SOLUTION: If Mr. Norton walks for 2 miles and then cycles for 6 miles, it takes him 1 hr and 24 min to go the total distance of 8 miles....but if he walks for 5 miles and cycles for 3 miles
Algebra ->
Customizable Word Problem Solvers
-> Travel
-> SOLUTION: If Mr. Norton walks for 2 miles and then cycles for 6 miles, it takes him 1 hr and 24 min to go the total distance of 8 miles....but if he walks for 5 miles and cycles for 3 miles
Log On
Question 697278: If Mr. Norton walks for 2 miles and then cycles for 6 miles, it takes him 1 hr and 24 min to go the total distance of 8 miles....but if he walks for 5 miles and cycles for 3 miles the rates of walking and cycling being the same as before, the total time taken is 2 hr and 18 min. Find the rates of walking and cycling. Answer by ankor@dixie-net.com(22740) (Show Source):
You can put this solution on YOUR website! If Mr. Norton walks for 2 miles and then cycles for 6 miles, it takes him 1 hr and 24 min to go the total distance of 8 miles
....but if he walks for 5 miles and cycles for 3 miles the rates of walking and cycling being the same as before, the total time taken is 2 hr and 18 min.
Find the rates of walking and cycling.
:
let w = his walking speed
let c = cycling speed
:
change 1 hr 24 min to: 1 + 24/60 = 1.4 hrs
change 2 hr 18 min to: 2 + 18/60 + 2.3 hrs
:
Write time equation for scenario + = 1.4
and + = 2.3
:
multiply the above equation by 2wc and mult the 1st equation by wc
10c + 6w = 4.6wc
2c + 6w = 1.4wc
--------------------subtraction eliminates w, find c
8c = 3.2wc
divide both sides by c
8 = 3.2w
w = 8/3.2
w = 2.5 mph walking speed
:
Find the cycling speed using eq: + = 1.4 + = 1.4
.8 + = 1.4 = 1.4 - .8 = .6
c = 6/.6
c = 10 mph is the cycling speed
:
:
Check this in the equation: + = 2.3 + =
2 + .3 = 2.3
