A train, traveling at a constant speed of 22.0 m/s, comes to an incline with a constant slope. While going up the incline, the train slows down with a constant acceleration of magnitude 1.40 m/s2. How far has the train traveled up the incline after 7.30 s

Since the train slows down with a constant acceleration of magnitude 1.40 m/s² when going up the incline plane. This implies the train is decelerating. Therefore, the train is experiencing negative acceleration.

a = - 1.40 m/s²

Sunstituting a = - 1.40 m/s² and u = 22 m/s

[tex]V_{x} = -1.40t + 22[/tex]

[tex]V_{x} = -1.40(7.30) + 22[/tex]

[tex]V_{x} = -10.22 + 22[/tex]

[tex]V_{x} = 11. 78 m/s[/tex]

The speed of the train at 7.30 s is 11.78 m/s.

The distance traveled after 7.30 sec on the incline is the area cover on the incline under the specific interval.

Area of triangle + Area of rectangle

[tex][\frac{1}{2} * (22 - 11.78) * (7.30)] + [(11.78 - 0) * (7.30)][/tex]

= 37.303 + 85.994

= 123. 297 m

≈ 123. 30 m

ajeigbeibraheem ajeigbeibraheem · Answer 2 · 2020-03-03T10:49:17+01:00

Answer:

123.297 m

Explanation:

A train, traveling at a constant speed of 22.0 m/s,

v = 22.0 m/s

the train slows down with a constant acceleration of magnitude 1.40 m/s².

[tex]a_s[/tex] = -1.4 m/s²

How far has the train traveled up the incline after 7.30 s

t =7.30 s

We can calculate the distance traveled up the incline after 7.30 s by using the formula:

[tex]x_f =x_i+v_xt+\frac{1}{2}a_st^2[/tex]

where;

[tex]x_f[/tex] = the distance traveled up

[tex]x_i[/tex] = 0

[tex]v_x[/tex] = speed of the train

[tex]a_s[/tex] = deceleration

t = time

Substituting our data; we have:

[tex]x_f = 0+(22m/s)(7.30s)+\frac{1}{2}(-1.4m/s^2)(7.30s)[/tex]

[tex]x_f =16.06 -37.303[/tex]

[tex]x_f[/tex] = 123.297 m