Find the Value of ( Y par ). And find moment of inertia about Y - Axis . (b) Determine the moment of inertia about y axis for the section shown in Figure Q3(b). (10 marks) 1 All dimensions in m.
Find the exact value of y or state that y is undefined. y = tan (tan-18)
3. (20 points) Find the solution y = y(x) of the initial value problem y 0 − y x = cos2 (y/x) , y(1) = π 3 3. (20 points) Find the solution y = y(x) of the initial value problem 37 - = cos”(y/2),y(1) = 5
2. Find the average value of the function f(x,y) y 2. (Sketch the region.) 1/, y xy over the region bounded by y x, and 2. Find the average value of the function f(x,y) y 2. (Sketch the region.) 1/, y xy over the region bounded by y x, and
Find the solution of the given initial value problem: y" + y = f(t); y(0) = 6, y'(0) = 3 where f(t) = 1, 0<t<3 0, įst<<
2. Prove Find the value of the normalization constant A for the wave function y Axe 2. Prove Find the value of the normalization constant A for the wave function y Axe
3). Prob. 19 Given: 4)y Find the value of y( , + 3),-0 and y(0) 4. The value of y is:
a) What is the value of c? b) Find the marginal density of Y. c) Find E(Y). d) Find the conditional density of X given Y, i.e., find fx|y(x|y) e) Find E(X|Y) f) Are X and Y independent? 4) Let (X, Y) be a continuous joint vector with density function: c( x +2 y ), 0<x<1,0<y<2 Sx,yo.olherwse
Find the value of x, y, and z in the figure. y = IM 50° Sp- 72-30 . [-11 Points] DETAILS GGEOM1 3.TB.001ALT. MY NOTES Find the value of x that will allow you to prove that DE if m1 = 110 and m 2 = 3x + 4 O 12 O 22 23 15 B D
Problem 1. Find the solution to the following initial value problems. (a) y'" – y" – 4y' + 4y = 0; y(0) = -4, y'(0) = -1, y"(0) = -19. (b) y'' – 4y"' + 7y – by = 0; y(0) = 1, y'(0) = 0, y"(O) = 0.