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Bishnu Paudel · Answer 1 · 2023-05-01T23:30:46+0000

Answer:

Speed of the plane in still air:
$779\; {\rm km \cdot h^(-1)}$ .

Windspeed:
$100\; {\rm km \cdot h^(-1)}$ .

Explanation:

Assume that
$x\; {\rm km \cdot h^(-1)}$ is the speed of the plane in still air, and that
$y\; {\rm km \cdot h^(-1)}$ is the speed of the wind.

When the plane is travelling against wind, the ground speed of this plane (speed of the plane relative to the ground) would be
$(x - y)\; {\rm km \cdot h^(-1)}$ .
When this plane is travelling in the same direction as the wind, the ground speed of this plane would be
$(x + y)\; {\rm km \cdot h^(-1)}$ .

The question states that when going against the wind (
$v = (x - y)\; {\rm km \cdot h^(-1)}$ ,) the plane travels
$6111\; {\rm km}$ in
$9\; {\rm h}$ . Hence,
$9\, (x - y) = 6111$ .

Similarly, since the plane travels
$7911\; {\rm km}$ in
$9\; {\rm h}$ when travelling in the same direction as the wind (
$v = (x + y)\; {\rm km \cdot h^(-1)}$ ,)
$9\, (x + y) = 7911$ .

Add the two equations to eliminate
. Subtract the second equation from the first to eliminate
. Solve this system of equations for
and
:
x = 779 and
y = 100 .

Hence, the speed of this plane in still air would be
$779\; {\rm km \cdot h^(-1)}$ , whereas the speed of the wind would be
$100\; {\rm km \cdot h^(-1)}$ .

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