11. Using generating functions, find the number of solutions of the equation 6, u1 +u2+... +u -22...
11. Using generating functions, find the number of solutions of the equation 6, u1 +u2+... +u -19, where 1 < 7,i,...,4, 2 Suj ui 9. (For () type C(6,4).) 11. Using generating functions, find the number of solutions of the equation 6, u1 +u2+... +u -19, where 1
Using generating functions, find the number of solutions of the equation u1+u2+u3+u4+u5+u6=24 where 2 _< ui _<7, i=1,....,6
Using generating functions, find the number of solutions of the equation u1+u2+u3+u4+u5+u6=24 where 2 _< ui _<7, i=1,....,6
Using generating functions, find the number of solutions of the equation (For ф type C(6,4), and for 5l type fact (5).) Using generating functions, find the number of solutions of the equation 7. (For φ type C(6,4).) Using generating functions, find the number of solutions of the equation (For φ type C(6,4).) Using generating functions, find the number of solutions of the equation (For ф type C(6,4), and for 5l type fact (5).) Using generating functions, find the number of...
using the principle of inclusion-exclusion, find the number of solutions of the equation u1+u2+...+u6 = 15, where ui<6,i=1,..,6.
12. Using generating functions, find the number of solutions of the equation 41 type C(6,4).) (For ( 12. Using generating functions, find the number of solutions of the equation 41 type C(6,4).) (For (
10. Using generating functions, find the number of solutions of the equation 7. (For φ type C(6,4), and for 5! type fact (5).) 10. Using generating functions, find the number of solutions of the equation 7. (For φ type C(6,4), and for 5! type fact (5).)
4. (a) L ,DER et a i. Let U1 be the set of solutions for the equation For which values of a and b is U1 a subspace of R4? ii. Let U2 be the set of solutions for the equation For which values of a and b is U2 a subspace of R4? iii. Let U3 be the set of solutions for the equation For which values of a and b is Us a subspace of R4? Justify your...
Consider the bases B = {U1, U2} and B' = {u', u'z} for R2, where 6 1 u = u2 = U2 = -1 -1 2. 5 Compute the coordinate vector [w]B, where W = [3 7 3 and use Formula (12) [v]s' = P. PB-8 [V]B ) to compute [w]g' [w]B = ? Edit [w] II ? Edit
solve part b and c 4. (a) Show the following result when Ui, U2, Us and U^ are jointly Gaussian random variables (zero mean) [15 points] where U,U E[U,U (b) Using the above result, show that if U1, U2 are complex circular Gaussian random variables [15 points]: 1201U2 (c) Using the above result, show the following result for Intensity Correlation Interfer- ometery [15 points] where J12 is the mutual intensity between the radiation at points 1 and 2, say U1...