to
T=20, S=60, H=6, L=3, F=3 Alls. 10). Given the shaded region to the right, determine the...
H=1.68 T=26 F=2 L=2 S=30 11) Determine the extrema of g(u,v) = Hu-(F+L)t/2 subject to the constraint x2+y2= S*H Ans.
Please use the given below values for (its important) H= 6 T= 22 F= K Please upload the correct and exact solution as well as please use good handwriting and also upload clear picture of solution. Its urgent. Thank you Evaluate S zyx ds where C is the vector r(t)=<sin(Ft), cos(-Ft), (T)t>; Asts Ha С
H=1.68 T=26 F=2 L=2 S=30 10) Given the shaded region to the right, determine the area using integration as follows: A. SSdxdy Ans. S B. SSdydx Ans. T/2 X C. Sſrdrde Ans. T/2 SVE
1270) Refer to the LT table. f(t)=7. Determine tNum,a,b and n. ans:4 1271) Refer to the LT table. f(t)=4t. Determine tNum,a,b and n. ans:4 1272) Refer to the LT table. f(t)=5t^2. Determine tNum,a,b and n. ans:4 1273) Refer to the LT table. f(t)=7exp(3t). Determine tNum,a,b and n. ans:4 1274) Refer to the LT table. f(t)=8(1-exp(3t)). Determine tNum,a,b and n. ans:4 Table of Laplace Transforms le transforms of some common functions are given in Table 36-1. Instead of ansforming a function...
H= 6 T=25 F= 2 L=2 S=45 8) Solve only 6 of the questions A-J. Mark the questions you want graded. Determine if each of the infinite series below is converging or diverging. If you do not identify the method you use you receive a maximum of 1 point. A. (-1)"sin (Ln) B. E cos(Fn) c. Stan (n/(T-H)) D. Esin(n+1)/n 1 1 E. H/(nº+(F+L)n+ F*L) G. [T/(T-L)) F. ΤΣ S n=F+L (n-F)(n+L) ni H. (/(T-e) )-H 1. (n+L)/(n2+(L+H)n+L*H) J. [(H/F)n+(L/H)-1...
Please help solve the following question with steps. Thank you! 3. Suppose that an object moves along the helix r(t) - (2 cos t, 2 sin t, L.) , 2π subject to the force field F-(-y, x, z). Determine the work 0-t done. 3. Suppose that an object moves along the helix r(t) - (2 cos t, 2 sin t, L.) , 2π subject to the force field F-(-y, x, z). Determine the work 0-t done.
1291) Determine the Inverse Laplace Transform of F(s)=(18s + 3)/(s^2+20s+164). The answer is f(t)=A*exp(-alpha*t)*cos(w*t) + B*exp(-alpha*t)*sin(w*t). Answers are: A,B,alpha,w where w is in rad/sec and alpha in sec^-1. ans:4
6. Mix and match. You may also answer "none of these" F(s) = L{ft) f(t)= {F($)} 4 – 36 – 4e 35+3 s-(S-1) та 3s +3 $2(52 -1) - 4+7t + 4e7 -6-3t + 6e -7s+3 s-(s -1) 7s+7 $2(2-1) d -7-7t + Tet | 3s +7 s(s+1) le - 3 – 3t + 3e' 3s +7 $2(5+1) 3 - 3t - 3 cos t + 3 sint 4 + 70-4e | 3s - 7 s-(s-1) | 3s +7 s-(s-1)...
Determine L^-1 {F}. I also attached the tables linked in the problem. Thank you! Determine & '{F}. 2 4s + 44s + 92 F(s) = (s – 1) (s? + (s? +65 + 13) Click here to view the table of Laplace transforms. Click here to view the table of properties of Laplace transforms. 2"{F}=0 i Table of Laplace Transforms f(t) F(s) = £{f}(s) 1 s>0 S 1 at e ,s>o S-a n! t", n= 1,2,... sh+1 ,s>o b sin...
1292) Determine the Inverse Laplace Transform of F(s)=(18s + 3)/(s^2+20s+164). The answer is f(t)=Q*exp(-alpha*t)*sin(w*t+phi). Answers are: A,alpha,w,phi where w is in rad/sec and phi is in rad ans:4 PLEASE SHOW ANSWER WITH = *