The coefficient of `t^4` in `((1-t^6)/(1-t))^3` (a) `18` (b) `12` (c) `9` (d) `15`

If t = (1)/(1-root4(2)) then t equals

The coefficient of T_(5) and T_(19) in expansion (1+x)^n are equal then n = 14.

Find the vaoue of each of the folllowing polynomials for the indicated value of variables: (i) p(x) = 4x ^(2) - 3x + 7 at x =1 (ii) q (y) = 2y ^(3) - 4y + sqrt11 at y =1 (iii) r (t) = 4t ^(4) + 3t ^(3) -t ^(2) + 6 at t =p, t in R (iv) s (z) = z ^(3) -1 at z =1 (v) p (x) = 3x ^(2) + 5x -7 at x =1 (vii) q (z) = 5z ^(3) - 4z + sqrt2 at z =2

The velocity - time graph of a particle in one dimensional motion is shown in figure. Which of the following formulae are correct for describing the motion of the particle over the time- interval t _(1) to t _(2) : (a) x (t _(2)) = x (t _(1)) +v (t _(2) - t _(1)) + ((1)/(2)) a (t _(2) - t _(1)) ^(2) (b) v (t_(2)) = v (t_(1)) + a (t _(1)))//(t_(2) -t _(1)) (C) v _("average")= (x (t _(2)) -x (t _(1)))//(t_(2) -t _(1)) (d) a _("average")= (v(t _(2)) - v (t _(1))) //(t_(2) -t _(1)) (e) x (t _(2))=x(t_(1)) + v _("average") (t _(2) - t _(1)) + ((1)/(2)) a _("average") (t _(2) -t _(1)) ^(2) (f) c (t _(2)) - c (t _(1)) = area under the v-t curve bonunded by the t -axis and the dotted line shown.

A function is represented parametrically by the equations x=(1+t)/(t^3);\ \ y=3/(2t^2)+2/t then (dy)/(dx)-x((dy)/(dx))^3 has the value equal to (a) 2 (b) 0 (c) -1 (d) -2

The slope of normal to (3t^(2)+1, t^(3)-1) at t = 1 is ………….

The position of a particle is given by r=3.0thati+2.0t^(2)hatj+5,0hatk where t is in seconds and the coefficients have the proper units for r to be in matres. (a) Find v (t) and a(t) of the particle . (b) Find the magnitude and direction of v (t) at t=1.0 s.

If x=a t^2,\ \ y=2\ a t , then (d^2y)/(dx^2)= (a) -1/(t^2) (b) 1/(2\ a t^3) (c) -1/(t^3) (d) -1/(2\ a t^3)

The population p(t) at time t of a certain mouse species satisfies the differential equation (d p(t)/(dt)=0. 5 p(t)-450 If p(0)""=""850 , then the time at which the population becomes zero is (1) 2 ln 18 (2) ln 9 (3) 1/2 In 18 (4) ln 18

The domain of the funciton f(x) given by 3^(x) + 3^(f) = "min" (2t^(3) - 15t^(2) + 36t - 25, 2 + |sin t| , 2 le t le 4) is