On a road trip, Maura drove at a speed of 60 miles per hour for the first two hours. she then increased her speed by 25%.

Part A:How fast was Maura driving after she increased her speed?

Part B:If Maura continues to drive at her increased speed, write an equation to find the total distance, d, in miles, that Maura will have travelled for any time, x, in hours, longer than 2 hours.

Part C:Using the equation from Part B, how far would Maura travel in 5 hours?

Question

Mathematics

Willie

14 May, 06:05

On a road trip, Maura drove at a speed of 60 miles per hour for the first two hours. she then increased her speed by 25%.

Part A:How fast was Maura driving after she increased her speed?

Part B:If Maura continues to drive at her increased speed, write an equation to find the total distance, d, in miles, that Maura will have travelled for any time, x, in hours, longer than 2 hours.

Part C:Using the equation from Part B, how far would Maura travel in 5 hours?

+4

Answers (1)

Know the Answer?

Choi · Answer 1

So Maura was driving 60 miles per hour for two hours. That's 60x2 which equals 120 miles in the two hours she's been driving. After two hours she increases her speed by 25%. 25% of 60 is 15, so she is now going 75 miles per hour (Part A). If she continues to drive this way, the equation would be 75xh=d. 75 being how fast she's going and h being the number of hours she's gone. If you multiple those two together it will give you the distance she's gone (Part B). If you substitute the 5 hours from Part C the equation would be 75 miles multiplied by 5 hours. 75x5 = 375 miles.