VERY URGENT PLEASE = Let A = 0 = [ ] and B 1 C = A O B, then the entry C12 = = 6 0 11.16
5. urgent 5 Heaps- 10 points Run heap sort on the following array: (6,4,8,2,5,3,7, 1, 10)
urgent 5) For a particular chemical reaction it is found that the value for the equilibrium constant for the reaction decreases as temperature increases. Based on this we can conclude a) AS rx < 0 b) ASX>0 c) AHºrxn < 0 d) AHºx>0 e) AGºrxn <0
Urgent help needed related these simple calculus questions ! Thanx 5. Sketch the polar curves [3] (a) 2-2 cos θ [3] (b) 2-cos 20. 66. Find the equation of the tangent line to the given polar curve r- 3-cos θ at the point- 101 7. Use the Riemann sum compute the area under the curve of 23 from r:--1 to x-0. 5. Sketch the polar curves [3] (a) 2-2 cos θ [3] (b) 2-cos 20. 66. Find the equation of...
Evaluate the determinant. -1 -5 0 5 -1 0 0 -3 - 7 -6 1 3 4 0 0 2 The value of the determinant is T.
will deadlock occurs or not why? explain urgent Semephore $1=1, s2-1; int a 0, 60; P20 { if(a > 0) { senwait(s2); senwait(s); } P1() { senwait(s); aH+; senwait(s2); bH+; sendignal (s2); senSignal(s1); else{ senwait(s1); senwait(s2); } b-- } --; senSignal(s); senSignal(s2);
6 - 1 - 3 -2 A= 1 4 3 5 5 0 0 01 -5 0 0 00 0 0 0 0 0 0 0 0 0 0 The dimension of Nul Ais, and the dimension of Col A is
urgent 3) For a chemical reaction to be spontaneous for standard conditions, which of the following must be true? a) AS r> 0 b) AS m 0 c) AGºrx < 0 d) Both a and e) Both b and c
These are linear algebra problems. Let 5 1 7 0 0 -3 3 A= 5 1 0 13 5 1 2 Find M23 and C23, M23 C23= Answer *1: exact number, no tolerance Answer *2: exact number, no tolerance Evaluate the determinant of the given matrix by reducing the matrix to row-echelon form. 2 -2 -6 6 -7 0 -2 -4 4 1 0 A = 4 0 0 2 0 0 0 3 .5 det(A)
4. Consider the following transition matrix: 1 2 3 4 5 6 1 0 0 1 0 0 0 2 1 0 0 0 0 0 3 0 .5 00.5 0 5 0 0 0 0 0 1 6 0 0 0 1 0 0 (a) (10 points) Find the stationary distribution. (b) (10 points) Does the chain converge to it? 4. Consider the following transition matrix: 1 2 3 4 5 6 1 0 0 1 0 0 0...