The least distance of the point ( 2 soin t , 2 cos t , 3t) from the origin is _

The least distance of the point (2 sin t, 2 cos t, 3 t) from the origin is

int sqrt(2+ sin 3t) cos 3t dt

A line l passing through the origin is perpendicular to the lines l_1: (3+t)hati+(-1+2t)hatj+(4+2t)hatk , - oo < t < oo , l_2: (3+s)hati+(3+2s)hatj+(2+s)hatk , - oo < t < oo then the coordinates of the point on l_2 at a distance of sqrt17 from the point of intersection of l&l_1 is/are:

A line l passing through the origin is perpendicular to the lines l_(1) : (3 + t) hat(i) + (-1 + 2t) hat(j) + (4 + 2t) hat(k), -oo lt t lt oo l_(2) : (3 + 2s) hat(i) + (3 + 2s) hat(j) + (2 + s)hat(k), -oo lt s lt oo Then the coordinate (s) of the point (s) on l_(2) at a distance of sqrt17 from the point of intersection of l and l_(1) is (are)

The maximum distance from the origin of a point on the curve x= a sin t - b sin ((at)/(b)) , y= a cos t - b cos((at)/(b)) , both a, b gt 0 , is-

A particle is moving in a straight line its distance from a fixed point on the line at the end of t second is x metres , where x=t^(4)-10t^(3)+24t^(2)+36t-10 When is it moving most slowly ?

A particle is moving in a straight line and its distance x cm from a fixed point on the line at any time t seconds is given by , x=(1)/(12)t^(4)-(2)/(3)t^(3)+(3)/(2)t^(2)+t+15 . At what time is the velocity minimum ? Also find the minimum velocity.

Find the equation of the normal at the specified point to each of the following curves x= a sin ^(3)t, y= b cos ^(3)t at the point 't'.

A particle starts form the origin with a velocity of 10 cm/s and moves along a straight line. If its acceleration be (2t^(2)-3t)cm//s^(2) at the end of t seconds, then fing its velocity and the distance from the origin at the end of 6 seconds.