Refer to equation 11H + 11H ---> ZAX + 0+1e + v
1) What is the value of Z?
2) What is the value of A?
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Refer to equation 1910Ne ---> 199F+ZAX+v. a) What is the value of Z? b) What is the value of A?
Refer to equation 63Li+11p ---> 42He+ZAX a) What is the value of Z? b) What is the value of A?
147N+42He=178O+?? a. 10n b. 11H c. 42He d. 0-1e
please assist with 1-2-3 QUESTION 1 Refer to equation number 1. What is the value of Z? OA. OB.4 OC.1 OD.2 QUESTION 2 Refer to equation number 1. What is the value of A A. +1 OB.-1 oC.O OD.2 QUESTION 3 Refer to equation number 2. What is the value of Z? OAO B., C. 2 D. 4 QUESTION 13 Refer to equation number 7. What is the value of Z? A.4 OB.2 0.2 OD.O QUESTION 14 Refer to equation...
QUESTION 18 Refer to equation number 9. What is the value of A? A.2 OB.+1 OC.-1 OD. QUESTION 19 Refer to equation number 10. What is the value of Z? A.1 B.2 0.4 D.O QUESTION 20 1 pc Refer to equation number 10. What is the value of A? A.1 B.4 C.D.2 E 4 MC Questions 1 - 10 1. 18Ne → 1%F + 2x + v 2. Ca -- Sc + 4x +v 3. Cu - Cu + 2x...
What is missing in the nuclear equation below? 147N + ____ ---> 146C + 11H a. alpha b. beta c.neutron d. positron e. gamma
E 4 MC Questions 1 - 10 1. 18Ne 19F + 2x +v 2. Ca - Sc + 3x + v 3. Cu -> Cu + 2x 4. Cr -- → + 4x 5. 234 Pu -- 239U + Ax 6. Li + ip -→ He + x 7. 233Np 234Pu + 2x + v 8. 15N + --> H+ x 9. H + H --XX + tie + v 10. He + He -x + 1H + H QUESTION...
Consider the circuit shown below. Assume v(0)-0 and i(0)0 ) What is the characteristic equation for this circuit in terms of Ri, R2 L, and C? Characteristic Equation: b) Is the circuit overdamped or underdamped? (Explain why.) Overdamped Underdamped Why: c) What are the roots of the characteristic equation? (Provide numbers) S1= S2 d) What is the value of at t: ? ic (0')-
Verify that y)1e 14a is a solution of the ordinary differential equation y 14y 1. Note you do not need to solve the ordinary differential equation
2. In the lecture the general solution to the Legendre equation (1-z?)y', _ 2 ry, + n(n + 1)У-0.TIER. х є R series u(x) and ():(r) don(r) + of convergence of y1 (a), y2(z) considering: (i) the paraneter n is nonnegative înteger, n є N; (ii) the parameter n is not an integer, n ¢ Z. [Do not derive these series, refer to the relevant results obtained in lecture] 2. In the lecture the general solution to the Legendre equation...