Suppose that f(2,y) = e* / on the domain D= {(2, y) 0 <y< 2,0 <I<y}...
Suppose that f(x, y) = y V x3 + 1 on the domain D = {(x, y) | 0 < y < x < 1}. D Then the double integral of f(x, y) over D is S] f(x, y)dady - Preview Get help: Video License Points possible: 1 This is attempt 1 of 3.
Suppose that f(x, y) = 1 on the domain D = {(x, y) – 5 < x < 3, -5 <y <3}. D a Then the double integral of f(x, y) over D is 1 dædy
2 Suppose that f(x, y) = - and the region D is given by {(x, y) |1<<3,3 <y < 6}. y D Q Then the double integral of f(x, y) over D is S1,612,)dady
Question 1 1 pts Let F= (2,0, y) and let S be the oriented surface parameterized by G(u, v) = (u? – v, u, v2) for 0 <u < 12, -1 <u< 4. Calculate | [F. ds. (enter an integer) Question 2 1 pts Calculate (F.ds for the oriented surface F=(y,z,«), plane 6x – 7y+z=1,0 < x <1,0 Sysi, with an upward pointing normal. (enter an integer) Question 3 1 pts Calc F. ds for the oriented surface F =...
. Suppose that f(x, y) and the region D is given by {(x, y) 1<x<3,3 <y< 6}. y D Then the double integral of f(x, y) over D is f(x, y)dxdy
With double integral find surface area when y=e", y = x, y = 4 and axis y with y <et
I need help on parts e-f 4. Suppose that P{X = i, Y = j} = c(i+j) for nonnegative integers i and j with i+j < 3; otherwise, the probability is zero. (a) Determine c. (b) Compute the marginal p.m.f. of X. (c) Compute the marginal p.m.f. of Y. (d) Are X and Y be independent? (e) Compute P(X+Y < 2). (f) Compute E[XY). (g) Compute E[X] and E[Y). (h) Compute E[X+Y).
7. Given the joint density function /(x,y) =(kx (1 + 3 y*) 0<x<2,0<p?1 elsewhere a. Find k, g() h) and f(x) b. Evaluate P(-<X<1)
Define the density function (f(x)) as below: f(x) = cx'for 0<x<2,0 otherwise Where c was determined above. What is the probability this random variable takes a value between 1 and 1.5?
Evaluate & Fodr, where F(x, y, z) = (y² -2 2,5x) and C: 714) =<t", t, -tº), -15ts 1.