Final answer:
Point B is located at -1.5 on the number line because this location maintains the ratio 3:1 for the lengths of segments CB to BA.
Step-by-step explanation:
The question involves finding point B on a number line such that the ratio of the lengths of segments CB to BA is 3:1, with point A at 0 and point C at -2. To find the location of point B, we consider that if the total distance from C to A is divided into four equal parts (since the ratio is 3:1), each part would be 0.5 units long because the distance from C to A is 2 units. Multiplying one part by 3 (because CB is three parts of the whole), we get that point B is 1.5 units to the left of A, meaning B is at -1.5.
Therefore, the location of point B is -1.5 on the number line, which corresponds to Option 1: -1.5.