Question

A body moves in a straight line under the retardation `a` which is given by `a=-bv^2`, (`b` is a positive constant and `v` represents the velocity). If the initial velocity is `2m/s`, what is the distance covered in time `t`=2 seconds?

Answer 1

Retardation is given by the expression

`a=-bv^2`
`=>(dv)/dt =-bv^2`

Assuming that velocity changes by an amount `dv` in infinitesimal time interval `dt`. Above expression can be rewritten as

`(dv)/v^2 =-b dt`

Integrating both sides with respective variable we get

`int (dv)/v^2 =-int\ b\ dt`
`=>-1/v=-bt+C`
where `C` is a constant of integration. To be ascertained from initial conditions. At `t=0` we have `v=2\ ms^-1`

We get

`-1/2=C`

Expression for velocity becomes

`-1/v=-bt-1/2`
`=>1/v=(1+2bt)/2`
`=>v=2/(1+2bt)`
`=>(dS)/dt=2/(1+2bt)`

Assuming that displacement `dS` takes place in infinitesimal time interval `dt`. Above expression can be rewritten as

`dS=2/(1+2bt)dt`

Integrating both sides with respective variables we get

`int\ dS=int\ 2/(1+2bt)dt`
`=>S=ln(|1+2bt|)/b+C_1`
where `C_1` is a constant of integration.

At `t=0`, `S=0`. Inserting in above we get `C_1=0` and expression for displacement becomes.

`S=ln(|1+2bt|)/b`

Therefore, distance covered in time `t=2\ s`

`S(2)=[ln(1+4b)] /b`