[V] (12pts) (1) How much is 0! ? O! = (by convention). (2) Give the infinite...
Hi, could you post solutions to the following questions. Thanks. 2. (a) Let V be a vector space on R. Give the definition of a subspace W of V 2% (b) For each of the following subsets of IR3 state whether they are subepaces of R3 or not by clearly explaining your answer. 2% 2% (c) Consider the map F : R2 → R3 defined by for any z = (zi,Z2) E R2. 3% 3% 3% 3% i. Show that...
3 At a given time, the normalised wave function for a particle in a one-dimensional infinite square well -a < x < a is given by 2 sin2 V inside the well and zero outside. Find the probability that a measurement of energy yields the eigenvalue En. (Hint: use data on page 6.) [6] Useful Data and Formulas = 1.60 x 10-19 C Elementary charge e h/2T=1.05 x 10-34 Js Planck's constant 3.00 x 108 m s-1 Speed of light...
QUESTION 1 The slope of the line V f(x). O How much y changes when x changes by a large amount How much y changes when x changes by a small amount 0 The level of y for a given amount of x O It depends on the shape of f(x). QUESTION 2 The relationship between y and x is linear if Changing X by 1 always changes V by the same amount. There is no relationship between V and...
1. Let T be the matrix T=10 3 acting on the complex vector space V C3 (a) Recall how T defines the structure of a C-module on C3. (b) Let p(x71, and let 2Compute the element p(x) v of C3 (c) Give a set of generators and relations for C3 over Cz] with the above module structure. (d) Write down the relations matrix (e) Recall the definition of minimal polynomial of a matrix. (f) What is the minimal polynomial of...
1. (20 pts) RVs X and Y have joint density function 22 f(x, y) =(0 if O <z<1 and 0<y<2 īf 0 < x < 1 and 0 < y < 2 otherwise (a) Find E(X), V(X), E(Y), and V(Y). (b) Find the covariance cov(X,Y) and the associated correlation ρ (c) Find the marginal densities fx and fy. (Be sure to say where they're nonzero.) (d) Find E(X | Y = 1.5). (e) Are X and Y independent? Give two...
Let Σ = {0, 1). (a) Give a recursive definition of Σ., the set of strings from the alphabet Σ. (b) Prove that for every n E N there are 2" strings of length n in '. (c) Give a recursive definition of I(s), the length of a string s E Σ For a bitstring s, let O(s) and I(s) be number of zeroes and ones, respectively, that occur in s. So for example if s = 01001, then 0(s)...
1) Show that if U is a non-empty open subset of the real numbers then m(U) > O. 2) Give an example of an unbounded open set with finite measure. Justify your answer, 3) If a is a single point on the number line show that m ( a ) = O. 4) Prove that if K is compact and U is open with K U then m(K) m(U). 5) show that the Cantor set C is compact and m(C)...
Please write the code in assembly language which can run in HLA. Thank you very much!! -So we need to write the code in assembly language in Notepad++, end with .hla and run it in CMD. - This project is about writing a program to read numbers, counts the items read, calculates the total, the maximum and minimum of the numbers. -The program stops when a 0 is entered. Zero will not be part of the data. -work with integers,...
I don't know how much help you can give me but if you can please help answer 5-8! TIA Shake the non-fixed end of the slinky to create a standing wave. If you do this on the floor, it would be best to have a hard surface, so the slinky is not sliding against carpet. Practice until you are able to produce standing waves with two nodes(at the two ends), three nodes (two at the ends and one in the middle), and...