Check whether 2t + 1 is a factor of `4t^(3) + 4t^(2) - t - 1` or not.

Check whether the first polynomial is a factor of the second polynomial by dividing the second polynomial by the first polynomial : t^(2)-3, 2t^(4)+3t^(3)-2t^(2)-9t-12

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

Displacement (in metre) of a particle varies with time (in second) is given as y(t) = 4t ^(2) - 16t +5. Time taken by the particle to come to rest is…….

Find the value of each of the following polynomials at the indicated value of variables : p(t) = 4t^(4) + 5t^(3) - t^(2) + 6 at t = a.

The curve described parametrically by x = t^2 + t +1 , y = t^2 - t + 1 represents :

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

A tank full of water has a small hole at its bottom. Let t_(1) be the time taken to empty first one third of the tank and t_(2) be the time taken to empty second one third of the tank and t_(3) be the time taken to empty rest of the tank then (a). t_(1)=t_(2)=t_(3) (b). t_(1)gtt_(2)gtt_(3) (c). t_(1)ltt_(2)ltt_(3) (d). t_(1)gtt_(2)ltt_(3)

Let r_(1)(t)=3t hat(i)+4t^(2)hat(j) and r_(2)(t)=4t^(2) hat(i)+3that(j) represent the positions of particles 1 and 2, respectiely, as function of time t, r_(1)(t) and r_(2)(t) are in metre and t in second. The relative speed of the two particle at the instant t = 1s, will be