Problem 1: The sum of the Residues of the complex function
F (z) = (z + 1)/((z - 4)(z - 2)) is -
Problem 2: If
U = log(x3 + y3 + z3 - 3xyz),
then
∂u/∂x + ∂u/∂y + ∂u/∂z = ?
Problem 3: The solution of the linear differential equation
(x + 10y3) dy/dx = y
is -
Problem 4: The rank of the matrix
1 1 1
1 2 3
1 4 7
is -
Problem 5: The value of 
C F→ dr→ when F→ = 2xyzi^ + x2zj^ + x2yk^ and C is a straight line joining (0, 0, 0) and (1, 1, 1) .
Problem 6: The arc of the segment cut off from the parabola x2 - 8y.by the line x - 2y + 8 = 0 is ____unit.
Problem 7: x4 - 4x3 - 9 = 0.
Solve by Newton-Raphson method then (k + 1) step is
Problem 8: The value of 0∫2π cos (x) dx by using Trapezoidal method with 8 equal intervals. Compute by calculator. Then the error upto 5 significant digit is
Problem 9: In Binomial distribution the mean of variable is given as 9 and standard deviation is given as √6,then find the number trials.
Problem 10: Which of the following is not true with respect to Expectation and Variance for discrete distribution,X1, X2 are variables.
P) E(aX1 + b) = aE(X1) + b
Q) E(aX1 + b) = E(aX1) + b
R) V (aX1 + bX2) = a2V (X1) + b2V (X2)
S) V (aX1 + bX2) = V (aX1) + V (bX2)
Problem 11: Which of the differential equations is the equation of hyperbola
a) dy/dx = y/x, (b)dy/dx = 1/xy, (c) dy/dx = x/y, (d)dy/dx = -x/y.