write acceleration equation for m1 z W OL 5kg) Tin ropez BON F Friction 1 ш...
Q1. Given the situation as shown in the figure. M1-5Kg and M2-10kg. Assume there is no friction M1 M2 300 a. Draw one Free Body Diagram for each object. Draw them on above diagram. 10points b. For each object and each direction, write down F-ma for each object 10 points c. Solve the set of equations and find the acceleration of the boxes. 10 points
Question 2: acceleration with friction 0C 1) m,- 3kg m2- 5kg 2) angle 42 degrees 3) Friction: 0.23 Show work in next slide
The equation W = F(x, y, z) =0 defies the variable z implicitly as a function zz flxy). Draw a branch diagram for differentiating w with respect to x, then prove dz dx Ez
Please help. Block 1 (m1 = 5kg) and block 2 (m2 = 6 kg) are adjacent. Block 1 (m1 5 kg) and block 2 (m2 6 kg) are adjacent to each other on the surface of a table. Block 2 is to the LEFT of block 1. A rope pulls on block 2 up and to the right with a vertical tension of 30 N upward, and both blocks move right with an acceleration of magnitude 3 m/s2. The coefficient...
8. Write out the Chain Rule for w = f(:r,y,z) and 1 = r, s, t), y = y(r, s,t), z = z(1,5,6). (4)
(1 point) Write limits of integration for the integral Sw f(x, y, z) dV, where W is the quarter cylinder shown, if the length of the cylinder is 3 and its radius is 2. Z Sw f(x,y,z) dV = SSS f(z,y,z)d d d where a = b= I d= and f (Note: values for all answer blanks must be supplied for this problem to be able to check the answers provided.)
1. (10 pts) For the system below, write the 4th modal equation f(t) Base Fixed x,o (t) Assume: に100000-, m=5kg, and,f(1)-1000 sin(50m)×1の Modal damping ratio is 1% Zero initial conditions . Use orthonormal modes, eg. {nr[M]1.- . 1. (10 pts) For the system below, write the 4th modal equation f(t) Base Fixed x,o (t) Assume: に100000-, m=5kg, and,f(1)-1000 sin(50m)×1の Modal damping ratio is 1% Zero initial conditions . Use orthonormal modes, eg. {nr[M]1.- .
Implement the logic equation F(W, X, Y, Z) = Σ(0, 1, 5, 7, 11, 13, 15) using an 8:1 Multiplexer
#1. Design a hazard free circuit for the following specification. f(w,x, y,z) - Im(0,1,5,8,12) + D(7,13,15). Write down the final 2- level equation (you do not need to draw the circuit).
Problem 1 Consider the composition f(w(z)) of two complex valued functions of a complex variable, f(w) and w(z), where z = x+iy and w=u+iv. Assume that both functions have continuous partial derivatives. Show that the chain rule can be written in complex form as of _ of ou , of Oz . . of az " dw dz * dw dz and Z of ou , of ou dw dz* dw ƏZ Show as a consequence that if f(w) is...