Answer:-
In graph (d), in the lower right-hand region (point C), the combined dynamics move away from the equillibrium point and toward carrying capacity of species 1.
This is because in the grapg (d) we can see that point C is moving away from the equillibrium point E towards the species 1 line (green line).
The figure below shows the Lotka-Volterra model of competition between two species. What is happening at point B? K,/α dN/dt = 0 B) dN/dt < 0 dN/dt> 0 A 0 K species 1 species 2 (a) N K2 dNz/dt = 0 N2 dNldt < 0 D dN /dt> 0 0 KIB (b) N Species 2 growth rate is negative O Species 2 growth rate is positive O Species 1 growth rate is positive O Species 1 growth rate is negative
Relation Exercise 4. Determine i the folloung are order relations on X = N, and or those that are, designate u hich is a total ordering or a partial ordering. (a) mk ENo, k 0 with n-m +k (b) m-n- k E No, k > 0 with n-m+2k. (c) mnkeN, k20 with mk m-21, n22, k1, k2 E No, t1, l2 EN are odd;1 If11-1, 12-1, and k1 < k2 OR This is called the Sharkovskii ordering, and will feature...
Which of the following could be false? A. n2/(log(n)) = O(n2). B. (log n)1000 = O(n1//1000). C. 1/n = O(1/(log(n))). D. 2(log(n))^2 = O(n2). E. None of the above.
I. (a) Compute g(x) = £ (n2 +n)x”. (b) Compute E (n?+n)/2". Justify your method. n=0 n=0
(a) Prove explicitly that the sequence (n2 -ncos(n))0 is eventually monotone by finding a number N E N such that the subsequence (n2-n cos(n))n-N İs monotone. (b) Does the monotone convergence theorem allow us to conclude that this sequence converges? Explain. (a) Prove explicitly that the sequence (n2 -ncos(n))0 is eventually monotone by finding a number N E N such that the subsequence (n2-n cos(n))n-N İs monotone. (b) Does the monotone convergence theorem allow us to conclude that this sequence...
Please help me with question 13(c,f,h,i,k,m) 13. Show that the following equalities are correct: (a) 5n2 - 6n(n2) (b) n! - O(n) (c) 2n22"+ n logn-e(n22) (d) I012(n3) (h) 6n3/(log n+1)O(n3) (i) n1.001 + n logn (n1.001) (j) nkte + nk logn 6(nkte) for all fixed k and e, k 0 and e> 0 (1) 33n3 + 4n2 2(n2) (m) 33n3 + 4n23)
1. The units of 1/4??0 are: a) m2/C2 b) N2 * m2/C2 c) N * m2/C2 d) N * m/C e) N2C2
mi k2 b yi m2 Figure 5-45 Mechanical system. Assuming that mi 10 kg, m2 5 kg, b 10 N-s/m, k 40 N/m, and k 20 N/m and that input force u is a constant force of 5 N, obtain the response of the sys- tem. Plot the response curves n(t) versus r and y2(t) versus t with MATLAB Problem B-5-23 Consider the system shown in Figure 5-45. The system is at rest for t < 0. The dis placements...
Consider production function f(l, k) = l2 + k2 (a) Evaluate the returns to scale. (b) Calculate the marginal product of labor and the marginal product of capital. (c) Calculate the MRTS. (d) Does the production function exhibit diminishing MRTS? (e) Plot the isoquant for production level q = 1. Hint: Notice that the input mixes (1; 0) and (0; 1) are on this isoquant.
Sprint 11:27 AM 0 82% Schmelz-2018-example-pratic 30) What is this molecule? A) a TAG B) a phospholipid C) advanced glycation end product D) a mixed anhydride E) phosphocreatine H, 31) What is this molecule? A) one of the molecules known as a ketone body B) a molecule made in the Krebs cycle C) a molecule made in the urea cycle D) an intermediate in isoprenoid biosynthesis E) none of the above O-P-O-P-O