Rate of change-planes

[DanaAJames]

"Two planes leave a city for another city that us 600 miles away. One of the planes is flying 50 miles per hour faster than the other. The slower plane takes 2 hours longer to reach the city. What is the rate of each plane? Write and solve a system of equations."


I am pretty sure that the equations are 600=rt, and 600=(t+2)(s-50), if r represents rate, t representstime iand s represents speed. But, I also know that if 600=rt, then r=600/t. So, I can replace r with 600/t. So my equations are 600=(600/t)t, and 600=(t+2)(s-50).

Am I correct so far? Also, how do I solve from here? Thanks!

 

[stapel]

"Two planes leave a city for another city that us 600 miles away. One of the planes is flying 50 miles per hour faster than the other. The slower plane takes 2 hours longer to reach the city. What is the rate of each plane? Write and solve a system of equations."

I am pretty sure that the equations are 600=rt, and 600=(t+2)(s-50), if r represents rate, t representstime iand s represents speed.

What is the difference between "rate" and "speed"?

 

[DanaAJames]

What is the difference between "rate" and "speed"?

Of course! Silly error on my part. Thanks!

 

[ksdhart]

You're on the right track about making two equations though. You want to have 600 = something, and 600 = something else. However, your first equation is meaningless. Multiply it out and you'll see why...

600 = (600/t)*t --> 600 = 600t / t --> 600 = 600

Think about the relationship between the two planes speeds and between their times. We have the following information:

s₁ = Speed of slower plane
s₂ = s₁ + 50 = Speed of faster plane

t₁ = t₂ + 2 = Travel time of slower plane
t₂ = Travel time of faster plane

You know that Distance = Speed * Time, so you should be able to easily make two equations.