Christy drove 300 miles on her vacation. She drove an average of 1.25 times faster on the second 150 miles of her trip. Which expression represents the time she spent driving? L…

Question

asked Nov 18, 2017 42.9k views

1 Answer

← Prev Question Next Question →

Ask a Question

SirPilan · Answer 1 · 2017-11-23T21:22:15+0000

Correct answer is D.

During the first 150 miles, she drove 150 miles at a speed of x miles per hour, so her time was

$150 \text{ miles} = x * t_(1st)$
where
t_(1st)

is the time she spent driving the first 150 miles.

On the second half of the trip, she drove at 1.25x miles per hour. There, the equation would be

$150 \text{ miles} = 1.25x * t_(2nd)$
where
t_(2nd)

is the time she spent driving the second 150 miles.

Solve both of those equations for the t variables, then add them together. Your answer will be

t_(1st) + t_(2nd)= (150)/(x) + (150)/(1.25x)= (150)/(x) + (120)/(x)= (270)/(x)

t_(1st) + t_(2nd)= (150)/(x) + (150)/(1.25x)= (150)/(x) + (120)/(x)= (270)/(x)

Christy drove 300 miles on her vacation. She drove an average of 1.25 times faster on the second 150 miles of her trip. Which expression represents the time she spent driving? L…

Please log in or register to add a comment.

Please log in or register to answer this question.

1 Answer

Please log in or register to add a comment.

Related questions

Categories

Other Questions