using final theorem: :
How did we get the above with the equation given below(please show all steps so I can get it right) :
Dear in both expression C(z)/R(z) is different and above C(z)/R(z) expression can't be equal to lower C(z)/R(z).both are different.
using final theorem: : How did we get the above with the equation given below(please show...
how do i get the measured acceleration?
1. Given that Theorem 2 above allows you to measure the final velocity y of the glider as it passes the midpoint of the photogate, and that the glider is released from rest, consider the other information available from above and use a kinematic equation to solve for the acceleration a of the glider (this will be the glider's measured acceleration). Show your work and give your final formula for a meas below:...
Hello, Please show a work through of how to get equation (2) by taking the limit where t approaches zero using equation (1). I'm not following that part of the question. Thank you. Recall the experiment we did in class where we had all of you initially stand on one side of the room (the right side) and I asked you to flip a quarter over some timescale T. If you got a head, then you stayed where you were...
Q4. 8pnts]If you haven't explored it yet, here is a magical property of the Stoke's theorem Suppose we have a vector field F(x,y, z) = -yi+ xj+ zk. Also, let C: x2y2 R2 for some R 0 be the curve in the xy-plane. Now, verify the Stoke's theorem when: (a) The surface S is given by the upper hemisphere 2y z2= R2,z0. R2 - y2, z 2 0. (b) The surface S is given by the paraboloid (c) The surface...
Show steps of derivation from equation (22-26) to (22-27)
please include explanations. Thank you.
where we have pulled the constants (including z) out of the integral. T this integral, wecast it in the form f X ndX by setting X = (z2 + r2). )o solve and dx (2r) dr. For the recast integral we have m+ 1 and so Eq. 22-24 becomes (22-25) 0 Taking the limits in Eq. 22-25 and rearranging, we find (22-26) 2e(charged disk) as the...
How can i get from the equation above, the equation
below? Show detailed procedure please
y = ln (r - Vrn by n (2 = I-V22 e-2=-22-1 (e- x)2 = r2 - 1 C24 - 2x + x = x2 - 1 24 - 2xe" + 1 = 0 en 2xe' = 1+ 2y 2x = e ey I= coshy length of the portion of the graph of g(y) on the Arc length = [ v1 + lof(x)}dy pln(V2-1) Arc length...
Can you please show how the “hint” matrix is achieved using
the two theorems below
Hint: Use Theorems 6.9 and 6.3. For any vectors z1 and z2, you can write I heorem The system Ax g is consistent if and only if the rank of A g is equal to the rank of A ear statistical models: The less than full rank model sification σ2 Conditional inverses Normal equations Estimability Interval esti olving the normal equations Proof. ) Since r(...
Please show the steps to get
to the right answers (listed above).
Boltzmann atmosphere Consider a very tall 103 m tube filled with N2 molecules, each of which has mass 4.65 x 1026 kg. Recall that the acceleration of gravity is 9.8 m/s2 We will be considering the ratio of pressure r between the top (103 m) and halfway up the tube (500 m); that is, pressure(hop) pressure(2middle) 1) If the temperature is 250 K, what is r? 0.876 0.936...
Please show steps with the graph. The magnetic field intensity is given in a certain region of space as H = [(x + 2y)/z2]ay + (2/z)az A/m. (a) Find ∇×H. (b) Find J. (c) Use J to find the total current passing through the surface z = 4, 1 ≤ x ≤ 2, 3 ≤ z ≤ 5, in the az direction. (d) Show that the same result is obtained using the other side of Stokes’ theorem.
Please show all the necessary steps to get the
answers
eo Figure 1.1 Show that the transfer function relating the input voltage e, and output voltage eo for the circuit shown in figure 1.1 is given by E(6) LCs +RCS +1 a. b. The values ofL, R and C are 2H, 122 and 0.1F respectively. Determine eo(t) when a 5V step input is applied. Using the initial and final value theorem, find the initial and final value of the output...
Implicit Function Theorem in Two Variables: Let g: R2 → R be a smooth function. Set {(z, y) E R2 | g(z, y) = 0} S Suppose g(a, b)-0 so that (a, b) E S and dg(a, b)メO. Then there exists an open neighborhood of (a, b) say V such that SnV is the image of a smooth parameterized curve. (1) Verify the implicit function theorem using the two examples above. 2) Since dg(a,b) 0, argue that it suffices to...