If an airplane has a takeoff speed of 95 m/s and requires 1390 m to reach that speed, what is the acceleration of the plane and the time required to reach this speed?

Question

If an airplane has a takeoff speed of 95 m/s and requires 1390 m to reach that speed, what is the acceleration of the plane and the time required to reach this speed?

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Denis6482 · Answer 1 · 2022-02-19T10:03:25+0000

To find the acceleration of the airplane, we can use the formula:

$v = u + a t$

Where:

$v$ is the final velocity (takeoff speed) = 95 m/s
$u$ is the initial velocity (starting from rest) = 0 m/s
$a$ is the acceleration of the airplane (what we need to find)
$t$ is the time required to reach the final velocity (what we also need to find)

Since the airplane starts from rest, the initial velocity ( $u$ ) is 0 m/s. Therefore, the formula simplifies to:

$v = a t$

Plugging in the values we have:

$95 = a \times t$

To find the time required ( $t$ ) to reach the takeoff speed, we need another equation. The formula to calculate distance traveled ( $s$ ) under constant acceleration is:

$frac{1}{2}at^2$

Where:

$s$ is the distance traveled = 1390 m
$u$ is the initial velocity = 0 m/s
$a$ is the acceleration of the airplane (what we need to find)
$t$ is the time required to reach the final velocity (what we also need to find)

Plugging in the values we have:

$frac{1}{2}at^2$

If an airplane has a takeoff speed of 95 m/s and requires 1390 m to reach that speed, what is the acceleration of the plane and the time required to reach this speed?

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