Answer:
They meet at 92 miles from C or 46 miles from D.
Step-by-step explanation:
Constant Speed Motion
An object is said to have constant speed if it travels the same distance at the same time. The ratio between the distance x and the time t is the speed and is given by
[tex]\displaystyle v=\frac{x}{t}[/tex]
Solving for x
[tex]x=v.t[/tex]
The car starting from C has double speed as the car starting from D. this means
[tex]v_c=2v_d[/tex]
When both cars meet, they travel these distances
[tex]x_c=v_c.t[/tex]
[tex]x_d=v_d.t[/tex]
The sum of both distances is x = 256 - 118 = 138 miles.
[tex]x_c+x_d=138[/tex]
Or, equivalently
[tex]v_c.t+v_d.t=138[/tex]
Using the relations of the speeds:
[tex]2v_d.t+v_d.t=138\\3v_d.t=138[/tex]
Solving for t
[tex]\displaystyle t=\frac{138}{3v_d}=\frac{46}{v_d}[/tex]
The distance traveled by the car from c is
[tex]\displaystyle x_c=2.v_d\frac{46}{v_d}=92\ miles[/tex]
The distance traveled by the car from d is
[tex]\displaystyle x_d=v_d\frac{46}{v_d}=46\ miles[/tex]
There is no reference of where Boston is located, thus we can only refer the distances respect to C or D, as shown above
