Answer:
1 hour 42 minutes
Step-by-step explanation:
Given: Speed of 1st trucker= 62 mph
Speed of 2nd trucker= 66 mph
Total distance need to cover to be in contact is 270 miles
1st trucker start 1 hour ahead of 2nd trucker
Lets assume 2nd trucker take `x` hours to be in contact and 1st trucker take `(x+1)` hours.
We know, distance= [tex]speed\times time[/tex]
1st trucker, distance[tex](d_1)= 62\times (x+1)[/tex]
∴ [tex]d_1= 62x+62[/tex]
2nd trucker, distance[tex](d_2)= 66\times x[/tex]
∴[tex]d_2= 66x[/tex]
Now, putting the values in an equation.
[tex]d_1+d_2= 270[/tex]
⇒ [tex](62x+62)+66x= 270[/tex]
Opening the parenthesis to solve and subtracting both side by 62
⇒ [tex]122x= 208[/tex]
∴ x= [tex]\frac{208}{122} = 1.70\ h[/tex] = 1 hour 42 minutes
∴ It will take 1 hour 42 minutes to be able contact each other after first trucker leaves.
