Which of the following is a method of 'giving grade'?
shooting in grade
indicating cuts and fills
setting grade marks
all of the above
Giving grade is also known as Establishing grade, is set the grade marks at the top of the stake. It also push the wooden stake to drive in the ground to indicate the cut or fills have to take in the ground.
Shooting in grade, indicating cut and fills and setting grade marks all are the method of 'giving grade'.
Which of the following is a method of 'giving grade'? shooting in grade indicating cuts and...
Which of the following statements is TRUE for a 'cut' stake? grade rod value is less than target setting grad rod value is larger than rod setting grade rod value is equal to the rod setting all of the above
Consider the following boundary-value problem$$ y^{\prime \prime}-2 y^{\prime}+y=x^{2}-1, y(0)=2, \quad y(1)=4 $$Apply the linear shooting method and the Euler method with step size of \(\frac{1}{3}\) to marks) approximate the solution of the problem.
6. Which of the following physical activities would be most improved by practice? a) Shooting a layup b) Long distance running c) Lifting weights d) Doing jumping jacks 7. Which of the following would be considered an open skin a) An ice skater's predetermined long program b) A free throw c) Shooting at an archery target d) Throwing a pass in football 8. Which of the following is least likely to be considered an ability in the context of kinesiology?...
According to the new Tax Cuts and Jobs Act (TCJA) of 2017, which of the following statements are true? Multiple Choice Changes in tax law can lead to making different financial decisions The new law reduces the amount of debt interest that can be deducted Companies may wish to use more equity financing and less debt financing All of the above
Question 24 1 pts Using the shooting method for the following second-order differential equation governing the boundary value problem G.E: + EA (x) +u = L (x) € (0,L] B.C's: u () = 0 and EA (2) de Iz-L=F, the trapezoidal method is used to converts the problem into coupled integral equations solved at the quadrature points. None of the above. finite differences are used to convert the governing equation and boundary conditions of the problem into an analog set...
Given the following non-linear boundary value problem
Use the shooting method to approximate solution
Use finite difference to approximate solution
Plot the approximate solutions together with the exact solution
y(t) = 1/3t2 and discuss your results
with both methods
Question 25 1 pts Using the shooting method for the following second-order differential equation governing the boundary value problem G.E: + EA (c) a + 2 = L(x) * € (0,L] B.C's: u (0) = 0 and EA (x) din le=L= F. An appropriate algebraic equation to use in the finite difference of the boundary condition at = Lis There is no suitable finite difference equation that can be obtained. u(L) - u (L - Ax) F.A BAL) None of...
Question 19 Using the shooting method for the following second-order differential equation governing the boundary value problem G.E: + EA () 9 + - =D () 2 € (0,L] B.C's:u (0) = 0 and EA (2) --=F. An appropriate algebraic equation to use in the finite difference solution of the boundary value problem posed in question 24 is -Post A)u(L) - (L+Ax) EAL) F. 201 B) Su (L) - u(L - Ax) + 4u (L + A2) EAL C) (L)...
Part B. Please CHOOSE FOUR of the following FIVE questions, indicating clearly which you want to be graded. Do not answer all of them!! (15 points each.) B1. Please consider the restriction enzymes Apal and PspOMI (OMG, who THINKS of these names???). Anyway, these enzymes have the following recognition/cut sequences, with the * indicating the cut site: Apali 5'G GGCC*C 3 3'C *C C G G G 51 PspOMI: 5' G *GG CCC 31 3' C C C G G#...
Choose two of the following synthesis problems to complete. Propose a synthetic route by clearly indicating the reagents needed and the intermediate products formed. If you do not indicate which problem to grade, the first two will be graded by default. No mechanism is needed. Please grade this problem (A). Br