Question

A paddle boat can move at a speed of 20 ​km/h in still water. The boat is paddled 6 km downstream in a river in the same time it takes to go 3 km upstream. What is the speed of the​ river?

Answer 1

OK, let's try this...

Explanation:

In kinematics:
`x_t = v_0 . t + x_0`
`x_0` (startpoint) is not important here, so:

`x_t = v_0 . t`;

`x_"out" = 6 km`;
`x_"back" = 3 km`;
`t_"out"= t_"back"`;
`v_"out"= v_"boat" + v_"river"`;
`v_"back"= v_"boat" - v_"river"`;

`rarr` `x_"out" = 2x_"back"`;
`rarr` `v_"out".t = 2v_"back" . t`;

Divide by t, as this is same for outgoing and return,
`rarr v_"out" = 2v_"back"`;

`v_"out" = v_"boat" + v_"river"`;
`v_"back " = v_"boat" - v_"river"`;

`rarr v_"boat" + v_"river" = 2(v_"boat" - v_"river")`
`rarr v_"boat" + v_"river" = 2v_"boat" - 2v_"river"`
`rarr v_"river" = v_"boat" - 2v_"river"`
`rarr 3v_"river" = v_"boat"`
`rarr v_"river" = v_"boat" /3`

`v_"boat" = 20 "km/hr", rarr v_"river"= 20/3 = 6 2/3` km/hr....