Find Error
1. (x)(Ey)(Ez) (Haxy --> Izy) .......p
2. (Ex) Kxxx ........p
3. (Ex) Kxxx ..........EI, 2
4. (Ey) (Ez) (Haay --> Izy) ........UI, 1
5. (Ez) (Haaz --> Izy) .........EI, 4
6. Haay --> Iyy ..........EI, 5
7. (x) (Haax --> Ixx) .........UG, 6
8. Haau --> Iuu ........UI, 7
9. (u) (Haau --> Iuu) .......UG, 8
10. Haaa --> Iaa .......UI, 9
Find Error 1. (x)(Ey)(Ez) (Haxy --> Izy) .......p 2. (Ex) Kxxx ........p 3. (Ex) Kxxx ..........EI, 2 4. (Ey) (Ez) (Haay --> Izy) ........UI, 1 5. (Ez) (Haaz --> Izy) .........EI, 4 6. Haay -...
find errors.
2. Bx) Kxxx T3. (Ex) Kxxx EI, 2 UI, 1 EI, 4 EI, 5 UG, 6 UI, 7 UG, 8 UI, 9 4. (39(3)(Haay כ13 ) 6. Haay כ İyy 7. (x)(Haax 1xx) 8. Haau= luu 9. (u)(Haau luu) 10. Haaa 1aa
2. Bx) Kxxx T3. (Ex) Kxxx EI, 2 UI, 1 EI, 4 EI, 5 UG, 6 UI, 7 UG, 8 UI, 9 4. (39(3)(Haay כ13 ) 6. Haay כ İyy 7. (x)(Haax 1xx) 8. Haau= luu...
Find the error.
1. (x)(390z)(Haxy v Bzzyxb) 2、(390z)(Haay v Bzzybb) U, 1 EI, 2 UI, 3 Imp, 4 EG, 5 (z)(Haax v Bzzxbb) 4. Haax v Byyxbb 6. (3x)(-Haax כ Byyxbb) 8, (3x)(3y)(3x)(-Hzzx Byyxbb) EG, 7
1. (x)(390z)(Haxy v Bzzyxb) 2、(390z)(Haay v Bzzybb) U, 1 EI, 2 UI, 3 Imp, 4 EG, 5 (z)(Haax v Bzzxbb) 4. Haax v Byyxbb 6. (3x)(-Haax כ Byyxbb) 8, (3x)(3y)(3x)(-Hzzx Byyxbb) EG, 7
Which lines in the following are not valid? #1 please
Put an 'x' at the end of the proof line which has the error and
write the number of the error made listed on the Restrictions on
Quantifier Inference Rules
Which lines in the following are not valid? Explain why in each case (1) 1. (9[(Нх Кх) — Мх] 2. (ЭхХ Нх- Кх) 3. Нх- Кх 2 EI 4. Mx 1,3 MP 5. (Эх)Мх 4 EG 1. (х(Мx D Gx)...
Assume X, Y are independent with EX = 1 EY = 2 Var(X) = 22 Var(Y) = 32 Let U = 2X + Y and V = 2X – Y. (a) Find E(U) and E(V). (b) Find Var(U) and Var(V). (c) Find Cov(U,V).
X P(X) X*P(X) (X-m)2*P(X) 2 1/36 =0.028 3 2/36 =0.056 4 3/36 =0.083 5 4/36=0.111 6 5/36=0.139 7 6/36=0.167 8 5/36=0.139 9 4/36=0.111 10 3/36=0.083 11 2/36=0.056 12 1/36=0.028 Totals complete the table and find the mean and standard deviation.
X P(X) X*P(X) (X-m)2*P(X) 2 1/36 =0.028 3 2/36 =0.056 4 3/36 =0.083 5 4/36=0.111 6 5/36=0.139 7 6/36=0.167 8 5/36=0.139 9 4/36=0.111 10 3/36=0.083 11 2/36=0.056 12 1/36=0.028 Totals complete the table and find the mean and standard deviation.
0 2 4. [6 pts) (a) (4pts) Find a basis for the span of vectors ui -2 | u,-|-1 | , and u3 | 5 ,u2 = 0 (b) (2 pts) Find the rank and nullity for the matrix A-u u us].
Let U = (1, 2, 3, 4, 5, 6, 7, 8, 9, 10), A = (1, 3, 5, 7, 9), 8 (2, 4, 6, 8, 10), and C (1, 2, 3, 4, 5, 10). List the elements of each set. (Enter your answers using roster notation. Enter EMPTY or for the empty set.) (a) 4 {2, 4, 6, 8, 10) (Đ) 1 0 0 {2,4, 10) X (1) cuc {}
find and draw
437EE-3 Deadline: 16/6/2019 11:59PM HW 1 -4 sns4 is given; A signal x[n] 2 5 cos(n)5 sin(0.57n) Find and draw 1x[n 2. x[nJu[n 2] 3. x[n]. 8[n 21 4. -x[n2] 5. x[n(u[n-]-u[n-3]) 6. x[n+2] n+1 7. y[n] = 2k=n-1X[K] 8. x[n]8[-n-4 9 -x-n 2 10. x2n/2]
437EE-3 Deadline: 16/6/2019 11:59PM HW 1 -4 sns4 is given; A signal x[n] 2 5 cos(n)5 sin(0.57n) Find and draw 1x[n 2. x[nJu[n 2] 3. x[n]. 8[n 21 4. -x[n2] 5....
9, X = 3, 4, 5, and 7; compute Σ, (ΣΧ), and ΣΧ2 10. X EX --3, 0, 1, and 2; compute Σ(X-1), and D3-3 11. X-3,4,5, and 7; Y-1,0,1, and 2 compute ΣΧΥ and (DIP X-3, 4, 5, and 7; Ys-1,0,1, and 2; compute ΣΧ'ya and Σ(X-2)(Y-3) 's 4, 5, 6, and 9; Y -1,-1, 1, and 2; compute ΣΥ2 and Σ(X-5)(Y+ 1) 12. 13.