Moving along the X-axis there are two points with `x=10+6t,x=3+t^(2)`. The speed with which they are reaching from each other at the time of encounter is (`x` is cm and `t`is in second)

Moving along the X-axis,there are two pointswith x=10+6t,X=3+t?. The speed withwhich they are reaching from each other at thetime of encounter is (x is in centimetre andt isin second)a 16cm/sb20cm/sc8cm/sd12cm/s+ in timot is given by

A particle is moving along the x-axis with its cordinate with time 't' given by x(t)=10+8t-3t^(2) . Another particle is moving along the y-axis with its coordinate as a FIGUREunction oFIGURE time given by y(t)= 5-8t^(2) At t=1 s, the speed oFIGURE the4 second particle as measured in the FIGURErame oFIGURE the FIGUREirst particle is given as sqrtv . Then v (in m//s) is

A particle moving along the x axis has a position given by x=54 t - 2.0 t^(3) m . At the time t=3.0s , the speed of the particle is zero. Which statement is correct ?

The position of particle moving along the x-axis veries with time t as x=6t-t^(2)+4 . Find the time-interval during which the particle is moving along the positive x-direction.

The x -coordinate of a particle moving along x -axis varies with time as x=6-4t+t^(2), where x in meter and t in second then distance covered by the particle in first 3 seconds is

The position of a particle moving along x-axis is given by x = 10t - 2t^(2) . Then the time (t) at which it will momentily come to rest is

A particle moves along the x-axis so that its position is given x = 2t^(3) –3t^(2) at a time t second. What is the time interval duringwhich particle will be on the negative half of the axis?

A particle moves along the x-axis such that its co-ordinate (x) varies with time (t), according to the expression x=2 -5t +6t^(2), where x is in metres and t is in seconds. The initial velocity of the particle is :–