Point [tex][tex]$P$[/tex][/tex] partitions the directed line segment from [tex][tex]$A$[/tex][/tex] to [tex][tex]$B$[/tex][/tex] into the ratio 3:4. Will [tex][tex]$P$[/tex][/tex] be closer to [tex][tex]$A$[/tex][/tex] or [tex][tex]$B$[/tex][/tex]? Why?

A. [tex][tex]$P$[/tex][/tex] will be closer to [tex][tex]$A$[/tex][/tex] because it will be [tex][tex]$\frac{3}{7}$[/tex][/tex] the distance from [tex][tex]$A$[/tex][/tex] to [tex][tex]$B$[/tex][/tex].

B. [tex][tex]$P$[/tex][/tex] will be closer to [tex][tex]$A$[/tex][/tex] because it will be [tex][tex]$\frac{4}{7}$[/tex][/tex] the distance from [tex][tex]$A$[/tex][/tex] to [tex][tex]$B$[/tex][/tex].

C. [tex][tex]$P$[/tex][/tex] will be closer to [tex][tex]$B$[/tex][/tex] because it will be [tex][tex]$\frac{3}{7}$[/tex][/tex] the distance from [tex][tex]$B$[/tex][/tex] to [tex][tex]$A$[/tex][/tex].

D. [tex][tex]$P$[/tex][/tex] will be closer to [tex][tex]$B$[/tex][/tex] because it will be [tex][tex]$\frac{4}{7}$[/tex][/tex] the distance from [tex][tex]$B$[/tex][/tex] to [tex][tex]$A$[/tex][/tex].

To determine the position of point [tex]$ P $[/tex] that partitions the line segment from [tex]$ A $[/tex] to [tex]$ B $[/tex] in a 3:4 ratio, let’s first understand what this ratio signifies.

### Step-by-Step Solution:

1. Understanding the Ratio:
- The ratio 3:4 means the entire length of the segment [tex]$ AB $[/tex] is divided into two parts such that the part closer to [tex]$ A $[/tex] is 3 units long and the part closer to [tex]$ B $[/tex] is 4 units long.

2. Finding the Total Length:
- Total parts = 3 parts + 4 parts = 7 parts.
- Hence, the total length of the segment [tex]$ AB $[/tex] can be considered as 7 equal parts.

3. Distance from [tex]$ A $[/tex] to [tex]$ P $[/tex]:
- If [tex]$ P $[/tex] partitions the segment in the 3:4 ratio, the distance from [tex]$ A $[/tex] to [tex]$ P $[/tex] is given by:
[tex]\[ \text{Distance from } A \text{ to } P = \frac{3}{7} \times \text{Total length of } AB \][/tex]

4. Distance from [tex]$ B $[/tex] to [tex]$ P $[/tex]:
- Conversely, the distance from [tex]$ B $[/tex] to [tex]$ P $[/tex] is given by:
[tex]\[ \text{Distance from } B \text{ to } P = \frac{4}{7} \times \text{Total length of } AB \][/tex]

5. Comparing the Distances:
- [tex]$\frac{3}{7}$[/tex] of the distance from [tex]$ A $[/tex] to [tex]$ B $[/tex] is approximately 0.4286 (rounded to four decimal places).
- [tex]$\frac{4}{7}$[/tex] of the distance from [tex]$ B $[/tex] to [tex]$ A $[/tex] is approximately 0.5714 (rounded to four decimal places).

6. Conclusion:
- Since [tex]$ \frac{3}{7} $[/tex] (0.4286) is less than [tex]$ \frac{4}{7} $[/tex] (0.5714), point [tex]$ P $[/tex] is closer to [tex]$ A $[/tex].

Therefore, [tex]$ P $[/tex] is closer to [tex]$ A $[/tex] because it will be [tex]$\frac{3}{7}$[/tex] the distance from [tex]$ A $[/tex] to [tex]$ B $[/tex]. This confirms that the correct answer is:

P will be closer to [tex]$ A $[/tex] because it will be [tex]$\frac{3}{7}$[/tex] the distance from [tex]$ A $[/tex] to [tex]$ B $[/tex].