X1, given the event Y = 1/2. Under this conditional distribution, is X1 continuous? Discrete?

Find an equation of the tangent plane to the surface at the given point. xy2 +...

Find an equation of the tangent plane to the surface at the given point. xy2 + 2x − z2 = 15, (4, −2, 3)