.This carbocation can undergo 7 unique [1,2R] rearrangements. Draw each possible product. Be systematic! CH bo
4. Show that in general, the loan balance after the nth payment is Bn = 1.005"Bo – 500(1 + 1.005 + 1.0052 + +1.005n-1), where n = 0, 1, 2, .... 5. We now have an explicit formula for the loan balance after any number of months. Evaluate the geometric sum in Step 4 and show that 1 + 1.005 + 1.0052 + ... + 1.005n-1 = 200(1.005" – 1). Substituting this expression for the geometric sum and letting Bo...
1. Show that the following initial value problem has a unique solution and find the solution. -?v+te", ist32, y(1) = 0 (14 pts)
4. Show that in general, the loan balance after the nth payment is Bn= 1.005”Bo – 500(1 + 1.005 + 1.0052 + +1.005n-1), where n = 0, 1, 2, ....
In the following questions, let Bt denote a Brownian motion with Bo = 0. (a) Show that if random variables X and Y are independent then they are 1. uncorrelated, Cov(X, Y) -0. (b) Let X have distribution P(X-1)- P(X 0) P(X- -1)-1/3, and Y-İX . Show that X and Y are uncorrelated, but not independent. (c) Let (X, Y) be a Gaussian vector. Show that if X and Y are uncorrelated then they are independent.
a sum of (show calculations) bo with a compound interest rate of 11%? How long will it take for money from are anyone to double? at with a simple interest rate of 110%? (show calculations) Press
Show that Conclude that decimal expansions are not unique. 4999999... - .5
PART 2: BLUE BOOK I TO VI ANSWER THESE IN THE BLUE BOOK SHOW ALL WORK for full credit IF NECESSARY (10 pts): Show the program trace IN A TABLE OF VALUES AND OUTPUT of the following using the input stream 5 2-1 10 int A, B, N; A 3; B-6; cout<<"Enter a sequence of values" do cin >> N A=A+N+B; J while (N< 10) B *= 2; cout << "(NAB) = " << "(" << N << ", "...
PLZ HELP! 2. In the simple regression model, show that Bo is consistent under the as- sumption SLR 4. 2. In the simple regression model, show that Bo is consistent under the as- sumption SLR 4.
(2) Prove that if j-0 i-0 with k, 1 e N u {0), and bo, . . . , be , do, . . . , dl e { 0, . . . , 9), such that be, de # 0, then k = 1 and bi- di fori 0,.. , k. (I recommend using strong induction and uniqueness of the expression n=10 . a + r with a e Z and re(0, 1, ,9).) (3) Prove that for all...