Respuesta :
Answer:
The answer to the question is;
The rate at which the distance between the two cars is changing is equal to 14.4 ft/sec.
Explanation:
We note that the distance traveled by each car after 4 seconds is
Car A = 19 ft in the west direction.
Car B = 26 ft in the north direction
The distance between the two cars is given by the length of the hypotenuse side of a right angled triangle with the north being the y coordinate and the west being the x coordinate.
Therefore, let the distance between the two cars be s
we have
s² = x² + y²
= (19 ft)² + (26 ft)² = 1037 ft²
s = [tex]\sqrt{1037 ft^2}[/tex] = 32.202 ft.
The rate of change of the distance from their location 4 seconds after they commenced their journeys is given by;
Since s² = x² + y² we have
[tex]\frac{ds^{2} }{dt} = \frac{dx^{2} }{dt} + \frac{dy^{2} }{dt}[/tex]
→ [tex]2s\frac{ds }{dt} = 2x\frac{dx}{dt} + 2y\frac{dy }{dt}[/tex] which gives
[tex]s\frac{ds }{dt} = x\frac{dx}{dt} + y\frac{dy }{dt}[/tex]
We note that the speeds of the cars were given as
Car B moving north = 12 ft/sec, which is the y direction and
Car A moving west = 8 ft/sec which is the x direction.
Therefore
[tex]\frac{dy }{dt}[/tex] = 12 ft/sec and
[tex]\frac{dx}{dt}[/tex] = 8 ft/sec
[tex]s\frac{ds }{dt} = x\frac{dx}{dt} + y\frac{dy }{dt}[/tex] becomes
[tex]32.202 ft.\frac{ds }{dt} = 19 ft \times 8 \frac{ft}{sec} + 26ft\times 12\frac{ft}{sec}[/tex] = 464 ft²/sec
[tex]\frac{ds }{dt} = \frac{464\frac{ft^{2} }{sec} }{32.202 ft.}[/tex] = 14.409 ft/sec ≈ 14.4 ft/sec to one place of decimal.
