Answer:
The position at t=11 seconds is -96 m or 96 m to the left of the origin
Step-by-step explanation:
Constant speed and constant acceleration motion
If a body travels the same distance per unit of time, the body has a constant speed. The equation for the distance x is:

Where v is the constant speed and t is the time.
At time t=0 the body is moving at a constant speed of v=24 m/s in the positive x-direction. It keeps that condition for t=1 sec. The distance traveled is:

Now the body is given a constant acceleration of 6 m/s^2 in the negative x-direction, that is, a=-6 m/s^2
The distance traveled by a body at constant acceleration is given by:

Where vo is the initial speed and t is the time.
We need to find the position at t=11 sec, but we must subtract the one second already passed, thus t=10 s


This distance must be added to the actual position of the body, that is:
-120 m + 24 m = -96 m
The position at t=11 seconds is -96 m or 96 m to the left of the origin