Question 288992
A man started on a walk 12 km.
 After walking half the distance at x km/h, he decreased his speed by 1/2 km/h.
He completed his walk 10 minutes later than he would have done if he had not decreased his speed.
 Obtain an equation for x and solve it. 
:
x = speed during the 1st 6 km
then
(x-.5} = speed during the last 6 km
;
Change 10 min to {{{1/6}}} hr
:
Write a time equation: Time = dist/speed
:
6 km at normal speed + 6 km at slower speed = 12 km at normal speed + 10 min
{{{6/x}}} + {{{6/((x-.5))}}} = {{{12/x}}} + {{{1/6}}}
:
Multiply equation by 6x(x-.5), results:
6(6(x-.5) + 6(6x) = 12(6(x-.5) + x(x-.5)
:
36(x-.5) + 36x = 72(x-.5) + x^2 - .5x
:
36x - 18 + 36x = 72x - 36 + x^2 - .5x
:
Combining like terms gives us:
0 = x^2 - .5x - 18
:
This will factor
(x + 4)(x - 4.5) = 0
Positive solution
x = 4.5 km/hr
:
Use your value of x to determine the time he took for the 12 kilometre walk.
:
{{{6/4.5}}} + {{{6/4}}} = 
1{{{1/3}}} + 1{{{1/2}}} = 2{{{5/6}}} hrs
:
Check solution by finding the time if 12 km walked at 4.5 km/hr
{{{12/4.5}}} = 2{{{4/6}}} hr, {{{1/6}}} hr faster