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...
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
Financial Derivatives (4) T=1/4 year, three call options - cl,c2 and 3. K1 = $20. K2 - $30, K3 = 50, c1 - $15, and c2 S5, c3 = $1. (10 points) a. An investor buys one cl and c3, and short 2 c2. please draw a diagram illustrating how the investor's profitloss varies with the nice of the underlying asset on the day of maturity. points) b. Under what circumstances you expect to use this trading strategy? (2 points)
The DFT sequence of x[n] of length x[n] is given as follows: X[0] = 2 X[1] = 2 + jα X[2] = 5-j4 X[3] = β+j3 X[k1] = 2 X[k3] = 2-j3 X[k2] = 5+j4 X[7] = γ+j3 Find α, β, γ, k1, k2 & k3
Example What is the output voltage? 9 k0 1 k12 to 3 kn
A2. Chemical Kinetics (20 marks) MBr2 Br Br M k1 |(1) k2. Br H2 HBr H k2,r (2) k3,f HBr2 HBr Br (3) + Experimentally measured rate expression for [HBr] given as below: d [HBr] A1exp[H2] [Br2]1/2 HBr 1+ A2exp TBr2 dt Consider the above elementary reactions mechanism proposed by Bodenstein to explain their experimental findings of the reaction rate of HBr. Reactions 1 and 2 are bi-directional (forward and reverse) while reaction 3 is uni-directional (forward only) as written....
Thank You & Thumps Up. K1,K2,B,M is not given. Can you solve without plugging in these values. I mean just the general form of the equation that works with any of those values. The system show in Figure 1 a) was used in problem 3 on the exam A very similar system is shown in Figure 1 b). K1 K2 Xm Xin a) K1 K2 Xm Xin Kir b) Figure l Two Similar systems In this Boms Offer, you are...
Newton's Third Law (two springs) Two springs with spring constants k1 = 24.6 N/m and k2 = 15.6 N/m are connected as shown in the Figure. Find the displacement y of the connection point from its initial equilibrium position when the two springs are stretched a distance d = 1.3 m as a result of the application of force F 0 0.824 m Use Newton's first law and apply it to the connection point! Submit Answer Incorrect. Tries 1/6 Previous...
Runge-Kutta method R-K method is given by the following algorithm. Yo = y(xo) = given. k1-f(xy) k4-f(xi +h,yi + k3) 6 For i = 0, 1, 2, , n, where h = (b-a)/n. Consider the same IVP given in problem 2 and answer the following a) Write a MATLAB script file to find y(2) using h = 0.1 and call the file odeRK 19.m b) Generate the following table now using both ode Euler and odeRK19 only for h -0.01....