Integrate the function ?(?,?,?)=−8?+3? over the solid between the planes z=0 and z =3, contained between...

Integrate f(x,y,z) = z over the region enclosed by x^2+y^2=3^2 , z=x^2+y^2 and z=0.

Integrate f(x,y,z) = z over the region enclosed by x^2+y^2=3^2 , z=x^2+y^2 and z=0.

An infinitely long solid cylindrical cable (radius R, centered on the z-axis) carries a volume current...

An infinitely long solid cylindrical cable (radius R, centered on the z-axis) carries a volume current ?⃗ = (??^5) ?̂, The cable is surrounded by a concentric, infinitely long solenoid (radius 3R, n turns /m) carrying a current ?0. a. Find expressions for the magnetic field in all regions of space. b. Graph the field as a function of position along the x-axis. c. Find the force on a segment of wire from (x = 4R, y = 0, z...

An infinitely long solid cylindrical cable (radius R, centered on the z-axis) carries a volume current...

An infinitely long solid cylindrical cable (radius R, centered on the z-axis) carries a volume current ?⃗ = (??^5) ?̂, The cable is surrounded by a concentric, infinitely long solenoid (radius 3R, n turns /m) carrying a current ?0. a. Find expressions for the magnetic field in all regions of space. b. Graph the field as a function of position along the x-axis. c. Find the force on a segment of wire from (x = 4R, y = 0, z...

Complex analysis For the function f(z)=1/[z^2(3-z)], find all possible Laurent expansions centered at z=0. then find...

Complex analysis For the function f(z)=1/[z^2(3-z)], find all possible Laurent expansions centered at z=0. then find one or more Laurent expansions centered at z=1.

The average value of a function f(x, y, z) over a solid region E is defined...

The average value of a function f(x, y, z) over a solid region E is defined to be fave = 1 V(E) E f(x, y, z) dV where V(E) is the volume of E. For instance, if ρ is a density function, then ρave is the average density of E. Find the average value of the function f(x, y, z) = 5x2z + 5y2z over the region enclosed by the paraboloid z = 4 − x2 − y2 and the...

B.) Let R be the region between the curves y = x^3 , y = 0,...

B.) Let R be the region between the curves y = x^3 , y = 0, x = 1, x = 2. Use the method of cylindrical shells to compute the volume of the solid obtained by rotating R about the y-axis. C.) The curve x(t) = sin (π t) y(t) = t^2 − t has two tangent lines at the point (0, 0). List both of them. Give your answer in the form y = mx + b ?...

7. Between Z=0 and Z=-3 a. 0.9987 b. -0.4987 c. 0.5000 d. 0.4987 e. 0.0013 8....

7. Between Z=0 and Z=-3 a. 0.9987 b. -0.4987 c. 0.5000 d. 0.4987 e. 0.0013 8. Between Z=-1.95 and Z=1.95 a. 0.9988 b. -0.4488 c. 0.4488 d. 0.9488 e. -0.9488 9. Between Z=1 and Z=3 a. 0.9987 b. 0.1573 c. 0.0013 d. 0.8413 e. 2 10. Find the Z value that corresponds to the given area . a. 1 b. 0.1 c. 0 d. 0.50 e. None of them 11. a. 0.8416 b. -0.1584 c. -0.20 d. -0.8416 e. 0.80...

Table 1: Cumulative distribution function of the standard Normal distribution z: 0 1 2 3 Probability...

Table 1: Cumulative distribution function of the standard Normal distribution z: 0 1 2 3 Probability to the left of z: .5000 .84134 .97725 .99865 Probability to the right of z: .5000 .15866 .02275 .00135 Probability between z and z: .6827 .9544 .99730 Table 2: Inverse of the cumulative distribution function of the standard Normal distribution Probability to the left of z: . 5000 .92 .95 .975 .9990 z: 0.00 1.405 1.645 1.960 3.09 1 Normal Distributions 1. What proportion...

3)Calculate the average rate of change of the given function over the given interval x 0...

3)Calculate the average rate of change of the given function over the given interval x 0 0.5 1 1.5 2 D(x) 0 4.2 6.5 10.4 14.7 a) D(x); [0.5, 2] b) f (x) = 6x2 – 2x; [2, 5] 4) 8 points each - Use the rules to find the derivatives of the following functions a) f (x) = 9x8 – 7x5 – 10 b) g(x) = 5/x6 – 2/x5 c) h (x) = x6(3x4 – 2x2)

Suppose Hannah is strictly risk averse with a utility function u over monetary amounts (y): u(y)=y​^(1/2)...

Suppose Hannah is strictly risk averse with a utility function u over monetary amounts (y): u(y)=y​^(1/2) Hannah is facing a risky situation: Either nothing happens to her wealth of $576 with probability 3/4 or she losses everything (so ends up with $0) with probability 1/4. Question 1 What is the expected payoff that Hannah is facing? Provide the numerical value. Numeric Answer: Question 2 What is Hannah's expected utility in this gamble? Provide the numerical value. Numeric Answer: Question 3...