18:43 7 LTE Show that the subset Wof P3 defined by: 7. W-p) e P'lp-2) -p (3) and p(3) -2p1) 18:43 7 LTE Sh...
6) If E is any countable subset of real numbers prove that A*(E) = A*(E) = 0. 7) Show that the set of all real numbers IR is measurable with >(IR) = . 8) Prove that If f : [a, b] IR is continuous [a; b]then it is measurable [a, b]. 9) Give an example of a function f : [O, 1] IR which is measurable on [O, 1] but not continuos on [O, 1]. 10) Find the Lebesgue integral...
43. Statistically, a population is defined as aQID 422 1) Subset of size n from all possible objects of interest 2) Subset of a random sample. 3) Set or collection of all possible objects of interest 4) Random selection of objects from all possible objects of interest 44. The purpose of multi-voting is to QID 595 1) Generate a list of potential failure modes. 2) Identify the greatest number of defects. 3) Come to a concensus on the relative importance...
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)...
Problem #7; Consider the functions f(t = e' and g(f) = e 3 defined on 0 t < co. (a) (f*g)(t) can be calculated as h(w, tdw Enter the function h(w, t into the answer box below Hs)}. Enter the function H(s) into the answer box below (b) (f* g)(t) can also be calculated as L (c) Evaluate (f* g)(t) Enter your answer as a symbolic function of w,t, as in these examples Problem #7(a): Enter your answer as a...
Proble m 3. Let T: V ->W be (1) Prove that if T is then T(),... ,T(Fm)} is a linearly indepen dent subset of W (2) Prove that if the image of any linearly in depen dent subset of V is linearly indepen dent then T is injective (3) Suppose that {,... ,b,b^1,...,5} is Prove that T(b1), .. . , T(b,)} is a basis of im(T) (4) Let v1,. Vk} be T(v1),..,T(vk) span W lin ear transform ation between vector...
Let H={p() : p()= a + b + cf*: a,b,cer} (a)(3 marks) Show that H is a subspace of P3. (b) Let P1, P2, P3 be polynomials in H, such that Py(t) = 2, P2(t) = 1 +38P3(0)= -1-t-Use coordinate vectors in each of the following and justify your answer each part (1) (5 marks) Verify that {P1, P2, P3} form a linearly independent set in P3- (11) (2 marks) Verify that {P1, P2, P3} does not span P3. (111)...
3. Let W = P({1,2,3,4,5}). Consider the following statement and attempted proof: VAE W WB EW (((AUB) C A) + (ACB)) (1) Towards a universal generalization argument, choose arbitrary A € W, BEW. (2) We need to show ((AUB) C A) + (ACB). (3) Towards a proof by contraposition, assume B CA, and we need to show A C (AUB). (4) By definition of subset inclusion, this means we need to show Vc (E A →r (AUB)). (5) Towards a...
08. (3+2+1+1=7 marks) Let (E, d) be a metric space and let A be a non-empty subset of E. Recall the distance from a point x e E to A is defined by dx, A) = inf da, a).. a. Show that da, A) - dy, A) <d(x,y)Vxy e E. Let U and V be two disjoint and closed subsets of E, and define f: E- dz,U) R by f(x) = 0(2,U) + d(«,V) b. Show that f is continuous...
Q1. Consider these four points: P [,,5| , P2 = 2], P3 = [H]. Plot these three points. (a) Find the Manhattan distance between Pi and P2 (b) Find the Manhattan distance between P1 and P3. (e) Find the Manhattan distance between P2 and P3. Q2. Consider the same points in Q1 and find the Euclidean distances between the points specified in parts (a), (b), and (e). In other words, you will be doing the above question again but now...
Let the Sample Space S be defined as equally likely integer values from 2 to 18 (2, 3, 4, 5, 6, 7, 8, 9, 10, 11, 12, 13, 14, 15, 16, 17, 18). Also, let event A be defined as (2, 3, 4, 5, 6, 7) and event B as (6, 7, 9, 10). a) What is the conditional probability P(B|A)? b) What is the probability P(A ∪ B)?