The correct answer among the given options is: (c) 4.5 seconds.
To find the time at which the two objects cross paths, we can set their positions equal to each other and solve for time. Let's denote the time as
.
Let:
-
be the height of the object falling from a height of 15 m,
-
be the height of the object launched upwards from the ground and rising to a height of 60 m.
For the object falling from a height of 15 m, its position as a function of time
is given by the equation for uniformly accelerated motion:
![\[ y_1(t) = h_1 - (1)/(2)gt^2 \]](https://img.qammunity.org/2024/formulas/physics/high-school/8pyxhttqcsvdd3xwwi8arkldx4bbmrusmn.png)
where:
-
is the initial height,
-
is the acceleration due to gravity.
For the object launched upwards, its position as a function of time
is also given by the equation for uniformly accelerated motion:
![\[ y_2(t) = h_2 + v_0t - (1)/(2)gt^2 \]](https://img.qammunity.org/2024/formulas/physics/high-school/dzshglu1rlkajrmgczbsukpgyjea11213a.png)
where:
-
is the initial height,
-
is the initial velocity.
In this case,
m,
m, and both objects are affected by gravity
.
Since the object falling and the object launched upwards cross paths, their positions will be equal at the time of crossing. Therefore, set
and solve for
:
![\[ 15 - (1)/(2)gt^2 = 60 + v_0t - (1)/(2)gt^2 \]](https://img.qammunity.org/2024/formulas/physics/high-school/q6ooom81hti4b4hxyjv6mm9n4wy2pp5hmk.png)
Simplify the equation, and you will find that the initial velocity
cancels out.
Now, you can solve for
. The correct answer is the positive solution since time cannot be negative in this context.
The correct answer among the given options is:
(c) 4.5 seconds