k0 = 3, k1 = 3^3 , k2 = 3^3^3 , k3 = 3^3^3^3 , . . . where k0 = 3 and kn+1 = 3^kn for n ≥ 0. What are the last two digits in k3 = 3^3^3^3 ? Can you say what the last three digits are? Show that the last 10 digits of ky are the same for all y ≥ 10.
k0 = 3, k1 = 3^3 , k2 = 3^3^3 , k3 = 3^3^3^3 , . . . where k0 = 3 and kn+1 = 3^kn for n ≥ 0. What are the last two digits in k3 = 3^3^3^3 ? Can you say what the last three digits are? Show that the last 10 digits of ky are the same for all y ≥ 10.
Let K1 ⊃ K2 ⊃ K3 ⊃ ... be a sequence of bounded closed sets. Let (an) be a sequence of numbers with the property an ∈ Kn \ Kn+1. Show that (an) has a subsequence that converges to a point a ∈ ??∩Kn. Carefully state which theorems you are using.
solve for k1, k2, and k3 using partial fractions. - (5+1) (5² +5+1) Kia K2 (3+1) Sto.5+jo.866 K3 3+0.5-j0.866
an automobile is modeled as shown. derive the required matrices mass 3 k4 k2 X2. m2 m1 k3 k1 an automobile is modeled as shown. derive the mass matrix and matrix of stiffness mass 3 k4 k2 X2. m2 m1 k3 k1 an automobile is modeled as shown. derive the mass matrix and matrix of stiffness
Problem 7. Use the following 3 call options: K1 -50, K2 - 59, K3 - 65, to construct an (asymmetrical) butterfly. Draw the payoff diagram (so you won't need to know the premia).
Answer all they way to stock price of $101 Butterfly Spread Put: Long K1 & K3 PE and Short Two K2 PE K1 = $55 K2 = $60 K3 = $65 C1 = $5 C2 = $6 C3 = $10 Stock Price Long K1 Put Long K3 Put Short K2 Put Profits $20 $24 $28 $32 $36 $40 $44 $48 $52 $55 $58 $60 $63 $65 $69 $73 $77 $81 $85
just 1 & 4 is needed K1 K1 K2 K2 Mass Mass Drawing B Drawing A Problem 1: (Drawing A) Find KEQ when K1 10 N/m and K2= 12 N/m. Problem 2: (Drawing B) Find KEa when K1 10 N/m and K2= 12 N/m. Problem 3: (Drawing A) 13 N/m and K2= 17 N/m. Find KEQ when K1 Problem 4: (Drawing B) Find KEq when K1 13 N/m and K2= 17 N/m.
QUESTION 6 Let fvı and fv(3) in K1 and K3 locations respectively in the figure. No K1 and K3. Assuming that the force f(t) is from M2 to the left, find the transfer function as X1 (s)/F (S). X2(1) fra K3.1 K 0000 M M 0000 K2 0000 fvi fuz
(Graph Theory) A road network will be built that connects seven cities, K1, K2, K3, K4, K5, K6 and K7. The cost of building a direct road connecting the city of Ki, and the city of Kj, is the number in the table located in the i-th row and j-th column. Make a road network so that people in one city can travel to another city through the road network that will be built and the minimum construction cost. w...
Mechanical vibration subject 3. a. Consider the system of Figure 3. If C1 = C2 = C3 = 0, develops the equation of motion and predict the mass and stiffness matrices. Note that setting k3 = 0 in your solution should result in the stiffness matrix given by [ky + kz -k2 kz b. constructs the characteristics equation from Question 3(a) for the case m1 = 9 kg, m2 = 1 kg, k1 = 24 N/m, k2 = 3 N/m,...