f) 2 and 4 at turn will have TE3, 2,4 ARE TURNING POINTS. THESE POINTS ARE HAVING ZERO VELOCITY AND ARE AT EQUILIBLIUM POSITION.
Please answer both f and g. Where could you possibly find a particle with energy TE3?...
Please! Can anyone explain those answers to me? It would be better if you could demonstrate your process. Thanks! Review Constants Periodic Tab (Figure 1) is the potential energy diagram for a 30g particle that is released from rest at 10 m Part A Will the particle move to the right in the positive direction or to the left in the negative direction, and why? Figure 1 of 1 Energy (J) • The particle will move to the left. Moving...
1. If a particle moves according to a law of motion S(t)=12-6-7, t 20 Where t is measured in seconds and sin meters, (a) Find the velocity of the particle in terms of t. (b) Find the velocity and the speed at time t=1. (c) When is the particle at rest? (d) When is the particle moving to the right and when is it moving to the left? (e) Find the acceleration of the particle at t. (10pts) 2. Evaluate...
Both please In Questions 6-9, let g) which yon may assiue is irnohucible in Zal drl where a, b, Let F Zaa Glr). (The typiral elet of Fcan be written as a tbuturde za and 2-1 + (g(z)) İs a root of g(r).) tu+c+d (undder mulriplication (6) 8. Caleulate()in F, or explain why this inverse does not exist. (8) 9. Find the miniu polyamial, h) in arl, of the element v in F. Show your work and explsin how yuu...
could you please answer it please thanks Find the point of intersection of the graphs off and g by solving f(x) = g(x). f(x) = 3x + 1 and g(x) = 3 - X+3 O A. (1,9) O B. (3.1) O C. (9.1) OD. (1.3)
need help with this problem. please explain, thank you. 8. Consider a particle encountering a barrier with potential U = U, >0 between x = -a and x = a with incoming energy E > U. a) Write the symbolic wave functions before and after passing through the barrier (i.e., for xs-a and x>a; regions I and III). UN b) Write down the Schrodinger equation for the wave function in the middle (region II) where the potential is non-zero i.e.,...
Hi, can you solve the question for me step by step, I will rate up if the working is correct. I will post the answer together with the question. Answer: Question 5 A particle of mass m rests on a smooth horizontal track. It is connected by two springs to fixed points at A and B, which are a distance 2lo apart as shown in Figure Q5. The left-hand spring has natural length 2lo and stiffness k, whilst the right-hand...
Hi, I need the full worked solution (step-by-step with clear explanations where possible) for all parts of this question, please. The final answers to all the parts are given below the questions. Would greatly appreciate neat handwriting with clear steps. Thank you! :) Question 6 A particle of mass m is projected vertically upwards with an initial speed vo in a fluid. The magnitude of the resistive force is kv, where v is the speed of the particle and k...
please help #2(b)) What types of functions are f(x) = e" and g(x) = x". Compare the differentiation formulas for f and 9 # 3,4,6,11,14,19.21) Differentiate the function: # 3) f(x) = 186.5 # 4) f(1) = 30 # 6) (t) = {- 36 +t #11) G(x) = VI - 2* # 14) R(r) = YTO #19) y = +*+47 +3 # 21) v = # 25) Find the equation of the tangent line and normal line to the curve...
Please explain your answer. Solenoid2 Solenoid 1 Problem 2: 20 Points radiuses RI & R2. Both have the same loop density n, but different currents I and I2 traveling in the direction indicated in the diagram You may treat the Solenoids as infinite in length, and the wire as extremely thin. a) Use symmetry to identify the direction of the magnetic fleld and the measurements it's dependent upon b) Draw all amperian loops needed to find B for all regions...
please answer asap (it is all the professor asked) (5) Consider the gradient vector field F ▽f where f(x,y) = cos(2x-3y). Find curves G and C2 that are not closed such that JG F·dr = 0 and 1, F . dr-1. Explain why you pick the curve you do, and how you know the integrals have the correct values. (Hint: Try picking a straight line between the origin and some simple point (a, b) that you choose later.) (5) Consider...