Asked by Mike
An automobile traveling at the rate of 30 ft/sec is approaching an intersection. When the automobile is 120 ft. from the intersection, a truck, traveling at the rate of 40 ft/sec on a road at right angles with the automobile’s road crosses the intersection. How long after the truck leaves the intersection the two vehicles are closest?
Answers
Answered by
Reiny
Let the time passed since the truck went through the intersection be t seconds
Make a diagram
Let the distance between them be D ft
I see that
D^2 = (40t)^2 + (120-30t)^2
= 1600t^2 + 14400 - 720t + 900t^2
= 2500t^2 - 7200t + 14400
2D dD/dt = 5000t -7200
but at a minimum of D , dD/dt = 0 , so
5000t = 7200
t = 7200/5000
= 1.44 sec after the truck entered the intersection
check:
when t = 0 , D = 120
when t = 1 , D = 98.5
when t = 1.44 , D = 96
when t = 1.5 , D = 96.05 , getting bigger again
Make a diagram
Let the distance between them be D ft
I see that
D^2 = (40t)^2 + (120-30t)^2
= 1600t^2 + 14400 - 720t + 900t^2
= 2500t^2 - 7200t + 14400
2D dD/dt = 5000t -7200
but at a minimum of D , dD/dt = 0 , so
5000t = 7200
t = 7200/5000
= 1.44 sec after the truck entered the intersection
check:
when t = 0 , D = 120
when t = 1 , D = 98.5
when t = 1.44 , D = 96
when t = 1.5 , D = 96.05 , getting bigger again
Answered by
Mike
thx reiny
Answered by
Dolly
thanks mike
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