i.need solv 2 Jan Show that the force field given by: F=x?yzi - xyz?k ,is non conservative .
4. Solve the D.E. 2x’y" +19.x²y" + 39xy' +9y = 0 ini? hacmid=0
1315) Imaqine some DEQ: yE(y) iven in this exercise. is not y'=f(x,y), which Q: and y, given Use Euler integration to determine the next values ofx the current values: x-l, y-4 and he step size is deltax- 6. ans:2 rk Set--w 1315) Imaqine some DEQ: yE(y) iven in this exercise. is not y'=f(x,y), which Q: and y, given Use Euler integration to determine the next values ofx the current values: x-l, y-4 and he step size is deltax- 6. ans:2...
Problem,2.1. Dsigning a daily routine for as ini ias biud to be around 110 years This Given: The longest life span of an average human has been found to be around 110 years. This is revealed to be strongly dependent on the amount of food intake along with the amount of exercise executed. Let Y be the life span in years, X,, the number of hours of exercise per week, and X,, the kilogram of food intake per week. Find:...
s ini ths problem.)Peer prica Peter should he witling to pay for the compuner now? Click here to view Exhibil 8B-1 and Exhibil E8-2 to delerrmire the appropriste discoun actors sing lables. O $29175 O $25.095 O $25,585
Given that y=x is a solution of (x2 - x +1)y" - (x2 + x)y' + (x+1)y=0, a linearly independent solution obtained by reducing the order is given by
. 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
Hans has $27 which he decides to spend on x and y. Commodity x costs $16 per unit and commodity y costs $10 per unit. He has the utility function U(x, y) = 5x 2y 2 and he can purchase fractional units of x and y. What is his optimal consumption bundle? Show your result on a graph.
The joint pdf for rv X, Y is given as follows: if 1 ? x,y ? 2 and it is zero else. Find: (a) The value of c (b) E(X) (c) E(Y) (d) E(X|Y) (e) Var(X|Y) (f) The MMSEE of eX given Y , E(eX|Y ) (g) Are X and Y independent? fx,y(x, y) = c(2²/y)
Given g(x, y) = sigma (0, 1, 3), prove that g(x, y) = x + y using boolean algebraic simplification d. Given g(x, y) = Product (0, 1), Prove that g(x, y) - x using boolean algebraic simplification