47. Edema would be likely to form when the heart is not pumping the blood forward. Edema is a type of swelling which occurs by trapping too much fluid in the tissues of the body.
If one or both lower chambers (ventricles) of the heart can not pump the blood properly. The blood can accumulate in the limbs, abdomen or lungs. Fluid from this accumulated blood can leak from the capillaries and stagnant in the tissues. This higher amount of fluid can't be bounced back easily so swelling occurs. This swelling is known as edema.
Would be likelu ta fiom wheas A teamcentratios ar.pnteas ?n blond incmuser ia not pumping
A town wants to replace its water pumping system they have to options gravity plan and pumping plan. Both options have a 40-year life, at a 10% interest rate no salvage value. OS Gravity Pumping DO $1,400,000 MAAR Initial Investment $2,800,000 Investment @ none year 10 TO o SO 1 TA $200,000 O ) Ne Operation and 10.000$/yr Maintenance AT Power Cost None 50,000$/yr > Average first 10 years (A value) Average next 30 N years (A Value) OOT OO...
1. Let L = {ambm cn | m <n}. Use the pumping lemma to show that L is not a CFL.
i cannot understand (E2.2.2) (3/12)^2... Example 2.2 Pumping n Pentane 65 Example 2.2-Pumping nPentane Vent Storage tank 40 ft Flow Vent Supply tank 4.5 ft Punp n? Fig. E2.2 Pumping n-pentane. Fig. E2.2 shows an arrangement for pumping n-pentane ( 39.3 lbin/fts) at 25 C from one tank to another, through a vertical distance of 40 ft. All piping is 3-in. I.D. Assume that the overall frictional losses in the pipes are given (by methods to be described in Chapter...
1) Show that for every 1 Sisn, P(AA)>o 2) Show that PA, n nA")-P(AJPA,İA, )PA,İA, n As) P(A"IA, n nA"-.). Remark. This identity is called the compound probability theorem and is for instance useful in situations where the pašt has an influence on the future (and is in some sense the probabilistic version of the "multiplicative rule") 3) (Application) Consider an urn with 6 identical blue balls and 4 identical red balls. Take one after the other 3 balls at...
Show that the set {o”," n=0, 1, 2, ...} is not regular using the pumping lemma.
What would be the major product of this reaction? HCI + (a) (b) ta (c) ta at , X CI (e) none of the above (d)
Use the pumping lemma to show that the following language is non-regular: [a"b2n,n> 1) 1) usually we need to find a word in the language as an example, what length of the word we should use as the example? what are the three possible ways to choose substring y in the pumping lemma? if a language satisfy the pumping lemma, is this language a regular language? Why?
18. Use induction to prove the following: For any set A, if IA] = n for some finite number n E N, then IP(A) 2"
Prove the following languages are not context-free by using the pumping lemma. {b(n) #6(n + 1) | n є N, n-1} where b(n) is binary representation of n with no leading 0 {b(n) #6(n + 1) | n є N, n-1} where b(n) is binary representation of n with no leading 0
1) Let A and B be two programs that perform the same task. Let tA (n) and tB (n), respectively, denote their run times. For each of the following pairs, find the range of n values for which program A is faster than program B. Show the values for each and how you obtained them (justify). a) tA (n) =1000n , tB (n) =10n^2 b) tA (n) = 2n^2 , tB (n) = n ^3 c) tA (n) = 2^n...