Q1. If M is a 7 × 5 matrix of rank 3 and N is a 5 × 7 matrix of rank 5 then rank(MN ) is -
Q2. If
x = a (t + sin t)
y = a (1 - cos t)
then the value of dy/dx|t=π/2 is
Q3. Which of the following functions is not differentiable in the domain [-1, 1]?
Q4. The value of limx→∞[1/sinx -1/tanx] is -
Q5. The general solution of the partial differential equation ∂2z/∂x∂y = x + y is of the form -
Q6. Real and imaginary parts of Log(x + iy)
Q7. The value of the integral
C dz/z2 - 1, C : |z| = 4
Q8. The particular integral of the given differential equation
d2y/dx2 + dy/dx + y = cos 2x
Q9. If a function f(x) = x3 - 12x2 + 36x + 17, which is continuous and differentiable for all x ∈ R,the interval in which the given function strictly decreasing is
Q10. The value of directional derivative of
f (x, y, z) = 2x2 + 3y2 + z2
at the point (2, 3, 4) in the direction of the vector A→ = i^ + 2^k.
Q11. Simpson's 3/8th rule is the degree of polynomial:
Q12. Using Euler's method taking the step size = 0.1 obtain the approximate value of y corresponding to x = 0.2 for the initial valued problem
dy/dx = x2 + y2 and y(0) = 1
is
Q13. A continuous random variable X has a probability density function
f(x) = 3/5e-3x/5, x > 0
0 , x ≤ 0
the probability density function of Y = 3X + 2 is
Q14. If X is a continuous random variable with probability density function
f (x) = k(5x - 2x ), 0 ≤ x ≤ 2
0, otherwise
then the value of k is
Q15. Seven different objects must be divided among three peopl. There are "____ "ways,this can be done if one or two of them must get no objects.
Q16. If A is a nonsingular matrix of order n the |Adj (AdjA)| is.